Orlicz Space on Groupoids

Abstract

Let G be a locally compact second countable groupoid with a fixed Haar system λ=\λu\u∈ G0 and (,) be a complementary pair of N-functions satisfying 2-condition. In this article, we introduce the continuous field of Orlicz space (L0,1) and provide a sufficient condition for the space of continuous sections vanishing at infinity, denoted E0, to be an Banach algebra under a suitable convolution. Further, the condition for a closed Cb(G0)-submodule I of E0 to be a left ideal is established. Moreover, we provide a groupoid analogue of the characterization of the space of convolutors of Morse-Transue space for locally compact groups.