Linear preservers of rank k projections
Abstract
Let H be a complex Hilbert space and Fs ( H) the real vector space of all self-adjoint finite rank bounded operators on H. We generalize the famous Wigner's theorem by characterizing linear maps on Fs ( H) which preserve the set of all rank k projections. In order to do this, we first characterize linear maps on the real vector space H0, 2k of trace zero (2k) × (2k) hermitian matrices which preserve the subset of unitary matrices in H0, 2k. We also study linear maps from Fs ( H) to Fs ( K) sending projections of rank k to finite rank projections. We prove some properties of such maps, e.g. that they send rank k projections to projections of a fixed rank. We give the complete description of such maps in the case H = 2. We give several examples which show that in the general case the problem to describe all such maps seems to be complicated.
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