Boundary integral equations for mixed boundary value problems in polygonal domains and Galerkin approximation
Let be the space of all complex m × n matrices. The generalized unit disc in is >br> . Here is the unit matrix. If 1 ≤ p < ∞ and α > -1, then is defined to be the space , where is the Lebesgue measure in , and is the subspace of holomorphic functions. In [8,9] M. M. Djrbashian and A. H. Karapetyan proved that, if (for 1 < p < ∞) and Re β ≥ α (for p = 1), then where is the integral operator defined by (0.13)-(0.14). In the present paper, given 1 ≤ p <...
In this paper, the boundedness of the Riesz potential generated by generalized shift operator from the spaces to the spaces is examined.