Singular integration with applications to boundary value problems

Kaye, Adelina E.

January 1900

Master of Science / Mathematics / Nathan Albin / Pietro Poggi-Corradini / This report explores singular integration, both real and complex, focusing on the the Cauchy type integral, culminating in the proof of generalized Sokhotski-Plemelj formulae and the applications of such to a Riemann-Hilbert problem.

Boundary Value Problem

Singular Integration

Sokhotski

Plemelj

Riemann-Hilbert

Cauchy type integral

On Spectral Properties of Single Layer Potentials

Zoalroshd, Seyed

28 June 2016

We show that the singular numbers of single layer potentials on smooth curves asymptotically behave like O(1/n). For the curves with singularities, as long as they contain a smooth sub-arc, the resulting single layer potentials are never trace-class. We provide upper bounds for the operator and the Hilbert-Schmidt norms of single layer potentials on smooth and chord-arc curves. Regarding the injectivity of single layer potentials on planar curves, we prove that among single layer potentials on dilations of a given curve, only one yields a non-injective single layer potential. A criterion for injectivity of single layer potentials on ellipses is given. We establish an isoperimetric inequality for Schatten p−norms of logarithmic potentials over quadrilaterals and its analogue for Newtonian potentials on parallelepipeds.

Eigenfunctions

Eigenvalues

Isoperimetric inequality

Plemelj-Sokhotski theorem

Single layer operator

Schatten ideals

Singular numbers.

Mathematics