Weak type $(1,1)$ bounds for Schrödinger groups (1906.05519v1)

Abstract: Let $L$ be a non-negative self-adjoint operator acting on $L^2(X)$ 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 $(I+L)^{-s } e^{itL}$ is bounded on $L^p(X)$ for $s> n|{1/ 2}-{1/p}| $ and $ p\in (1, \infty)$ (see for example, \cite{CCO, H, Sj}). The index $s= n|{1/ 2}-{1/p}|$ was only obtained recently in \cite{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 $\Delta$ on $X=\mathbb R^n$ (\cite{Mi1}). In this paper we establish that for $p=1,$ the operator $(1+L)^{-n/2}e^{itL}$ is of weak type $(1, 1)$, that is, there is a constant $C$, independent of $t$ and $f$ so that \begin{eqnarray*} \mu\Big(\Big{x: \big|(I+L)^{-n/2 }e^{itL} f(x)\big|>\lambda \Big}\Big) \leq C\lambda^{-1}(1+|t|)^{n/2} {|f|{L^1(X)} }, \ \ \ t\in{\mathbb R} \end{eqnarray*} (for $\lambda > 0$ when $\mu (X) = \infty$ and $\lambda>\mu(X)^{-1}|f|{L^1(X)}$ when $\mu (X) < \infty$). Moreover, we also show the index $n/2$ is sharp when $L$ is the Laplacian on ${\mathbb R^n}$ 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.