用加法和乘法杨不等式求解正定矩阵的行列式不等式

Revista Integración Pub Date : 2022-12-09 DOI:10.18273/revint.v40n2-2022004

S. Dragomir

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引用次数: 0

摘要

在本文中,我们证明等,如果正定矩阵A, B (0 < n满足条件最小值≤B−≤米,对于一些常量0 < M < M,在单位矩阵,然后0≤(1−t)[侦破(A)]−1 + t[侦破(A +分钟)]−1−[侦破(A + mtIn)]−1≤(1−t)[侦破(A)]−1 + t[侦破(B)]−1−[检波器((1−t) +结核病)]−1≤(1−t)[侦破(A)]−1 + t[侦破(A + M)] 1−−−(侦破(锡+ M)) 1,所有t∈[0,1]

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Determinant Inequalities for Positive Definite Matrices Via Additive and Multiplicative Young Inequalities

In this paper we prove among others that, if the positive definite matrices A, B of order n satisfy the condition 0 < mIn ≤ B − A ≤ M In, for some constants 0 < m < M, where In is the identity matrix, then 0 ≤ (1 − t) [det (A)]−1 + t [det (A + mIn)]−1 − [det (A + mtIn)]−1 ≤ (1 − t) [det (A)]−1 + t [det (B)]−1 − [det ((1 − t) A + tB)]−1 ≤ (1 − t) [det (A)]−1 + t [det (A + M In)]−1 − [det (A + M tIn)]−1 , for all t ∈ [0, 1]

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Revista Integración

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