Communication Complexity of Inner Product in Symmetric Normed Spaces

TL;DR

This paper investigates the communication complexity of computing the inner product in symmetric normed spaces, providing upper and lower bounds, and exploring the role of embeddings and extension complexity in protocol efficiency.

Contribution

It introduces new bounds for the communication complexity of inner product problems in symmetric norms, linking protocol efficiency to geometric embeddings and extension complexity.

Findings

Randomized protocol with ilde{O}(rac{1}{ ext{epsilon}^6} imes ext{log} n) bits for symmetric norms.

Upper and lower bounds for ext{IP}_{ ext{ell}_p} complexity depending on p and epsilon.

Communication complexity related to embeddings of ext{ell}_ extinfty^k into the norm and extension complexity of polytopes.

Abstract

We introduce and study the communication complexity of computing the inner product of two vectors, where the input is restricted w.r.t. a norm $N$ on the space $\mathbb{R}^n$. Here, Alice and Bob hold two vectors $v,u$ such that $\|v\|_N\le 1$ and $\|u\|_{N^*}\le 1$, where $N^*$ is the dual norm. They want to compute their inner product $\langle v,u \rangle$ up to an $\varepsilon$ additive term. The problem is denoted by $\mathrm{IP}_N$. We systematically study $\mathrm{IP}_N$, showing the following results: - For any symmetric norm $N$, given $\|v\|_N\le 1$ and $\|u\|_{N^*}\le 1$ there is a randomized protocol for $\mathrm{IP}_N$ using $\tilde{\mathcal{O}}(\varepsilon^{-6} \log n)$ bits -- we will denote this by $\mathcal{R}_{\varepsilon,1/3}(\mathrm{IP}_{N}) \leq \tilde{\mathcal{O}}(\varepsilon^{-6} \log n)$. - One way communication complexity $\overrightarrow{\mathcal{R}}(\mathrm{IP}_{\ell_p})\leq\mathcal{O}(\varepsilon^{-\max(2,p)}\cdot \log\frac n\varepsilon)$, and a nearly matching lower bound $\overrightarrow{\mathcal{R}}(\mathrm{IP}_{\ell_p}) \geq \Omega(\varepsilon^{-\max(2,p)})$ for $\varepsilon^{-\max(2,p)} \ll n$. - One way communication complexity $\overrightarrow{\mathcal{R}}(N)$ for a symmetric norm $N$ is governed by embeddings $\ell_\infty^k$ into $N$. Specifically, while a small distortion embedding easily implies a lower bound $\Omega(k)$, we show that, conversely, non-existence of such an embedding implies protocol with communication $k^{\mathcal{O}(\log \log k)} \log^2 n$. - For arbitrary origin symmetric convex polytope $P$, we show $\mathcal{R}(\mathrm{IP}_{N}) \le\mathcal{O}(\varepsilon^{-2} \log \mathrm{xc}(P))$, where $N$ is the unique norm for which $P$ is a unit ball, and $\mathrm{xc}(P)$ is the extension complexity of $P$.