Growth Estimates for Solutions to the Wave Equation on Damek--Ricci Spaces

Abstract

Let L be the left-invariant distinguished Laplacian, and let d denote the right Haar measure on a Damek--Ricci space S. Let u(t,x) denote the solution to the wave equation ∂t2 u-L u=0 with initial data (u,∂t u)|t=0=(f,g). In this paper, we establish the sharp-in-regularity Lp bounds align* \|u(t,·)\|Lp(S ,d) p (1+|t|)2|1p-12|\|(Id+L)α02\!f\|Lp(S ,d)+(1+|t|)\,\|(Id+L)α12\!g\|Lp(S,d) align* for all t∈R* and 1<p<∞, where the exponents α0 = n|1/p-1/2| and α1 = n|1/p-1/2| -1 attain their critical values. This result settles, in full generality, the conjecture raised by M\"uller, Thiele, and Vallarino.

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