-flows Az of linear maps A expressed in terms of A-1,A-2,...,A-n and analytic functions of z
Abstract
Suppose A∈ GLn() has a relation Ap=cp-1Ap-1+.... + c1 A+ c0I where the ci in . This article describes how to construct analytic functions ci(z) such that Az=cp-1(z)Ap-1+... + c1(z) A+ c0(z)I . One of the theorems gives a possible description of the ci(z): ci(z)=Czα where C∈ Matp() is (similar to) the companion matrix of Xp-cp-1Xp-1-... -c1X-c0I, and α:= (cp-1,...,c1,c0)t.
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