Toward Quantum CSS-T Codes from Sparse Matrices

Abstract

CSS-T codes were recently introduced as quantum error-correcting codes that respect a transversal gate. A CSS-T code depends on a pair (C1, C2) of binary linear codes C1 and C2 that satisfy certain conditions. We prove that C1 and C2 form a CSS-T pair if and only if C2 ⊂ Hull(C1) Hull(C12), where the hull of a code is the intersection of the code with its dual. We show that if (C1,C2) is a CSS-T pair, and the code C2 is degenerated on \i\, meaning that the ith-entry is zero for all the elements in C2, then the pair of punctured codes (C1|i,C2|i) is also a CSS-T pair. Finally, we provide Magma code based on our results and quasi-cyclic codes as a step toward finding quantum LDPC or LDGM CSS-T codes computationally.