Fock projections on vector-valued $L^p$-spaces with matrix weights (2408.13537v1)

Abstract: In this paper, we characterize the $d\times d$ matrix weights $W$ on $\mathbb{C}^n$ such that the Fock projection $P_{\alpha}$ is bounded on the vector-valued spaces $L^p_{\alpha,W}(\mathbb{C}^n;\mathbb{C}^d)$ induced by $W$. It is proved that for $1\leq p<\infty$, the Fock projection $P_{\alpha}$ is bounded on $L^p_{\alpha,W}(\mathbb{C}^n;\mathbb{C}^d)$ if and only if $W$ satisfies a restricted $\mathbf{A}_p$-condition. In particular, when $p=1$, our result establishes a strong (1,1) type estimate for the Fock projections, which is quite different with the case of Calder\'{o}n--Zygmund operators.