Vertical versus horizontal Sobolev spaces

Abstract

Let α ≥ 0, 1 < p < ∞, and let Hn be the Heisenberg group. Folland in 1975 showed that if f Hn R is a function in the horizontal Sobolev space Sp2α(Hn), then f belongs to the Euclidean Sobolev space Spα(R2n + 1) for any test function . In short, Sp2α(Hn) ⊂ Spα,loc(R2n + 1). We show that the localisation can be omitted if one only cares for Sobolev regularity in the vertical direction: the horizontal Sobolev space S2αp(Hn) is continuously contained in the vertical Sobolev space Vpα(Hn). Our search for the sharper result was motivated by the following two applications. First, combined with a short additional argument, it implies that bounded Lipschitz functions on Hn have a 12-order vertical derivative in BMO(Hn). Second, it yields a fractional order generalisation of the (non-endpoint) vertical versus horizontal Poincar\'e inequalities of V. Lafforgue and A. Naor.