On a conjecture of λ-Aluthge transforms and Hilbert--Schmidt self-commutators
Abstract
Let A be a complex square matrix, and write its polar decomposition as A=U|A|. For 0<λ<1, the λ-Aluthge transform of A is defined by λ(A)=|A|λ U|A|1-λ. In 2007, Huang and Tam conjectured that the Frobenius norm of the self-commutator is contractive under λ: for every 0<λ<1, \|A*A-AA*\|F \ \ \|λ(A)*λ(A)-λ(A)λ(A)*\|F. If this inequality held, then the iterated self-commutator norms \\|λ\,m(A)*λ\,m(A) -λ\,m(A)λ\,m(A)*\|F\m∈ N would form a nonincreasing sequence and necessarily converge to 0. In this paper we provide a counterexample, thereby disproving the conjecture. We also obtain the quantitative bounds 32\ \ A∈Mn(C),\ A*A≠ AA*\\ 0<λ<1 \|λ(A)*λ(A)-λ(A)λ(A)*\|F\|A*A-AA*\|F \ \ 2.
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