English

On the Capacity of Secure Distributed Batch Matrix Multiplication

Information Theory 2021-06-23 v2 math.IT

Abstract

The problem of secure distributed batch matrix multiplication (SDBMM) studies the communication efficiency of retrieving a sequence of desired matrix products AB{\bf AB} == (A1B1,({\bf A}_1{\bf B}_1, A2B2,{\bf A}_2{\bf B}_2, ,\cdots, ASBS){\bf A}_S{\bf B}_S) from NN distributed servers where the constituent matrices A=(A1,A2,,AS){\bf A}=({\bf A}_1, {\bf A}_2, \cdots, {\bf A}_S) and B=(B1,B2,,BS){\bf B}=({\bf B}_1, {\bf B}_2,\cdots,{\bf B}_S) are stored in XX-secure coded form, i.e., any group of up to XX colluding servers learn nothing about A,B{\bf A, B}. It is assumed that AsFqL×K,BsFqK×M,s{1,2,,S}{\bf A}_s\in\mathbb{F}_q^{L\times K}, {\bf B}_s\in\mathbb{F}_q^{K\times M}, s\in\{1,2,\cdots, S\} are uniformly and independently distributed and Fq\mathbb{F}_q is a large finite field. The rate of an SDBMM scheme is defined as the ratio of the number of bits of desired information that is retrieved, to the total number of bits downloaded on average. The supremum of achievable rates is called the capacity of SDBMM. In this work we explore the capacity of SDBMM, as well as several of its variants, e.g., where the user may already have either A{\bf A} or B{\bf B} available as side-information, and/or where the security constraint for either A{\bf A} or B{\bf B} may be relaxed. We obtain converse bounds, as well as achievable schemes for various cases of SDBMM, depending on the L,K,M,N,XL, K, M, N, X parameters, and identify parameter regimes where these bounds match. A remarkable aspect of our upper bounds is a connection between SDBMM and a form of private information retrieval (PIR) problem, known as multi-message XX-secure TT-private information retrieval (MM-XSTPIR). Notable features of our achievable schemes include the use of cross-subspace alignment and a transformation argument that converts a scalar multiplication problem into a scalar addition problem, allowing a surprisingly efficient solution.

Keywords

Cite

@article{arxiv.1908.06957,
  title  = {On the Capacity of Secure Distributed Batch Matrix Multiplication},
  author = {Zhuqing Jia and Syed A. Jafar},
  journal= {arXiv preprint arXiv:1908.06957},
  year   = {2021}
}

Comments

The updated version is the revision for IEEE IT Transactions

R2 v1 2026-06-23T10:51:20.598Z