Linear Maps Preserving Idempotency of Products of Matrices on Upper Triangular Matrix Algebras
Abstract
Let $\mathcal{T}_n$ be the algebra of all $n × n$ complex upper triangular matrices. We give the concrete forms of linear injective maps on $\mathcal{T}_n$ which preserve the nonzero idempotency of either products of two matrices or triple Jordan products of two matrices.
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Linear Maps Preserving Idempotency of Products of Matrices on Upper Triangular Matrix Algebras. (2021). Communications in Mathematical Research, 25(3), 253-264. https://gsp.tricubic.dev/cmr/article/view/8619