On Boundary Properties of Solutions of Complex Vector Fields

## Sprbljig A new approach to the boundary value problem for the classic Dirac equation is proposed. This approach is based on a recent version of the metaharmonic quaternionic analysis developed in [14-161. In particular, the following problem is studied: when and how a given function on a surfac

In this paper we show that the vector field X {, h on a based path space W o (M) over a Riemannian manifold M defined by parallel translating a curve h in the initial tangent space T o M via an affine connection { induces a solution flow which preserves the Wiener measure on the based path space W o

## Abstract In the present paper we consider domains in ℝ^3^ with fractal boundaries. Our main purpose is to study the boundary values of Laplacian vector fields, paying special attention to the problem of decomposing a Hölder continuous vector field on the boundary of a domain as a sum of two Höld

A finite-difference time-space numerical algorithm for the analysis of transient electromagnetic fields is proposed based on the expression of the field vectors in terms of vector potential functions. The method allows for both integral and finite-difference ( ) calculation of the potential function