A Test Matrix for an Inverse Eigenvalue Problem
Abstract
We present a real symmetric tri-diagonal matrix of order n whose eigenvalues are \2k \k=0n-1 which also satisfies the additional condition that its leading principle submatrix has a uniformly interlaced spectrum, \2l + 1 \l=0n-2. The matrix entries are explicit functions of the size n, and so the matrix can be used as a test matrix for eigenproblems, both forward and inverse. An explicit solution of a spring-mass inverse problem incorporating the test matrix is provided.
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