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In this paper, we investigate Dirichlet spaces ${{D}_{\mu }}$ with superharmonic weights induced by positive Borel measures $\mu $
on the open unit disk. We establish the Alexander-Taylor-Ullman inequality for ${{D}_{\mu }}$
spaces and we characterize the cases where equality occurs. We define a class of weighted Hardy spaces $H_{\mu }^{2}$ via the balayage of the measure $\mu $
. We show that ${{D}_{\mu }}$
is equal to $H_{\mu }^{2}$
if and only if $\mu $
is a Carleson measure for ${{D}_{\mu }}$
. As an application, we obtain the reproducing kernel of ${{D}_{\mu }}$
when $\mu $ is an infinite sum of point-mass measures. We consider the boundary behavior and innerouter factorization of functions in ${{D}_{\mu }}$. We also characterize the boundedness and compactness of composition operators on ${{D}_{\mu }}$.
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