Erik Troedsson, Daniel Falkowski, Carl-Fredrik Lidgren, Herwig Wendt, Marcus Carlsson
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The problem of approximate joint diagonalization of a collection of matrices
arises in a number of diverse engineering and signal processing problems. This
problem is usually cast as an optimization problem, and it is the main goal of
this publication to provide a theoretical study of the corresponding
cost-functional. As our main result, we prove that this functional tends to
infinity in the vicinity of rank-deficient matrices with probability one,
thereby proving that the optimization problem is well posed. Secondly, we
provide unified expressions for its higher-order derivatives in multilinear
form, and explicit expressions for the gradient and the Hessian of the
functional in standard form, thereby opening for new improved numerical schemes
for the solution of the joint diagonalization problem. A special section is
devoted to the important case of self-adjoint matrices.
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