On approximate and actual reducibility of matrix groups
Abstract
We introduce the notions of -approximate fixed point and weak -approximate fixed point. We show that for a group of unitary matrices even the existence of a nontrivial weak -approximate fixed point for sufficiently small gives an actual nontrivial common eigenvector. We give estimates for in terms of the size n of matrices and prove that the dependence is polynomial. Moreover, we show that the common eigenvector is polynomially close to the starting weak approximate fixed point.
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