Valeur propre minimale d'une matrice de Toeplitz et d'un produit de matrices de Toeplitz

Abstract

This paper is essentially devoted to the study of the minimal eigenvalue λN,α of the Toepllitz matrice TN(α) where α(ei θ)=|1- ei θ |2α c1(ei θ) with c1 a positive sufficiently smooth function and 0<α<12. We obtain λN,α cαN-2αc1(1) when N goes to the infinity and we have the bounds of cα. To obtain the asymptotic of λN,α we give a theorem which suggests that the entries of TN-1(α) and TN (-1α) are closely related. If α1 + α2 > 12 we obtain the asymptotic of the minimal eigenvalue of TN (α1) TN (α2).