Building Capacity-Achieving PIR Schemes with Optimal Sub-Packetization over Small Fields (1801.02324v2)

Abstract: Suppose a database containing $M$ records is replicated across $N$ servers, and a user wants to privately retrieve one record by accessing the servers such that identity of the retrieved record is secret against any up to $T$ servers. A scheme designed for this purpose is called a $T$-private information retrieval ($T$-PIR) scheme. Three indexes are concerned for PIR schemes: (1)rate, indicating the amount of retrieved information per unit of downloaded data. The highest achievable rate is characterized by the capacity; (2) sub-packetization, reflexing the implementation complexity for linear schemes; (3) field size. We consider linear schemes over a finite field. In this paper, a general $T$-PIR scheme simultaneously attaining the optimality of almost all of the three indexes is presented. Specifically, we design a linear capacity-achieving $T$-PIR scheme with sub-packetization $!dn^{M-1}!$ over a finite field $\mathbb{F}_q$, $q\geq N$. The sub-packetization $!dn^{M-1}!$, where $!d!=!{\rm gcd}(N,T)!$ and $!n!=!N/d$, has been proved to be optimal in our previous work. The field size of all existing capacity-achieving $T$-PIR schemes must be larger than $Nt^{M-2}$ where $t=T/d$, while our scheme reduces the field size by an exponential factor.