## Preamble

```
MIP10c3-SP#: 37
Author(s): Niklas Kunkel (@NiklasKunkel)
Contributors:
Type: Process Component
Oracle Team Name: Green
Status: RFC
Date Proposed: 2020-06-06
Date Ratified: <yyyy-mm-dd>
```

## Specification

### Introduction

This Oracle would provide the SLP-V2-AAVE-ETH/USD price as part of the collateral onboarding process for the SLP-V2-AAVE-ETH LP token.

### Oracle Data Model

A smart contract utilizes SushiSwap primitives and liquidity reserves to calculate the price of a Uniswap Liquidity Provider (LP) token.

The reserves of the SushiSwap pool, and the supply of the SushiSwap LP token are used as inputs to the model. This model utilizes MakerDAO Oracles to price the underlying assets.

This model utilizes the following base assumptions:

(1) `Invariant k = reserve_x * reserve_y`

(2) `reserve_x * price_x = reserve_y * price_y`

(only holds true at steady-state)

Combining (1) and (2) allows us to derive the formulas for calculating the â€śnormalizedâ€ť reserve balances of the underlying assets given the invariant k and prices of the underlying assets.

(3) `reserve_x = sqrt(k * price_y / price_x)`

(4) `reserve_y = sqrt*(k * price_x / price_y)`

Alternatively given one calculated normalized reserve, one can calculate the other using a mutation of (1).

This is useful for optimizing gas since calculating the square root is an expensive operation.

(5) `reserve_x = k / reserve_y`

(6) `reserve_y = k / reserve_x`

Once the normalized reserve balances have been calculated, the price of the LP token can be derived:

(7) `price_lp = ( (reserve_x * price_x) + (reserve_y * price_y) ) / supply_lp`

Substitution of (3), (4) and (7) gives us the following model for calculating the price of a SushiSwap LP token:

(8) `price_lp = ( (sqrt(k * price_y / price_x) * price_x) + (sqrt(k * price_x / price_y) * price_y) ) / supply_lp`

This can be simplified to:

(9) `price_lp = 2 * sqrt(k * price_x * price_y) / supply_lp`

k can be re-expressed in terms of the current pool reserves reserve_x and reserve_y:

(10) `price_lp = 2 * sqrt(reserve_x * price_x * reserve_1 * price_1) / supply_lp`

### Oracle Supporting Data Model(s)

**AAVE/USD (canonical)**

```
| Source | Asset Pair | Feed Model |
| :------------ | :------------ | :----------: |
| Balancer | AAVE/USD | Median |
| Binance | AAVE/BTC | |
| Gemini | AAVE/USD | |
| Huobi | AAVE/USDT | |
| OKEx | AAVE/USDT | |
| Uniswap | AAVE/ETH |
```

**ETH/USD (canonical)**

```
| Source | Asset Pair | Feed Model |
| :------------ | :------------ | :----------: |
| Binance | ETH/USD | Median |
| Bitfinex | ETH/USDT | |
| Bitstamp | ETH/USD | |
| Coinbase | ETH/USD | |
| Gemini | ETH/USD | |
| Kraken | ETH/USD | |
```

### Oracle Address

- Mainnet - SushiV2LpOracle - TBD

### Supported Tools

UniV2LpOracle - Source Code

UniV2LpOracle - Tests

UniV2LpOracle - ABDK Audit

### Remaining Work

- Deploy Oracle from Factory Contract
- Update
`OmegaPoker`

to`poke`

SushiV2LpOracle instance

### Summary

The SushiSwap V2 AAVE-ETH pair has a fair amount of liquidity with $146 million at time of publishing.

The Uniswap V2 LP Oracle was architected from the outset to be generalizable to both Uniswap V2 and Sushiswap V2 LP tokens. Since their introduction into the Maker Protocol 5 months ago, the LP Oracles have proven themselves to be both resilient and secure. The smart contracts have also completed a final audit by ABDK, who to their credit were also selected to audit Uniswap V3. That said, significant smart contract changes were recently introduced as a result of the audit and further gas-optimizations. Therefore the Oracle Domain Team is recommending that the debt ceiling starts low and be raised iteratively over time. This conservative strategy is further supported by the introduction of a`cropJoin`

adapter contract which needs to prove itself in a production capacity.

This Oracle utilizes the existing AAVE/USD Oracle Medianizer for the AAVE component of the Oracle and the ETH/USD Oracle Medianizer for the ETH component. This protects against flash-loan attacks which attempt to manipulate the reserve ratios of the pool.