The sharp square function estimate with matrix weight, Discrete Analysis 2019:2, 8 pp.
A central theme in harmonic analysis is to determine whether naturally occurring operators are bounded with respect to naturally occurring norms. One class of norms that is of particular importance is that of weighted L2-norms, that is, norms of the form
‖
where w is a non-negative function. A condition on w that is necessary and sufficient for several important linear operators to be bounded is that it should be what is known as an A_2 weight. Writing \langle w\rangle_I for the average of w over an interval I, we say that w is an A_2 weight if the supremum of \langle w\rangle_I\langle w^{-1}\rangle_I is finite, where I ranges over all intervals. In recent years, there has been a flurry of activity aimed at a precise understanding of the dependence of the norms of these linear operators on the A_2 characteristic, which has led to several sharp results.
This paper is about generalizing such results to the case of matrix weights. Here one takes a matrix-valued function W that is positive semidefinite everywhere, and if f is a vector-valued function, then
\|f\|_{A_2(W)}=\Bigl(\int_{\mathbb C^d}\langle W(x)f(x),f(x)\rangle\Bigr)^{1/2}.
The matrix analogue of the scalar weight is not quite obvious: it is the supremum over all intervals I of the quantity \|\langle W\rangle_I^{1/2}\langle W^{-1}\rangle_I^{1/2}\|^2.
The main result concerns a nonlinear operator S_W, which is a matrix analogue of a type of operator known as a square function. It proves that the norm of S_W is bounded above by a constant times the matrix A_2 characteristic of W. Since a matching lower bound is known, this is a sharp result, and it is the first sharp result in the matrix case. In fact, as the authors also prove, an even better result is possible if one allows the bound to depend not just on [W]_{A_2} but also on a quantity [W]_{A_\infty}.