Gohberg-Krupnik Localisation for Discrete Wiener-Hopf Operators on Orlicz Sequence Spaces

Abstract

Let be an N-function whose Matuszewska-Orlicz indices satisfy 1<αβ<∞. Using these indices, we introduce ``interpolation friendly" classes of Fourier multipliers M[] and M such that M[]⊂ M⊂ M, where M is the Banach algebra of all Fourier multipliers on the reflexive Orlicz sequence space (Z). Applying the Gohberg-Krupnik localisation in the corresponding Calkin algebra, the study of Fredholmness of the discrete Wiener-Hopf operator T(a) with a∈ M is reduced to that of T(aτ) for certain, potentially easier to study, local representatives aτ∈ M[] of a at all points τ∈[-π,π).