The inversion formulas for singular integrals on Riemann surfaces (Q1333677)

Let \(R\) be a Riemann surface of genus \(h\), \(0 \leq h\leq \infty\), \(\Gamma \subset \mathbb{R}\) be a contour. We consider the singular integral operator \[ (Sf)(t) = {1 \over \pi} \int_\Gamma k_1 (p,t) \text{Im} f(p) - k_2 (p,t) \text{Re} f(p),\;t \in \Gamma, \] where \(k_1, k_2\) constitute an analogue of the Cauchy kernel. In this paper inversion formulas for the operator \(S\) in the spaces \(L_p (\Gamma)\), \((1 < p < \infty)\), \(H^\mu (\Gamma)\), \((0 < \mu < 1)\) are given.