Sharp Lp-estimates for wave equation on ax+b groups

Abstract

Let G be the group R+ Rn endowed with Riemannian symmetric space metric d and the right Haar measure d which is of ax+b type, and L be the positive definite distinguished left invariant Laplacian on G. Let u=u(t,·) be the solution of utt+Lu=0 with initial conditions u|t=0=f and ut|t=0=g. In this article we show that for a fixed t ∈ R and every 1<p<∞, align* \|u(t,·)\|Lp(G)≤ Cp( (1+|t|)2|1/p-1/2|\|f\|Lpα0(G)+(1+|t|)\,\|g\|Lpα1(G)) align* if and only if align* α0≥ n|1 p- 12| and α1≥ n|1 p- 12| -1. align* This gives an endpoint result for α0=n|1/p-1/2| and α1=n|1/p-1/2|-1 with 1<p<∞ in Corollary 8.2, as pointed out in Remark 8.1 due to M\"uller and Thiele [Studia Math. 179 (2007)].