On Banach envelopes and duals of Lipschitz-free p-spaces for 0<p<1

Abstract

With the aim to better understand the intricate geometry of the class of Lipschitz free p-spaces Fp(M) when 0<p<1, in this note we study their Banach envelopes and prove that if 0<p<1 and M is a metric space then the Banach envelope map of Fp(M) is one-to-one, thus solving in the positive a problem raised by Kalton in [F. Albiac and N. J. Kalton, Lipschitz structure of quasi-Banach spaces, Israel J. Math. 170 (2009), 317-335]. This property has important applications to the linear structure of this family of spaces, being the most immediate one that the dual space of Fp(M) separates the points of Fp(M).