Comparative monotonicity of linear codes by Hermitian and symplectic hull dimensions

Abstract

Extending recent work on the Euclidean hull, we derive closed-form ratio decompositions for the number of linear codes with prescribed Hermitian and symplectic hull dimension. The Hermitian ratio admits a uniform lower bound of at least 2/3, while the symplectic ratio decays to 1/q2 asymptotically; a comparative analysis traces this qualitative difference to the Witt classification of the corresponding classical groups. The results translate directly into monotonicity statements for the number of entanglement-assisted quantum codes obtainable from Hermitian-hull-graded [n, k]q2 and symplectic-hull-graded [2n, k]q classical codes via the Guenda-Jitman-Gulliver and Wilde-Brun constructions, respectively.