Weighted estimates of the Bergman projection with matrix weights

Abstract

We establish a weighted inequality for the Bergman projection with matrix weights for a class of pseudoconvex domains. We extend a result of Aleman-Constantin and obtain the following estimate for the weighted norm of P: \[\|P\|L2(,W)≤ C( B2(W))2.\] Here B2(W) is the Bekoll\'e-Bonami constant for the matrix weight W and C is a constant that is independent of the weight W but depends upon the dimension and the domain.