stableswap

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Published: Apr 19, 2023 License: Apache-2.0 Imports: 26 Imported by: 0

README

Generalized Solidly Stableswap

Stableswaps are pools that offer low slippage for two assets that are intended to be tightly correlated. There is a price ratio they are expected to be at, and the AMM offers low slippage around this price. There is still price impact for each trade, and as the liquidity becomes more lop-sided, the slippage drastically increases.

This package implements the Solidly stableswap curve, namely a CFMM with invariant: $f(x, y) = xy(x^2 + y^2) = k$

It is generalized to the multi-asset setting as $f(a_1, ..., a_n) = a_1 * ... * a_n (a_1^2 + ... + a_n^2)$

Pool configuration

One key concept, is that the pool has a native concept of

Scaling factor handling

An important concept thats up to now, not been mentioned is how do we set the expected price ratio. In the choice of curve section, we see that its the case that when x_reserves ~= y_reserves, that spot price is very close to 1. However, there are a couple issues with just this in practice:

  1. Precision of pegged coins may differ. Suppose 1 Foo = 10^12 base units, whereas 1 WrappedFoo = 10^6 base units, but 1 Foo is expected to trade near the price of 1 Wrapped Foo.
  2. Relatedly, suppose theres a token called TwoFoo which should trade around 1 TwoFoo = 2 Foo
  3. For staking derivatives, where value accrues within the token, the expected price to concentrate around dynamically changes (very slowly).

To handle these cases, we introduce scaling factors. A scaling factor maps from "raw coin units" to "amm math units", by dividing. To handle the first case, we would make Foo have a scaling factor of 10^6, and WrappedFoo have a scaling factor of 1. This mapping is done via raw coin units / scaling factor. We use a decimal object for amm math units, however we still have to be precise about how we round. We introduce an enum rounding mode for this, with three modes: RoundUp, RoundDown, RoundBankers.

The reserve units we pass into all AMM equations would then be computed based off the following reserves:

scaled_Foo_reserves = decimal_round(pool.Foo_liquidity / 10^6, RoundingMode)
descaled_Foo_reserves = scaled_Foo_reserves * 10^6

Similarly all token inputs would be scaled as such. The AMM equations need to each ensure that rounding happens correctly, for cases where the scaling factor doesn't perfectly divide into the liquidity. We detail rounding modes and scaling details as pseudocode in the relevant sections of the spec. (And rounding modes for 'descaling' from AMM eq output to real liquidity amounts, via multiplying by the respective scaling factor)

Algorithm details

The AMM pool interfaces requires implementing the following stateful methods:

	SwapOutAmtGivenIn(tokenIn sdk.Coins, tokenOutDenom string, swapFee sdk.Dec) (tokenOut sdk.Coin, err error)
	SwapInAmtGivenOut(tokenOut sdk.Coins, tokenInDenom string, swapFee sdk.Dec) (tokenIn sdk.Coin, err error)

	SpotPrice(baseAssetDenom string, quoteAssetDenom string) (sdk.Dec, error)

	JoinPool(tokensIn sdk.Coins, swapFee sdk.Dec) (numShares sdk.Int, err error)
	JoinPoolNoSwap(tokensIn sdk.Coins, swapFee sdk.Dec) (numShares sdk.Int, err error)
	ExitPool(numShares sdk.Int, exitFee sdk.Dec) (exitedCoins sdk.Coins, err error)

The "constant" part of CFMM's imply that we can reason about all their necessary algorithms from just the CFMM equation. There are still multiple ways to solve each method. We detail below the ways in which we do so. This is organized by first discussing variable substitutions we do, to be in a more amenable form, and then the details of how we implement each method.

CFMM function

Most operations we do only need to reason about two of the assets in a pool, and sometimes only one. We wish to have a simpler CFMM function to work within these cases. Due to the CFMM equation $f$ being a symmetric function, we can without loss of generality reorder the arguments to the function. Thus we put the assets of relevance at the beginning of the function. So if two assets $x, y$, we write: $f(x,y, a_3, ... a_n) = xy * a_3 * ... a_n (x^2 + y^2 + a_3^2 + ... + a_n^2)$.

We then take a more convenient expression to work with, via variable substition.

$$ \begin{equation} v = \begin{cases} 1, & \text{if } n=2 \ \prod\negthinspace \negthinspace \thinspace^{n}_{i=3} \space a_i, & \text{otherwise} \end{cases} \end{equation} $$

$$ \begin{equation} w = \begin{cases} 0, & \text{if}\ n=2 \ \sum\negthinspace \negthinspace \thinspace^{n}_{i=3} \space {a_i^2}, & \text{otherwise} \end{cases} \end{equation} $$

$$\text{then } g(x,y,v,w) = xyv(x^2 + y^2 + w) = f(x,y, a_3, ... a_n)$$

As a corollary, notice that $g(x,y,v,w) = v * g(x,y,1,w)$, which will be useful when we have to compare before and after quantities. We will use $h(x,y,w) := g(x,y,1,w)$ as short-hand for this.

Swaps

The question we need to answer for a swap is "suppose I want to swap $a$ units of $x$, how many units $b$ of $y$ would I get out".

Since we only deal with two assets at a time, we can then work with our prior definition of $g$. Let the input asset's reserves be $x$, the output asset's reserves be $y$, and we compute $v$ and $w$ given the other asset reserves, whose reserves are untouched throughout the swap.

First we note the direct way of solving this, its limitation, and then an iterative approximation approach that we implement.

Direct swap solution

The method to compute this under 0 swap fee is implied by the CFMM equation itself, since the constant refers to: $g(x_0, y_0, v, w) = k = g(x_0 + a, y_0 - b, v, w)$. As $k$ is linearly related to $v$, and $v$ is unchanged throughout the swap, we can simplify the equation to be reasoning about $k' = \frac{k}{v}$ as the constant, and $h$ instead of $g$

We then model the solution by finding a function $\text{solve cfmm}(x, w, k') = y\text{ s.t. }h(x, y, w) = k'$. Then we can solve the swap amount out by first computing $k'$ as $k' = h(x_0, y_0, w)$, and computing $y_f := \text{solve cfmm}(x_0 + a, w, k')$. We then get that $b = y_0 - y_f$.

So all we need is an equation for $\text{solve cfmm}$! Its essentially inverting a multi-variate polynomial, and in this case is solvable: wolfram alpha link

Or if were clever with simplification in the two asset case, we can reduce it to: desmos link.

These functions are a bit complex, which is fine as they are easy to prove correct. However, they are relatively expensive to compute, the latter needs precision on the order of x^4, and requires computing multiple cubic roots.

Instead there is a more generic way to compute these, which we detail in the next subsection.

Iterative search solution

Instead of using the direct solution for $\text{solve cfmm}(x, w, k')$, instead notice that $h(x, y, w)$ is an increasing function in $y$. So we can simply binary search for $y$ such that $h(x, y, w) = k'$, and we are guaranteed convergence within some error bound.

In order to do a binary search, we need bounds on $y$. The lowest lowerbound is $0$, and the largest upperbound is $\infty$. The maximal upperbound is obviously unworkable, and in general binary searching around wide ranges is unfortunate, as we expect most trades to be centered around $y_0$. This would suggest that we should do something smarter to iteratively approach the right value for the upperbound at least. Notice that $h$ is super-linearly related in $y$, and at most cubically related to $y$. This means that $\forall c \in \mathbb{R}^+, c * h(x,y,w) < h(x,c*y,w) < c^3 * h(x,y,w)$. We can use this fact to get a pretty-good initial upperbound guess for $y$ using the linear estimate. In the lowerbound case, we leave it as lower-bounded by $0$, otherwise we would need to take a cubed root to get a better estimate.

Altering binary search equations due to error tolerance

Great, we have a binary search to finding an input new_y_reserve, such that we get a value k within some error bound close to the true desired k! We can prove that an error by a factor of e in k, implies an error of a factor less than e in new_y_reserve. So we could set e to be close to some correctness bound we want. Except... new_y_reserve >> y_in, so we'd need an extremely high error tolerance for this to work. So we actually want to adapt the equations, to reduce the "common terms" in k that we need to binary search over, to help us search. To do this, we open up what are we doing again, and re-expose y_out as a variable we explicitly search over (and therefore get error terms in k implying error in y_out)

What we are doing above in the binary search is setting k_target and searching over y_f until we get k_iter {within tolerance} to k_target. Sine we want to change to iterating over $y_{out}$, we unroll that $y_f = y_0 - y_{out}$ where they are defined as: $$k_{target} = x_0 y_0 (x_0^2 + y_0^2 + w)$$ $$k_{iter}(y_0 - y_{out}) = h(x_f, y_0 - y_{out}, w) = x_f (y_0 - y_{out}) (x_f^2 + (y_0 - y_{out})^2 + w)$$

But we can remove many of these terms! First notice that x_f is a constant factor in k_iter, so we can just divide k_target by x_f to remove that. Then we switch what we search over, from y_f to y_out, by fixing y_0, so were at:

$$k_{target} = x_0 y_0 (x_0^2 + y_0^2 + w) / x_f$$

$$k_{iter}(y_{out}) = (y_0 - y_{out}) (x_f^2 + (y_0 - y_{out})^2 + w) = (y_0 - y_{out}) (x_f^2 + w) + (y_0 - y_{out})^3$$

So $k_{iter}(y_{out})$ is a cubic polynomial in $y_{out}$. Next we remove the terms that have no dependence on y_{delta} (the constant term in the polynomial). To do this first we rewrite this to make the polynomial clearer:

$$k_{iter}(y_{out}) = (y_0 - y_{out}) (x_f^2 + w) + y_0^3 - 3y_0^2 y_{out} + 3 y_0 y_{out}^2 - y_{out}^3$$

$$k_{iter}(y_{out}) = y_0 (x_f^2 + w) - y_{out}(x_f^2 + w) + y_0^3 - 3y_0^2 y_{out} + 3 y_0 y_{out}^2 - y_{out}^3$$

$$k_{iter}(y_{out}) = -y_{out}^3 + 3 y_0 y_{out}^2 - (x_f^2 + w + 3y_0^2)y_{out} + (y_0 (x_f^2 + w) + y_0^3)$$

So we can subtract this constant term y_0 (x_f^2 + w) + y_0^3, which for y_out < y_0 is the dominant term in the expression!

So lets define this as:

$$k_{target} = \frac{x_0 y_0 (x_0^2 + y_0^2 + w)}{x_f} - (y_0 (x_f^2 + w) + y_0^3)$$

$$k_{iter}(y_{out}) = -y_{out}^3 + 3 y_0 y_{out}^2 - (x_f^2 + w + 3y_0^2)y_{out}$$

We prove here that an error of a multiplicative e between target_k and iter_k, implies an error of less than a factor of 10e in y_{out}, as long as |y_{out}| < y_0. (The proven bounds are actually better)

We target an error of less than 10^{-8} in y_{out}, so we conservatively set a bound of 10^{-12} for e_k.

Combined pseudocode

Now we want to wrap this binary search into solve_cfmm. We changed the API slightly, from what was previously denoted, to have this "y_0" term, in order to derive initial bounds.

One complexity is that in the iterative search, we iterate over $y_f$, but then translate to $y_0$ in the internal equations. So we also use the

# solve_y returns y_out s.t. CFMM_eq(x_f, y_f, w) = k = CFMM_eq(x_0, y_0, w)
# for x_f = x_0 + x_in.
def solve_y(x_0, y_0, w, x_in):
  x_f = x_0 + x_in
  err_tolerance = {"within factor of 10^-12", RoundUp}
  y_f = iterative_search(x_0, x_f, y_0, w, err_tolerance)
  y_out = y_0 - y_f
  return y_out

def iter_k_fn(x_f, y_0, w):
  def f(y_f):
    y_out = y_0 - y_f
    return -(y_out)**3 + 3 y_0 * y_out^2 - (x_f**2 + w + 3*y_0**2) * y_out

def iterative_search(x_0, x_f, y_0, w, err_tolerance):
  target_k = target_k_fn(x_0, y_0, w, x_f)
  iter_k_calculator = iter_k_fn(x_f, y_0, w)

  # use original CFMM to get y_f reserve bounds
  bound_estimation_target_k = cfmm(x_0, y_0, w)
  bound_estimation_k0 = cfmm(x_f, y_0, w)
  lowerbound, upperbound = y_0, y_0
  k_ratio = bound_estimation_k0 / bound_estimation_target_k
  if k_ratio < 1:
    # k_0 < k. Need to find an upperbound. Worst case assume a linear relationship, gives an upperbound
    # We could derive better bounds via reasoning about coefficients in the cubic,
    # however this is deemed as not worth it, since the solution is quite close
    # when we are in the "stable" part of the curve.
    upperbound = ceil(y_0 / k_ratio)
  elif k_ratio > 1:
    # need to find a lowerbound. We could use a cubic relation, but for now we just set it to 0.
    lowerbound = 0
  else:
    return y_0 # means x_f = x_0
  max_iteration_count = 100
  return binary_search(lowerbound, upperbound, k_calculator, target_k, err_tolerance)

def binary_search(lowerbound, upperbound, approximation_fn, target, max_iteration_count, err_tolerance):
  iter_count = 0
  cur_k_guess = 0
  while (not satisfies_bounds(cur_k_guess, target, err_tolerance)) and iter_count < max_iteration_count:
    iter_count += 1
    cur_y_guess = (lowerbound + upperbound) / 2
    cur_k_guess = approximation_fn(cur_y_guess)

    if cur_k_guess > target:
      upperbound = cur_y_guess
    else if cur_k_guess < target:
      lowerbound = cur_y_guess

  if iter_count == max_iteration_count:
    return Error("max iteration count reached")

  return cur_y_guess
Setting the error tolerance

What remains is setting the error tolerance. We need two properties:

  • The returned value to be within some correctness threshold of the true value
  • The returned value to be rounded correctly (always ending with the user having fewer funds to avoid pool drain attacks). Mitigated by swap fees for normal swaps, but needed for 0-fee to be safe.

The error tolerance we set is defined in terms of error in k, which itself implies some error in y. An error of e_k in k, implies an error e_y in y that is less than e_k. We prove this here (and show that e_y is actually much less than the error in e_k, but for simplicity ignore this fact). We want y to be within a factor of 10^(-12) of its true value. To ensure the returned value is always rounded correctly, we define the rounding behavior expected.

  • If x_in is positive, then we take y_out units of y out of the pool. y_out should be rounded down. Note that y_f < y_0 here. Therefore to round y_out = y_0 - y_f down, given fixed y_0, we want to round y_f up.
  • If x_in is negative, then y_out is also negative. The reason is that this is called in CalcInAmtGivenOut, so confusingly x_in is the known amount out, as a negative quantity. y_out is negative as well, to express that we get that many tokens out. (Since negative, -y_out is how many we add into the pool). We want y_out to be a larger negative, which means we want to round it down. Note that y_f > y_0 here. Therefore y_out = y_0 - y_f is more negative, the higher y_f is. Thus we want to round y_f up.

And therefore we round up in both cases.

Further optimization
  • The astute observer may notice that the equation we are solving in $\text{solve cfmm}$ is actually a cubic polynomial in $y$, with an always-positive derivative. We should then be able to use newton's root finding algorithm to solve for the solution with quadratic convergence. We do not pursue this today, due to other engineering tradeoffs, and insufficient analysis being done.
Using this in swap methods

So now we put together the components discussed in prior sections to achieve pseudocode for the SwapExactAmountIn and SwapExactAmountOut functions.

We assume existence of a function pool.ScaledLiquidity(input, output, rounding_mode) that returns in_reserve, out_reserve, rem_reserves, where each are scaled by their respective scaling factor using the provided rounding mode.

SwapExactAmountIn

So now we need to put together the prior components. When we scale liquidity, we round down, as lower reserves -> higher slippage. Similarly when we scale the token in, we round down as well. These both ensure no risk of over payment.

The amount of tokens that we treat as going into the "0-swap fee" pool we defined equations off of is: amm_in = in_amt_scaled * (1 - swapfee). (With swapfee * in_amt_scaled just being added to pool liquidity)

Then we simply call solve_y with the input reserves, and amm_in.

def CalcOutAmountGivenExactAmountIn(pool, in_coin, out_denom, swap_fee):
  in_reserve, out_reserve, rem_reserves = pool.ScaledLiquidity(in_coin, out_denom, RoundingMode.RoundDown)
  in_amt_scaled = pool.ScaleToken(in_coin, RoundingMode.RoundDown)
  amm_in = in_amt_scaled * (1 - swap_fee)
  out_amt_scaled = solve_y(in_reserve, out_reserve, remReserves, amm_in)
  out_amt = pool.DescaleToken(out_amt_scaled, out_denom)
  return out_amt
SwapExactAmountOut

When we scale liquidity, we round down, as lower reserves -> higher slippage. Similarly when we scale the exact token out, we round up to increase required token in.

We model the solve_y call as we are doing a known change to the out_reserve, and solving for the implied unknown change to in_reserve. To handle the swapfee, we apply the swapfee on the resultant needed input amount. We do this by having token_in = amm_in / (1 - swapfee).

def CalcInAmountGivenExactAmountOut(pool, out_coin, in_denom, swap_fee):
  in_reserve, out_reserve, rem_reserves = pool.ScaledLiquidity(in_denom, out_coin, RoundingMode.RoundDown)
  out_amt_scaled = pool.ScaleToken(out_coin, RoundingMode.RoundUp)

  amm_in_scaled = solve_y(out_reserve, in_reserve, remReserves, -out_amt_scaled)
  swap_in_scaled = ceil(amm_in_scaled / (1 - swapfee))
  in_amt = pool.DescaleToken(swap_in_scaled, in_denom)
  return in_amt

We see correctness of the swap fee, by imagining what happens if we took this resultant input amount, and ran SwapExactAmountIn (seai). Namely, that seai_amm_in = amm_in * (1 - swapfee) = amm_in, as desired!

Precision handling

{Something we have to be careful of is precision handling, notes on why and how we deal with it.}

Proof that |e_y| < 100|e_k|

The function $f(y_{out}) = -y_{out}^3 + 3 y_0 y_{out}^2 - (x_f^2 + w + 3y_0^2)y_{out}$ is monotonically increasing over the reals. You can prove this, by seeing that its derivative's 0 values are both imaginary, and therefore has no local minima or maxima in the reals. Therefore, there exists exactly one real $y_{out}$ s.t. $f(y_{out}) = k$. Via binary search, we solve for a value $y_{out}^{*}$ such that $\left|\frac{ k - k^{*} }{k}\right| < e_k$, where $k^{*} = f(y_{out}^{*})$. We seek to then derive bounds on $e_y = \left|\frac{ y_{out} - y_{out}^{*} }{y_{out}}\right|$ in relation to $e_k$.

Theorem: $e_y < 100 e_k$ as long as $|y_{out}| <= .9y_0$. Informal, we claim that for $.9y_0 < |y_{out}| < y_0$, e_y is "close" to e_k under expected parameterizations. And for $y_{out}$ significantly less than $.9y_0$, the error bounds are much better. (Often better than $e_k$)

Let $y_{out} - y_{out}^* = a_y$, we are going to assume that $a_y << y_{out}$, and will justify this later. But due to this, we treat $a_y^c = 0$ for $c > 1$. This then implies that $y_{out}^2 - y_{out}^{*2} = y_{out}^2 - (y_{out} - a_y)^2 \approx 2y_{out}a_y$, and similarly $y_{out}^3 - y_{out}^{*3} \approx 3y_{out}^2 a_y$

Now we are prepared to start bounding this. $$k - k^{*} = -(y_{out}^3 - y_{out}^{3*}) + 3y_0(y_{out}^2 - y_{out}^{2*}) - (x_f^2 + w + 3y_0^2)(y_{out} - y_{out}^{*})$$

$$k - k^{*} \approx -(3y_{out}^2 a_y) + 3y_0 (2y_{out}a_y) - (x_f^2 + w + 3y_0^2)a_y$$

$$k - k^{*} \approx a_y(-3y_{out}^2 + 6y_0y_{out} - (x_f^2 + w + 3y_0^2))$$

Rewrite $k = y_{out}(-y_{out}^2 + 3y_0y_{out} - (x_f^2 + w + 3y_0^2))$

$$e_k > \left|\frac{ k - k^{*} }{k}\right| = \left|\frac{a_y}{y_{out}} \frac{(-3y_{out}^2 + 6y_0y_{out} - (x_f^2 + w + 3y_0^2))}{(-y_{out}^2 + 3y_0y_{out} - (x_f^2 + w + 3y_0^2))}\right|$$

Notice that $\left|\frac{a_y}{y_{out}}\right| = e_y$! Therefore

$$e_k > e_y\left|\frac{(-3y_{out}^2 + 6y_0y_{out} - (x_f^2 + w + 3y_0^2))}{(-y_{out}^2 + 3y_0y_{out} - (x_f^2 + w + 3y_0^2))}\right|$$

We bound the right hand side, with the assistance of wolfram alpha. Let $a = y_{out}, b = y_0, c = x_f^2 + w$. Then we see from wolfram alpha here, that this right hand expression is provably greater than .01 if some set of decisions hold. We describe the solution set that satisfies our use case here:

  • When $y_{out} > 0$
    • Use solution set: $a > 0, b > \frac{2}{3} a, c > \frac{1}{99} (-299a^2 + 597ab - 297b^2)$
      • $a > 0$ by definition.
      • $b > \frac{2}{3} a$, as thats equivalent to $y_0 > \frac{2}{3} y_{out}$. We already assume that $y_0 >= y_{out}$.
      • Set $y_{out} = .9y_0$, per our theorem assumption. So $b = .9a$. Take $c = x^2 + w = 0$. Then we can show that $(-299a^2 + 597ab - 297b^2) < 0$ for all $a$. This completes the constraint set.
  • When $y_{out} < 0$
    • Use solution set: $a < 0, b > \frac{2}{3} a, c > -a^2 + 3ab - 3b^2$
      • $a < 0$ by definition.
      • $b > \frac{2}{3} a$, as $y_0$ is positive.
      • $c > 0$ is by definition, so we just need to bound when $-a^2 + 3ab - 3b^2 < 0$. This is always the case as long as one of $a$ or $b$ is non-zero, per here.

Tieing this all together, we have that $e_k > .01e_y$. Therefore $e_y < 100 e_k$, satisfying our theoerem!

To show the informal claims, the constraint that led to this 100x error blowup was trying to accomodate high $y_{out}$. When $y_{out}$ is smaller, the error is far lower. (Often to the case that $e_y < e_k$, you can convince yourself of this by setting the ratio to being greater than 1 in wolfram alpha) When $y_{out}$ is bigger than $.9y_0$, we can rely on x_f^2 + w being much larger to lower this error. In these cases, the $x_f$ term must be large relative to $y_0$, which would yield a far better error bound.

TODO: Justify a_y << y_out. (This should be easy, assume its not, that leads to e_k being high. Ratio test probably easiest. Maybe just add a sentence to that effect)

Spot Price

Spot price for an AMM pool is the derivative of its CalculateOutAmountGivenIn equation. However for the stableswap equation, this is painful: wolfram alpha link

So instead we compute the spot price by approximating the derivative via a small swap.

Let $\epsilon$ be a sentinel very small swap in amount.

Then $\text{spot price} = \frac{\text{CalculateOutAmountGivenIn}(\epsilon)}{\epsilon}$.

LP equations

We divide this section into two parts, JoinPoolNoSwap & ExitPool, and JoinPool.

First we recap what are the properties that we'd expect from JoinPoolNoSwap, ExitPool, and LP shares. From this, we then derive what we'd expect for JoinPool.

JoinPoolNoSwap and ExitPool

Both of these methods can be implemented via generic AMM techniques. (Link to them or describe the idea)

JoinPool

The JoinPool API only supports JoinPoolNoSwap if

Join pool single asset in

There are a couple ways to define JoinPoolSingleAssetIn. The simplest way is to define it from its intended relation from the CFMM, with Exit pool. We describe this below under the zero swap fee case.

Let pool_{L, S} represent a pool with liquidity L, and S total LP shares. If we call pool_{L, S}.JoinPoolSingleAssetIn(tokensIn) -> (N, pool_{L + tokensIn, S + N}), or in others we get out N new LP shares, and a pool with with tokensIn added to liquidity. It must then be the case that pool_{L+tokensIn, S+N}.ExitPool(N) -> (tokensExited, pool_{L + tokensIn - tokensExited, S}). Then if we swap all of tokensExited back to tokensIn, under 0 swap fee, we should get back to pool_{L, S} under the CFMM property.

In other words, if we single asset join pool, and then exit pool, we should return back to the same CFMM k value we started with. Then if we swap back to go entirely back into our input asset, we should have exactly many tokens as we started with, under 0 swap fee.

We can solve this relation with a binary search over the amount of LP shares to give!

Thus we are left with how to account swap fee. We currently account for swap fee, by considering the asset ratio in the pool. If post scaling factors, the pool liquidity is say 60:20:20, where 60 is the asset were bringing in, then we consider "only (1 - 60%) = 40%" of the input as getting swapped. So we charge the swap fee on 40% of our single asset join in input. So the pseudocode for this is roughly:

def JoinPoolSingleAssetIn(pool, tokenIn):
  swapFeeApplicableFraction = 1 - (pool.ScaledLiquidityOf(tokenIn.Denom) / pool.SumOfAllScaledLiquidity())
  effectiveSwapFee = pool.SwapFee * swapFeeApplicableFraction
  effectiveTokenIn = RoundDown(tokenIn * (1 - effectiveSwapFee))
  return BinarySearchSingleJoinLpShares(pool, effectiveTokenIn)

We leave the rounding mode for the scaling factor division unspecified. This is because its expected to be tiny (as the denominator is larger than the numerator, and we are operating in BigDec), and it should be dominated by the later step of rounding down.

Code structure

Testing strategy

  • Unit tests for every pool interface method
  • Msg tests for custom messages
    • CreatePool
    • SetScalingFactors
  • Simulator integrations:
    • Pool creation
    • JoinPool + ExitPool gives a token amount out that is lte input
    • SingleTokenIn + ExitPool + Swap to base token gives a token amount that is less than input
    • CFMM k adjusting in the correct direction after every action
  • Fuzz test binary search algorithm, to see that it still works correctly across wide scale ranges
  • Fuzz test approximate equality of iterative approximation swap algorithm and direct equation swap.
  • Flow testing the entire stableswap scaling factor update process

Documentation

Index

Constants

View Source
const (
	TypeMsgCreateStableswapPool           = "create_stableswap_pool"
	TypeMsgStableSwapAdjustScalingFactors = "stable_swap_adjust_scaling_factors"
)
View Source
const PoolTypeName string = "Stableswap"

Variables

View Source
var (
	ErrInvalidLengthStableswapPool        = fmt.Errorf("proto: negative length found during unmarshaling")
	ErrIntOverflowStableswapPool          = fmt.Errorf("proto: integer overflow")
	ErrUnexpectedEndOfGroupStableswapPool = fmt.Errorf("proto: unexpected end of group")
)
View Source
var (
	ErrInvalidLengthTx        = fmt.Errorf("proto: negative length found during unmarshaling")
	ErrIntOverflowTx          = fmt.Errorf("proto: integer overflow")
	ErrUnexpectedEndOfGroupTx = fmt.Errorf("proto: unexpected end of group")
)
View Source
var (

	// ModuleCdc references the global x/bank module codec. Note, the codec should
	// ONLY be used in certain instances of tests and for JSON encoding as Amino is
	// still used for that purpose.
	//
	// The actual codec used for serialization should be provided to x/staking and
	// defined at the application level.
	ModuleCdc = codec.NewAminoCodec(amino)
)

Functions

func RegisterInterfaces

func RegisterInterfaces(registry codectypes.InterfaceRegistry)

func RegisterLegacyAminoCodec

func RegisterLegacyAminoCodec(cdc *codec.LegacyAmino)

RegisterLegacyAminoCodec registers the necessary x/gamm interfaces and concrete types on the provided LegacyAmino codec. These types are used for Amino JSON serialization.

func RegisterMsgServer

func RegisterMsgServer(s grpc1.Server, srv MsgServer)

Types

type MsgClient

type MsgClient interface {
	CreateStableswapPool(ctx context.Context, in *MsgCreateStableswapPool, opts ...grpc.CallOption) (*MsgCreateStableswapPoolResponse, error)
	StableSwapAdjustScalingFactors(ctx context.Context, in *MsgStableSwapAdjustScalingFactors, opts ...grpc.CallOption) (*MsgStableSwapAdjustScalingFactorsResponse, error)
}

MsgClient is the client API for Msg service.

For semantics around ctx use and closing/ending streaming RPCs, please refer to https://godoc.org/google.golang.org/grpc#ClientConn.NewStream.

func NewMsgClient

func NewMsgClient(cc grpc1.ClientConn) MsgClient

type MsgCreateStableswapPool

type MsgCreateStableswapPool struct {
	Sender                  string                                   `protobuf:"bytes,1,opt,name=sender,proto3" json:"sender,omitempty" yaml:"sender"`
	PoolParams              *PoolParams                              `protobuf:"bytes,2,opt,name=pool_params,json=poolParams,proto3" json:"pool_params,omitempty" yaml:"pool_params"`
	InitialPoolLiquidity    github_com_cosmos_cosmos_sdk_types.Coins `` /* 167-byte string literal not displayed */
	ScalingFactors          []uint64                                 `` /* 144-byte string literal not displayed */
	FuturePoolGovernor      string                                   `` /* 145-byte string literal not displayed */
	ScalingFactorController string                                   `` /* 165-byte string literal not displayed */
}

===================== MsgCreatePool

func NewMsgCreateStableswapPool

func NewMsgCreateStableswapPool(
	sender sdk.AccAddress,
	poolParams PoolParams,
	initialLiquidity sdk.Coins,
	scalingFactors []uint64,
	futurePoolGovernor string,
) MsgCreateStableswapPool

func (MsgCreateStableswapPool) CreatePool

func (msg MsgCreateStableswapPool) CreatePool(ctx sdk.Context, poolId uint64) (poolmanagertypes.PoolI, error)

func (*MsgCreateStableswapPool) Descriptor

func (*MsgCreateStableswapPool) Descriptor() ([]byte, []int)

func (*MsgCreateStableswapPool) GetFuturePoolGovernor

func (m *MsgCreateStableswapPool) GetFuturePoolGovernor() string

func (*MsgCreateStableswapPool) GetInitialPoolLiquidity

func (*MsgCreateStableswapPool) GetPoolParams

func (m *MsgCreateStableswapPool) GetPoolParams() *PoolParams

func (MsgCreateStableswapPool) GetPoolType

func (*MsgCreateStableswapPool) GetScalingFactorController

func (m *MsgCreateStableswapPool) GetScalingFactorController() string

func (*MsgCreateStableswapPool) GetScalingFactors

func (m *MsgCreateStableswapPool) GetScalingFactors() []uint64

func (*MsgCreateStableswapPool) GetSender

func (m *MsgCreateStableswapPool) GetSender() string

func (MsgCreateStableswapPool) GetSignBytes

func (msg MsgCreateStableswapPool) GetSignBytes() []byte

func (MsgCreateStableswapPool) GetSigners

func (msg MsgCreateStableswapPool) GetSigners() []sdk.AccAddress

func (MsgCreateStableswapPool) InitialLiquidity

func (msg MsgCreateStableswapPool) InitialLiquidity() sdk.Coins

func (*MsgCreateStableswapPool) Marshal

func (m *MsgCreateStableswapPool) Marshal() (dAtA []byte, err error)

func (*MsgCreateStableswapPool) MarshalTo

func (m *MsgCreateStableswapPool) MarshalTo(dAtA []byte) (int, error)

func (*MsgCreateStableswapPool) MarshalToSizedBuffer

func (m *MsgCreateStableswapPool) MarshalToSizedBuffer(dAtA []byte) (int, error)

func (MsgCreateStableswapPool) PoolCreator

func (msg MsgCreateStableswapPool) PoolCreator() sdk.AccAddress

func (*MsgCreateStableswapPool) ProtoMessage

func (*MsgCreateStableswapPool) ProtoMessage()

func (*MsgCreateStableswapPool) Reset

func (m *MsgCreateStableswapPool) Reset()

func (MsgCreateStableswapPool) Route

func (msg MsgCreateStableswapPool) Route() string

func (*MsgCreateStableswapPool) Size

func (m *MsgCreateStableswapPool) Size() (n int)

func (*MsgCreateStableswapPool) String

func (m *MsgCreateStableswapPool) String() string

func (MsgCreateStableswapPool) Type

func (msg MsgCreateStableswapPool) Type() string

func (*MsgCreateStableswapPool) Unmarshal

func (m *MsgCreateStableswapPool) Unmarshal(dAtA []byte) error

func (MsgCreateStableswapPool) Validate

func (msg MsgCreateStableswapPool) Validate(ctx sdk.Context) error

func (MsgCreateStableswapPool) ValidateBasic

func (msg MsgCreateStableswapPool) ValidateBasic() error

func (*MsgCreateStableswapPool) XXX_DiscardUnknown

func (m *MsgCreateStableswapPool) XXX_DiscardUnknown()

func (*MsgCreateStableswapPool) XXX_Marshal

func (m *MsgCreateStableswapPool) XXX_Marshal(b []byte, deterministic bool) ([]byte, error)

func (*MsgCreateStableswapPool) XXX_Merge

func (m *MsgCreateStableswapPool) XXX_Merge(src proto.Message)

func (*MsgCreateStableswapPool) XXX_Size

func (m *MsgCreateStableswapPool) XXX_Size() int

func (*MsgCreateStableswapPool) XXX_Unmarshal

func (m *MsgCreateStableswapPool) XXX_Unmarshal(b []byte) error

type MsgCreateStableswapPoolResponse

type MsgCreateStableswapPoolResponse struct {
	PoolID uint64 `protobuf:"varint,1,opt,name=pool_id,json=poolId,proto3" json:"pool_id,omitempty"`
}

Returns a poolID with custom poolName.

func (*MsgCreateStableswapPoolResponse) Descriptor

func (*MsgCreateStableswapPoolResponse) Descriptor() ([]byte, []int)

func (*MsgCreateStableswapPoolResponse) GetPoolID

func (m *MsgCreateStableswapPoolResponse) GetPoolID() uint64

func (*MsgCreateStableswapPoolResponse) Marshal

func (m *MsgCreateStableswapPoolResponse) Marshal() (dAtA []byte, err error)

func (*MsgCreateStableswapPoolResponse) MarshalTo

func (m *MsgCreateStableswapPoolResponse) MarshalTo(dAtA []byte) (int, error)

func (*MsgCreateStableswapPoolResponse) MarshalToSizedBuffer

func (m *MsgCreateStableswapPoolResponse) MarshalToSizedBuffer(dAtA []byte) (int, error)

func (*MsgCreateStableswapPoolResponse) ProtoMessage

func (*MsgCreateStableswapPoolResponse) ProtoMessage()

func (*MsgCreateStableswapPoolResponse) Reset

func (*MsgCreateStableswapPoolResponse) Size

func (m *MsgCreateStableswapPoolResponse) Size() (n int)

func (*MsgCreateStableswapPoolResponse) String

func (*MsgCreateStableswapPoolResponse) Unmarshal

func (m *MsgCreateStableswapPoolResponse) Unmarshal(dAtA []byte) error

func (*MsgCreateStableswapPoolResponse) XXX_DiscardUnknown

func (m *MsgCreateStableswapPoolResponse) XXX_DiscardUnknown()

func (*MsgCreateStableswapPoolResponse) XXX_Marshal

func (m *MsgCreateStableswapPoolResponse) XXX_Marshal(b []byte, deterministic bool) ([]byte, error)

func (*MsgCreateStableswapPoolResponse) XXX_Merge

func (m *MsgCreateStableswapPoolResponse) XXX_Merge(src proto.Message)

func (*MsgCreateStableswapPoolResponse) XXX_Size

func (m *MsgCreateStableswapPoolResponse) XXX_Size() int

func (*MsgCreateStableswapPoolResponse) XXX_Unmarshal

func (m *MsgCreateStableswapPoolResponse) XXX_Unmarshal(b []byte) error

type MsgServer

MsgServer is the server API for Msg service.

type MsgStableSwapAdjustScalingFactors

type MsgStableSwapAdjustScalingFactors struct {
	Sender         string   `protobuf:"bytes,1,opt,name=sender,proto3" json:"sender,omitempty" yaml:"sender"`
	PoolID         uint64   `protobuf:"varint,2,opt,name=pool_id,json=poolId,proto3" json:"pool_id,omitempty"`
	ScalingFactors []uint64 `` /* 144-byte string literal not displayed */
}

Sender must be the pool's scaling_factor_governor in order for the tx to succeed. Adjusts stableswap scaling factors.

func NewMsgStableSwapAdjustScalingFactors

func NewMsgStableSwapAdjustScalingFactors(
	sender string,
	poolID uint64,
	scalingFactors []uint64,
) MsgStableSwapAdjustScalingFactors

Implement sdk.Msg

func (*MsgStableSwapAdjustScalingFactors) Descriptor

func (*MsgStableSwapAdjustScalingFactors) Descriptor() ([]byte, []int)

func (*MsgStableSwapAdjustScalingFactors) GetPoolID

func (*MsgStableSwapAdjustScalingFactors) GetScalingFactors

func (m *MsgStableSwapAdjustScalingFactors) GetScalingFactors() []uint64

func (*MsgStableSwapAdjustScalingFactors) GetSender

func (MsgStableSwapAdjustScalingFactors) GetSignBytes

func (msg MsgStableSwapAdjustScalingFactors) GetSignBytes() []byte

func (MsgStableSwapAdjustScalingFactors) GetSigners

func (*MsgStableSwapAdjustScalingFactors) Marshal

func (m *MsgStableSwapAdjustScalingFactors) Marshal() (dAtA []byte, err error)

func (*MsgStableSwapAdjustScalingFactors) MarshalTo

func (m *MsgStableSwapAdjustScalingFactors) MarshalTo(dAtA []byte) (int, error)

func (*MsgStableSwapAdjustScalingFactors) MarshalToSizedBuffer

func (m *MsgStableSwapAdjustScalingFactors) MarshalToSizedBuffer(dAtA []byte) (int, error)

func (*MsgStableSwapAdjustScalingFactors) ProtoMessage

func (*MsgStableSwapAdjustScalingFactors) ProtoMessage()

func (*MsgStableSwapAdjustScalingFactors) Reset

func (MsgStableSwapAdjustScalingFactors) Route

func (*MsgStableSwapAdjustScalingFactors) Size

func (m *MsgStableSwapAdjustScalingFactors) Size() (n int)

func (*MsgStableSwapAdjustScalingFactors) String

func (MsgStableSwapAdjustScalingFactors) Type

func (*MsgStableSwapAdjustScalingFactors) Unmarshal

func (m *MsgStableSwapAdjustScalingFactors) Unmarshal(dAtA []byte) error

func (MsgStableSwapAdjustScalingFactors) ValidateBasic

func (msg MsgStableSwapAdjustScalingFactors) ValidateBasic() error

func (*MsgStableSwapAdjustScalingFactors) XXX_DiscardUnknown

func (m *MsgStableSwapAdjustScalingFactors) XXX_DiscardUnknown()

func (*MsgStableSwapAdjustScalingFactors) XXX_Marshal

func (m *MsgStableSwapAdjustScalingFactors) XXX_Marshal(b []byte, deterministic bool) ([]byte, error)

func (*MsgStableSwapAdjustScalingFactors) XXX_Merge

func (*MsgStableSwapAdjustScalingFactors) XXX_Size

func (m *MsgStableSwapAdjustScalingFactors) XXX_Size() int

func (*MsgStableSwapAdjustScalingFactors) XXX_Unmarshal

func (m *MsgStableSwapAdjustScalingFactors) XXX_Unmarshal(b []byte) error

type MsgStableSwapAdjustScalingFactorsResponse

type MsgStableSwapAdjustScalingFactorsResponse struct {
}

func (*MsgStableSwapAdjustScalingFactorsResponse) Descriptor

func (*MsgStableSwapAdjustScalingFactorsResponse) Descriptor() ([]byte, []int)

func (*MsgStableSwapAdjustScalingFactorsResponse) Marshal

func (m *MsgStableSwapAdjustScalingFactorsResponse) Marshal() (dAtA []byte, err error)

func (*MsgStableSwapAdjustScalingFactorsResponse) MarshalTo

func (m *MsgStableSwapAdjustScalingFactorsResponse) MarshalTo(dAtA []byte) (int, error)

func (*MsgStableSwapAdjustScalingFactorsResponse) MarshalToSizedBuffer

func (m *MsgStableSwapAdjustScalingFactorsResponse) MarshalToSizedBuffer(dAtA []byte) (int, error)

func (*MsgStableSwapAdjustScalingFactorsResponse) ProtoMessage

func (*MsgStableSwapAdjustScalingFactorsResponse) Reset

func (*MsgStableSwapAdjustScalingFactorsResponse) Size

func (*MsgStableSwapAdjustScalingFactorsResponse) String

func (*MsgStableSwapAdjustScalingFactorsResponse) Unmarshal

func (*MsgStableSwapAdjustScalingFactorsResponse) XXX_DiscardUnknown

func (m *MsgStableSwapAdjustScalingFactorsResponse) XXX_DiscardUnknown()

func (*MsgStableSwapAdjustScalingFactorsResponse) XXX_Marshal

func (m *MsgStableSwapAdjustScalingFactorsResponse) XXX_Marshal(b []byte, deterministic bool) ([]byte, error)

func (*MsgStableSwapAdjustScalingFactorsResponse) XXX_Merge

func (*MsgStableSwapAdjustScalingFactorsResponse) XXX_Size

func (*MsgStableSwapAdjustScalingFactorsResponse) XXX_Unmarshal

type Pool

type Pool struct {
	Address    string     `protobuf:"bytes,1,opt,name=address,proto3" json:"address,omitempty" yaml:"address"`
	Id         uint64     `protobuf:"varint,2,opt,name=id,proto3" json:"id,omitempty"`
	PoolParams PoolParams `protobuf:"bytes,3,opt,name=pool_params,json=poolParams,proto3" json:"pool_params" yaml:"stableswap_pool_params"`
	// This string specifies who will govern the pool in the future.
	// Valid forms of this are:
	// {token name},{duration}
	// {duration}
	// where {token name} if specified is the token which determines the
	// governor, and if not specified is the LP token for this pool.duration is
	// a time specified as 0w,1w,2w, etc. which specifies how long the token
	// would need to be locked up to count in governance. 0w means no lockup.
	FuturePoolGovernor string `` /* 145-byte string literal not displayed */
	// sum of all LP shares
	TotalShares types.Coin `protobuf:"bytes,5,opt,name=total_shares,json=totalShares,proto3" json:"total_shares" yaml:"total_shares"`
	// assets in the pool
	PoolLiquidity github_com_cosmos_cosmos_sdk_types.Coins `` /* 144-byte string literal not displayed */
	// for calculation amognst assets with different precisions
	ScalingFactors []uint64 `` /* 145-byte string literal not displayed */
	// scaling_factor_controller is the address can adjust pool scaling factors
	ScalingFactorController string `` /* 165-byte string literal not displayed */
}

Pool is the stableswap Pool struct

func NewStableswapPool

func NewStableswapPool(poolId uint64,
	stableswapPoolParams PoolParams, initialLiquidity sdk.Coins,
	scalingFactors []uint64, scalingFactorController string,
	futureGovernor string,
) (Pool, error)

NewStableswapPool returns a stableswap pool Invariants that are assumed to be satisfied and not checked: * poolID doesn't already exist

func (Pool) CalcExitPoolCoinsFromShares

func (p Pool) CalcExitPoolCoinsFromShares(ctx sdk.Context, exitingShares sdk.Int, exitFee sdk.Dec) (exitingCoins sdk.Coins, err error)

func (Pool) CalcInAmtGivenOut

func (p Pool) CalcInAmtGivenOut(ctx sdk.Context, tokenOut sdk.Coins, tokenInDenom string, swapFee sdk.Dec) (tokenIn sdk.Coin, err error)

CalcInAmtGivenOut calculates input amount needed to receive given output

func (Pool) CalcJoinPoolNoSwapShares

func (p Pool) CalcJoinPoolNoSwapShares(ctx sdk.Context, tokensIn sdk.Coins, swapFee sdk.Dec) (numShares sdk.Int, tokensJoined sdk.Coins, err error)

CalcJoinPoolNoSwapShares calculates the number of shares created to execute an all-asset pool join with the provided amount of `tokensIn`. The input tokens must contain the same tokens as in the pool.

Returns the number of shares created, the amount of coins actually joined into the pool as not all may tokens may be joinable. If an all-asset join is not possible, returns an error.

func (*Pool) CalcJoinPoolShares

func (p *Pool) CalcJoinPoolShares(ctx sdk.Context, tokensIn sdk.Coins, swapFee sdk.Dec) (numShares sdk.Int, newLiquidity sdk.Coins, err error)

func (Pool) CalcOutAmtGivenIn

func (p Pool) CalcOutAmtGivenIn(ctx sdk.Context, tokenIn sdk.Coins, tokenOutDenom string, swapFee sdk.Dec) (tokenOut sdk.Coin, err error)

TODO: These should all get moved to amm.go CalcOutAmtGivenIn calculates expected output amount given input token

func (Pool) Copy

func (p Pool) Copy() Pool

func (*Pool) Descriptor

func (*Pool) Descriptor() ([]byte, []int)

func (*Pool) ExitPool

func (p *Pool) ExitPool(ctx sdk.Context, exitingShares sdk.Int, exitFee sdk.Dec) (exitingCoins sdk.Coins, err error)

func (Pool) GetAddress

func (p Pool) GetAddress() sdk.AccAddress

func (Pool) GetExitFee

func (p Pool) GetExitFee(ctx sdk.Context) sdk.Dec

func (Pool) GetId

func (p Pool) GetId() uint64

func (Pool) GetScalingFactorByDenom

func (p Pool) GetScalingFactorByDenom(denom string) uint64

CONTRACT: scaling factors follow the same index with pool liquidity denoms

func (Pool) GetScalingFactors

func (p Pool) GetScalingFactors() []uint64

func (Pool) GetSwapFee

func (p Pool) GetSwapFee(ctx sdk.Context) sdk.Dec

func (Pool) GetTotalPoolLiquidity

func (p Pool) GetTotalPoolLiquidity(ctx sdk.Context) sdk.Coins

Returns the coins in the pool owned by all LP shareholders

func (Pool) GetTotalShares

func (p Pool) GetTotalShares() sdk.Int

func (Pool) GetType

func (p Pool) GetType() poolmanagertypes.PoolType

func (Pool) IsActive

func (p Pool) IsActive(ctx sdk.Context) bool

func (*Pool) JoinPool

func (p *Pool) JoinPool(ctx sdk.Context, tokensIn sdk.Coins, swapFee sdk.Dec) (sdk.Int, error)

func (*Pool) JoinPoolNoSwap

func (p *Pool) JoinPoolNoSwap(ctx sdk.Context, tokensIn sdk.Coins, swapFee sdk.Dec) (sdk.Int, error)

func (*Pool) Marshal

func (m *Pool) Marshal() (dAtA []byte, err error)

func (*Pool) MarshalTo

func (m *Pool) MarshalTo(dAtA []byte) (int, error)

func (*Pool) MarshalToSizedBuffer

func (m *Pool) MarshalToSizedBuffer(dAtA []byte) (int, error)

func (Pool) NumAssets

func (p Pool) NumAssets() int

func (*Pool) ProtoMessage

func (*Pool) ProtoMessage()

func (*Pool) Reset

func (m *Pool) Reset()

func (*Pool) SetScalingFactors

func (p *Pool) SetScalingFactors(ctx sdk.Context, scalingFactors []uint64, sender string) error

SetScalingFactors sets scaling factors for pool to the given amount It should only be able to be successfully called by the pool's ScalingFactorGovernor TODO: move commented test for this function from x/gamm/keeper/pool_service_test.go once a pool_test.go file has been created for stableswap

func (*Pool) Size

func (m *Pool) Size() (n int)

func (Pool) SpotPrice

func (p Pool) SpotPrice(ctx sdk.Context, quoteAssetDenom string, baseAssetDenom string) (sdk.Dec, error)

SpotPrice calculates the approximate amount of `baseDenom` one would receive for an input dx of `quoteDenom` (to simplify calculations, we approximate dx = 1)

func (Pool) String

func (p Pool) String() string

func (*Pool) SwapInAmtGivenOut

func (p *Pool) SwapInAmtGivenOut(ctx sdk.Context, tokenOut sdk.Coins, tokenInDenom string, swapFee sdk.Dec) (tokenIn sdk.Coin, err error)

SwapInAmtGivenOut executes a swap given a desired output amount

func (*Pool) SwapOutAmtGivenIn

func (p *Pool) SwapOutAmtGivenIn(ctx sdk.Context, tokenIn sdk.Coins, tokenOutDenom string, swapFee sdk.Dec) (tokenOut sdk.Coin, err error)

SwapOutAmtGivenIn executes a swap given a desired input amount

func (*Pool) Unmarshal

func (m *Pool) Unmarshal(dAtA []byte) error

func (*Pool) XXX_DiscardUnknown

func (m *Pool) XXX_DiscardUnknown()

func (*Pool) XXX_Marshal

func (m *Pool) XXX_Marshal(b []byte, deterministic bool) ([]byte, error)

func (*Pool) XXX_Merge

func (m *Pool) XXX_Merge(src proto.Message)

func (*Pool) XXX_Size

func (m *Pool) XXX_Size() int

func (*Pool) XXX_Unmarshal

func (m *Pool) XXX_Unmarshal(b []byte) error

type PoolParams

type PoolParams struct {
	SwapFee github_com_cosmos_cosmos_sdk_types.Dec `` /* 138-byte string literal not displayed */
	ExitFee github_com_cosmos_cosmos_sdk_types.Dec `` /* 138-byte string literal not displayed */
}

PoolParams defined the parameters that will be managed by the pool governance in the future. This params are not managed by the chain governance. Instead they will be managed by the token holders of the pool. The pool's token holders are specified in future_pool_governor.

func (*PoolParams) Descriptor

func (*PoolParams) Descriptor() ([]byte, []int)

func (*PoolParams) Marshal

func (m *PoolParams) Marshal() (dAtA []byte, err error)

func (*PoolParams) MarshalTo

func (m *PoolParams) MarshalTo(dAtA []byte) (int, error)

func (*PoolParams) MarshalToSizedBuffer

func (m *PoolParams) MarshalToSizedBuffer(dAtA []byte) (int, error)

func (*PoolParams) ProtoMessage

func (*PoolParams) ProtoMessage()

func (*PoolParams) Reset

func (m *PoolParams) Reset()

func (*PoolParams) Size

func (m *PoolParams) Size() (n int)

func (*PoolParams) String

func (m *PoolParams) String() string

func (*PoolParams) Unmarshal

func (m *PoolParams) Unmarshal(dAtA []byte) error

func (PoolParams) Validate

func (params PoolParams) Validate() error

func (*PoolParams) XXX_DiscardUnknown

func (m *PoolParams) XXX_DiscardUnknown()

func (*PoolParams) XXX_Marshal

func (m *PoolParams) XXX_Marshal(b []byte, deterministic bool) ([]byte, error)

func (*PoolParams) XXX_Merge

func (m *PoolParams) XXX_Merge(src proto.Message)

func (*PoolParams) XXX_Size

func (m *PoolParams) XXX_Size() int

func (*PoolParams) XXX_Unmarshal

func (m *PoolParams) XXX_Unmarshal(b []byte) error

type UnimplementedMsgServer

type UnimplementedMsgServer struct {
}

UnimplementedMsgServer can be embedded to have forward compatible implementations.

func (*UnimplementedMsgServer) CreateStableswapPool

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