In the last decade, convolution operators of matrix functions
have received unusual attention due to their diverse applications.
This monograph presents some new developments in the spectral
theory of these operators. The setting is the Lp spaces of
matrix-valued functions on locally compact groups. The focus is on
the spectra and eigenspaces of convolution operators on these
spaces, defined by matrix-valued measures. Among various spectral
results, the L2-spectrum of such an operator is completely
determined and as an application, the spectrum of a discrete
Laplacian on a homogeneous graph is computed using this result. The
contractivity properties of matrix convolution semigroups are
studied and applications to harmonic functions on Lie groups and
Riemannian symmetric spaces are discussed. An interesting feature
is the presence of Jordan algebraic structures in matrix-harmonic
functions.
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