The Frobenious distances from projections to an idempotent matrix

Abstract

For each pair of matrices A and B with the same order, let \|A-B\|F denote their Frobenius distance. This paper deals mainly with the Frobenius distances from projections to an idempotent matrix. For every idempotent Q∈ Cn× n, a projection m(Q) called the matched projection can be induced. It is proved that m(Q) is the unique projection whose Frobenius distance away from Q takes the minimum value among all the Frobenius distances from projections to Q, while In-m(Q) is the unique projection whose Frobenius distance away from Q takes the maximum value. Furthermore, it is proved that for every number α between the minimum value and the maximum value, there exists a projection P whose Frobenius distance away from Q takes the value α. Based on the above characterization of the minimum distance, some Frobenius norm upper bounds and lower bounds of \|P-Q\|F are derived under the condition of PQ=Q on a projection P and an idempotent Q.

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