Heron-Wasserstein majorization inequalities for spectral and Kubo-Ando geometric means
Abstract: We prove sharp Heron-type majorization inequalities for two quadratic matrix expressions associated with the spectral and Kubo-Ando geometric means. For the spectral geometric mean cross term, we show that [ λ\bigl(a2A+b2B+c(A\natural B)\bigr) \prec_w λ\bigl(W_{a,b}(A,B)\bigr), \qquad 0\le c\le 2ab, ] where $W_{a,b}(A,B)$ is the weighted Bures-Wasserstein expression. The coefficient $2ab$ is sharp, and at this endpoint the weak majorization becomes majorization. For the Kubo-Ando geometric mean, we prove the direct comparison [ λ\bigl(a2A+b2B+2ab(A#B)\bigr) \prec_w λ\bigl(W_{a,b}(A,B)\bigr). ] This settles, in the two-variable setting, Bhatia's question of whether the Heron-type norm inequality of Bhatia-Lim-Yamazaki admits a weak-majorization refinement. More precisely, we prove [ λ\bigl(a2A+b2B+2ab(A#B)\bigr) \prec_w λ\bigl((aA{1/2}+bB{1/2})2\bigr), ] and consequently obtain the corresponding inequality for all unitarily invariant norms.
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