On the Construction for Quantum Code ((n,K, d))p via Logic Function over Fp

This paper studies the construction for quantum codes with parameters $((n,K,d))_{p}$ by use of an \textit{n}-variable logic function with APC distance $d'\ge 2$ over ${\rm {\mathbb F}}_{p} $, where $d$ is related to $d'$. We obtain $d\le d'$ and the maximal $K$ for all $d=d'-k$, $0\le k\le d'-2$. We also discuss the basic states and the equivalent conditions of saturating quantum Singleton bound.