Generalizing Lee's conjecture on the sum of absolute values of matrices
Abstract
Let \|\!·\!\|p denote the Schatten p-norm of matrices and \|\!·\!\|F the Frobenius norm. For a square matrix X, let |X| denote its absolute value. In 2010, Eun-Young Lee posed the problem of determining the smallest constant cp such that \|A+B\|p cp\|\,|A|+|B|\,\|p for all complex matrices A,B. The Frobenius case (p=2) conjectured by Lee was proved by Lin and Zhang (2022)~LinZhang2022 and re-proved by Zhang (2025)~Zhang2025. In this paper, we extend Lee's conjecture from two matrices to an arbitrary number m 2 of complex matrices A1,…,Am, and determine the sharp inequality \|Σk=1m Ak\|F 1+m2\; \|Σk=1m|Ak|\|F , with equality attained by an equiangular rank-one family. We further generalize Lee's problem by seeking the smallest constant cp(m) such that \|Σk=1m Ak\|p cp(m)\, \|Σk=1m|Ak|\|p . It is shown that cp(m) (m)1-1/p, and we conjecture a closed-form expression for the optimal value of cp(m) that recovers all known cases p=1,2,∞.
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