Pointwise and uniform bounds for functions of the Laplacian on non-compact symmetric spaces
Abstract
Let L be the distinguished Laplacian on the Iwasawa AN group associated with a semisimple Lie group G. Assume F is a Borel function on R+. We give a condition on F such that the kernels of the functions F(L) are uniformly bounded. This condition involves the decay of F only and not its derivatives. By a known correspondence, this implies pointwise estimates for a wide range of functions of the Laplace-Beltrami operator on symmetric spaces. In particular, when G is of real rank one and F(x)= eit x( x), our bounds are sharp.
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