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Low-bandwidth recovery of linear functions of Reed-Solomon-encoded data

We study the problem of efficiently computing on encoded data. More specifically, we study the question of low-bandwidth computation of functions $F:\mathbb{F}^k \to \mathbb{F}$ of some data $x \in \mathbb{F}^k$, given access to an encoding $c \in \mathbb{F}^n$ of $x$ under an error correcting code. In our model -- relevant in distributed storage, distributed computation and secret sharing -- each symbol of $c$ is held by a different party, and we aim to minimize the total amount of information downloaded from each party in order to compute $F(x)$. Special cases of this problem have arisen in several domains, and we believe that it is fruitful to study this problem in generality. Our main result is a low-bandwidth scheme to compute linear functions for Reed-Solomon codes, even in the presence of erasures. More precisely, let $ε> 0$ and let $\mathcal{C}: \mathbb{F}^k \to \mathbb{F}^n$ be a full-length Reed-Solomon code of rate $1 - ε$ over a field $\mathbb{F}$ with constant characteristic. For any $γ\in [0, ε)$, our scheme can compute any linear function $F(x)$ given access to any $(1 - γ)$-fraction of the symbols of $\mathcal{C}(x)$, with download bandwidth $O(n/(ε- γ))$ bits. In contrast, the naive scheme that involves reconstructing the data $x$ and then computing $F(x)$ uses $Θ(n \log n)$ bits. Our scheme has applications in distributed storage, coded computation, and homomorphic secret sharing.