Failure of stability of a maximal operator bound for perturbed Nevo-Thangavelu means

Abstract

Let G be a two-step nilpotent Lie group, identified via the exponential map with the Lie-algebra g= g1 g2, where [ g, g]⊂ g2. We consider maximal functions associated to spheres in a d-dimensional linear subspace H, dilated by the automorphic dilations. Lp boundedness results for the case where H= g1 are well understood. Here we consider the case of a tilted hyperplane H≠ g1 which is not invariant under the automorphic dilations. In the case of M\'etivier groups it is known that the Lp-boundedness results are stable under a small linear tilt. We show that this is generally not the case for other two-step groups, and provide new necessary conditions for Lp boundedness. We prove these results in a more general setting with tilted versions of submanifolds of g1.

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