Serving Every Symbol: All-Symbol PIR and Batch Codes

Abstract

A t-all-symbol PIR code and a t-all-symbol batch code of dimension k consist of n servers storing linear combinations of k information symbols with the following recovery property: any symbol stored by a server can be recovered from t pairwise disjoint subsets of servers. In the batch setting, we further require that any multiset of size t of stored symbols can be recovered from~t disjoint subsets of servers. This framework unifies and extends several well-known code families, including one-step majority-logic decodable codes, (functional) PIR codes, and (functional) batch codes. In this paper, we determine the minimum code length for some small values of k and t, characterize structural properties of codes attaining this optimum, and derive bounds that show the trade-offs between length, dimension, minimum distance, and t. In addition, we study MDS codes and the simplex code, demonstrating how these classical families fit within our framework, and establish new cases of an open conjecture from YAAKOBI2020 concerning the minimal t for which the simplex code is a t-functional batch code.