INÉGALITÉS DE TRACE POUR DES MATRICES DE TŒPLITZ ETAPPLICATIONS À DES VRAISEMBLANCES GAUSSIENNES
Malek Bouaziz
Abstract: Let be an integrable function on the 1-dimensional torus and be the
Tœplitz matrix with entries where is the Fourier transform
of In this paper, it is shown that if are in the Banach algebra of those that
satisfy where is the -norm of and
then
where the norm on the left is the trace class norm. Using the inequality
(tr for trace), it is shown that if boundedness is replaced by continuity, then
tr is convergent These results are used to
study Whittle’s approximation error for log-likelihoods of stationary Gaussian sequences. It
is shown that its moments are bounded or convergent under suitable conditions for spectral
densities.