Lp-asymptotic behaviour of solutions of the heat equation on Riemannian symmetric spaces of noncompact type
Abstract
For Riemannian symmetric spaces X=G/K of noncompact type, we show that for all left K-invariant f∈ L1(X), the functions \|ht\|Lp(X)-1(f ht-Mp(f)ht) (with ht being the heat kernel of X) converges to zero in Lp(X), p∈ [1,∞], as t∞, with the constant Mp(f) depending only on p and f. We also prove an analogous result for the fractional heat kernels htα, α∈ (0,1). The above results have recently been proved for the important special cases p=1 and α= 1, 12.
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