Sharp endpoint estimates for Schrödinger groups on Hardy spaces

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 the Davies-Gaffney estimates of order $m\geq 2$. Let $H^1_L(X)$ be the Hardy space associated with $L.$ In this paper we show sharp endpoint estimate for the Schr\"odinger group $e^{itL}$ associated with $L$ such that \begin{eqnarray*} \left| (I+L)^{-{n/2}}e^{itL} f\right|{ L^1(X)} + \left| (I+L)^{-{n/2}}e^{itL} f\right|{ H^1_L(X)} \leq C(1+|t|)^{n/2}|f|_{H^1_L(X)}, \ \ \ t\in{\mathbb R} \end{eqnarray*} for some constant $C=C(n, m)>0$ independent of $t$. By a duality and interpolation argument, it gives a new proof of a recent result of \cite{CDLY} for { sharp} endpoint $L^p$-Sobolev bound for $e^{itL}$: $$ \left| (I+L)^{-s }e^{itL} f\right|{ L^p(X)} \leq C (1+|t|)^{s} |f|{ L^p(X)}, \ \ \ t\in{\mathbb R}, \ \ \ s\geq n\big|{1\over 2}-{1\over p}\big| $$ for every $1<p<\infty$ when the heat kernel of $L$ satisfies a Gaussian upper bound, which extends the classical results due to Miyachi ) for the Laplacian on the Euclidean space ${\mathbb R}^n$.