Abstract
We consider Dirichlet spaces with superharmonic weights. This class contains both the harmonic weights and the power weights. Our main result is a characterization of the Dirichlet spaces with superharmonic weights that can be identified as de Branges–Rovnyak spaces. As an application, we obtain the dilation inequality $$\begin{aligned} \mathcal{D}_\omega (f_r)\le \frac{2r}{1+r}\mathcal{D}_\omega (f) \qquad (0\le r<1), \end{aligned}$$ where \(\mathcal{D}_\omega \) denotes the Dirichlet integral with superharmonic weight \(\omega \), and \(f_r(z):=f(rz)\) is the r-dilation of the holomorphic function f.
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