Degenerate quantum codes and the quantum Hamming bound

Abstract

The parameters of a nondegenerate quantum code must obey the Hamming bound. An important open problem in quantum coding theory is whether or not the parameters of a degenerate quantum code can violate this bound for nondegenerate quantum codes. In this paper we show that Calderbank-Shor-Steane (CSS) codes with alphabet q≥ 5 cannot beat the quantum Hamming bound. We prove a quantum version of the Griesmer bound for the CSS codes which allows us to strengthen the Rains' bound that an [[n,k,d]]2 code cannot correct more than (n+1)/6 errors to (n-k+1)/6. Additionally, we also show that the general quantum codes [[n,k,d]]q with k+d≤ (1-2eq-2)n cannot beat the quantum Hamming bound.