Weak type (1,1) bounds for Schr\"odinger groups

Abstract

Let L be a non-negative self-adjoint operator acting on L2(X) where X is a space of homogeneous type with a dimension n. Suppose that the heat kernel of L satisfies a Gaussian upper bound. It is known that the operator (I+L)-s eitL is bounded on Lp(X) for s> n|1/ 2-1/p| and p∈ (1, ∞) (see for example, CCO, H, Sj). The index s= n|1/ 2-1/p| was only obtained recently in CDLY, CDLY2, and this range of s is sharp since it is precisely the range known in the case when L is the Laplace operator on X= Rn (Mi1). In this paper we establish that for p=1, the operator (1+L)-n/2eitL is of weak type (1, 1), that is, there is a constant C, independent of t and f so that eqnarray* μ(\x: |(I+L)-n/2 eitL f(x)|>λ \) ≤ Cλ-1(1+|t|)n/2 \|f\|L1(X) , \ \ \ t∈ R eqnarray* (for λ > 0 when μ (X) = ∞ and λ>μ(X)-1\|f\|L1(X) when μ (X) < ∞). Moreover, we also show the index n/2 is sharp when L is the Laplacian on Rn by providing an example. Our results are applicable to Schr\"odinger group for large classes of operators including elliptic operators on compact manifolds, Schr\"odinger operators with non-negative potentials and Laplace operators acting on Lie groups of polynomial growth or irregular non-doubling domains of Euclidean spaces.