The spectral map for weighted Cauchy matrices is an involution
Abstract
Let N be a natural number. We consider weighted Cauchy matrices of the form \[ Ca,A=\Aj Akak+aj\j,k=1N, \] where A1,…,AN are positive real numbers and a1,…,aN are distinct positive real numbers, listed in increasing order. Let b1,…,bN be the eigenvalues of Ca,A, listed in increasing order. Let Bk be positive real numbers such that Bk is the Euclidean norm of the orthogonal projection of the vector \[ vA=(A1,…,AN) \] onto the k'th eigenspace of Ca,A. We prove that the spectral map (a,A) (b,B) is an involution and discuss simple properties of this map.
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