Further refinements of the Cauchy-Schwarz inequality for matrices
Abstract
Let A, B and X be n× n matrices such that A, B are positive semidefinite. We present some refinements of the matrix Cauchy-Schwarz inequality by using some integration techniques and various refinements of the Hermite--Hadamard inequality. In particular, we establish the inequality align* |||\,|A12XB12|r|||2&≤|||\,|AtXB1-s|r||| \,\,\,|||\,|A1-tXBs|r|||\\& ≤ \|||\,|AX|r||| \,\,\,|||\,|XB|r|||,|||\,|AXB|r||| \,\,\,|||\,|X|r|||\, align* where s,t∈[0,1] and r≥0.
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