English

On Multilinear Forms: Bias, Correlation, and Tensor Rank

Computational Complexity 2018-04-26 v2

Abstract

In this paper, we prove new relations between the bias of multilinear forms, the correlation between multilinear forms and lower degree polynomials, and the rank of tensors over GF(2)={0,1}GF(2)= \{0,1\}. We show the following results for multilinear forms and tensors. 1. Correlation bounds : We show that a random dd-linear form has exponentially low correlation with low-degree polynomials. More precisely, for d2o(k)d \ll 2^{o(k)}, we show that a random dd-linear form f(X1,X2,,Xd):(GF(2)k)dGF(2)f(X_1,X_2, \dots, X_d) : \left(GF(2)^{k}\right)^d \rightarrow GF(2) has correlation 2k(1o(1))2^{-k(1-o(1))} with any polynomial of degree at most d/10d/10. This result is proved by giving near-optimal bounds on the bias of random dd-linear form, which is in turn proved by giving near-optimal bounds on the probability that a random rank-tt dd-linear form is identically zero. 2. Tensor-rank vs Bias : We show that if a dd-dimensional tensor has small rank, then the bias of the associated dd-linear form is large. More precisely, given any dd-dimensional tensor T:[k]×[k]d timesGF(2)T :\underbrace{[k]\times \ldots [k]}_{\text{$d$ times}}\to GF(2) of rank at most tt, the bias of the associated dd-linear form fT(X1,,Xd):=(i1,,id)[k]dT(i1,i2,,id)X1,i1X1,i2Xd,idf_T(X_1,\ldots,X_d) := \sum_{(i_1,\dots,i_d) \in [k]^d} T(i_1,i_2,\ldots, i_d) X_{1,i_1}\cdot X_{1,i_2}\cdots X_{d,i_d} is at least (112d1)t\left(1-\frac1{2^{d-1}}\right)^t. The above bias vs tensor-rank connection suggests a natural approach to proving nontrivial tensor-rank lower bounds for d=3d=3. In particular, we use this approach to prove that the finite field multiplication tensor has tensor rank at least 3.52k3.52 k matching the best known lower bound for any explicit tensor in three dimensions over GF(2)GF(2).

Keywords

Cite

@article{arxiv.1804.09124,
  title  = {On Multilinear Forms: Bias, Correlation, and Tensor Rank},
  author = {Abhishek Bhrushundi and Prahladh Harsha and Pooya Hatami and Swastik Kopparty and Mrinal Kumar},
  journal= {arXiv preprint arXiv:1804.09124},
  year   = {2018}
}
R2 v1 2026-06-23T01:34:15.278Z