Structure of the Lipschitz free p-spaces Fp(Zd) and Fp(Rd) for 0<p 1

Abstract

Our aim in this article is to contribute to the theory of Lipschitz free p-spaces for 0<p 1 over the Euclidean spaces Rd and Zd. To that end, on one hand we show that Fp(Rd) admits a Schauder basis for every p∈(0,1], thus generalizing the corresponding result for the case p=1 achieved in [P. H\'ajek and E. Perneck\'a, On Schauder bases in Lipschitz-free spaces, J. Math. Anal. Appl. 416 (2014), no. 2, 629--646] and answering in the positive a question that was raised in [F. Albiac, J. L. Ansorena, M. C\'uth, and M. Doucha, Embeddability of lp and bases in Lipschitz free p-spaces for 0 < p 1, J. Funct. Anal. 278 (2020), no. 4, 108354, 33]. Explicit formulas for the bases of both Fp(Rd) and its isomorphic space Fp([0,1]d) are given. On the other hand we show that the well-known fact that F(Z) is isomorphic to 1 does not extend to the case when p<1, that is, Fp(Z) is not isomorphic to p when 0<p<1.