Numerical solution of acoustic problems by integral equations

In this paper we discuss a fundamental problem in the numerical solution of boundary integral equations. In practice the only function space in which computations are performed is the space of square integrable functions whereas a consistent mathematical formulation of real physical problems based o

Ahatraet-The plane elastic problem for a curved crack problem is studied by means of the hypersingular integral equation approach. Based on the solution of a doublet of dislocation, the hypersingular integral equation for the curved crack problem is formulated. The unknown function invalved is the c

In this paper a procedure to solve the identiÿcation inverse problems for two-dimensional potential ÿelds is presented. The procedure relies on a boundary integral equation (BIE) for the variations of the potential, ux, and geometry. This equation is a linearization of the regular BIE for small chan

A one-dimensiorzt drift-diffasion mechai-fi~,,m combined with special boundary conditions is investigated. Thi~ mechanism may be used to de~:ribe the b\_'haviour of mobile ions with surface trapping. The problem is solved numerically wi.th an inte-gr~differential equation and with a double integral