In this paper the author presents a method for the numerical solution of a 2-D Cauchy principal value of the formwhere S is a domain with a continuous boundary.
A peak norm is defined for Lp spaces of E-valued Bochner integrable functions, where E is a Banach space, and best approximations from a sun to elements of the
Soft Computing denotes a set of paradigma related to cognitive modelling, which in the lastyears have been intensively studied, since important synergy effects
A frame is a fmaily {f<sub>i</sub>}<sub>i=1</sub><sup>∞</sup> of elements in a Hilbert space with the property that everyelement in can be written as a (infini
Let M f be the Kakeya maximal function in d-dimensional Euclidean space, with same base consisting of cylinders of eccentricity N. The inequality shoum for a ba