Riesz transform on manifolds with ends of different volume growth for 1<p<2

Abstract

Let M1, ·s, M be complete, connected and non-collapsed manifolds of the same dimension, where 2 ∈N, and suppose that each Mi satisfies a doubling condition and a Gaussian upper bound for the heat kernel. If each manifold Mi has volume growth either bigger than two or equal to two, then we show that the Riesz transform ∇ -1/2 is bounded on Lp(M) for each 1<p<2 on the gluing manifold M=M1\#M2\#·s \# M.

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