Title :
Boundary integral equations method in boundary problems for unbounded triangular system of elliptical equations
Author :
Litynskyy, Svyatoslav ; Muzychuk, Yuriy ; Muzychuk, Anatoliy
Author_Institution :
Ivan Franko Nat. Univ. of Lviv, Lviv, Ukraine
Abstract :
A two-sided inverse of the differential operator for the unbounded system of elliptic equations on Lipshitz domains was obtained. It was based on a special convolution of sequences. The Dirichlet and Neumann problems for the unbounded systems were reduced to the systems of Fredholm integral equations of either the first kind or the second kind. All equations in integral systems distinguish only by their right hand sides and allow applying the recurrent procedure for the numerical solution.
Keywords :
Fredholm integral equations; boundary integral equations; boundary-value problems; differential equations; elliptic equations; mathematical operators; Dirichlet problem; Fredholm integral equation; Lipshitz domain; Neumann problem; boundary integral equation; boundary problem; differential operator; elliptical equation; integral system; unbounded triangular system; Boundary value problems; Convolution; Differential equations; Gold; Integral equations; Laplace equations; Reflection; Solids;
Conference_Titel :
Direct and Inverse Problems of Electromagnetic and Acoustic Wave Theory, 2009. DIPED 2009. International Seminar/Workshop on
Conference_Location :
Lviv
Print_ISBN :
978-1-4244-4201-0
DOI :
10.1109/DIPED.2009.5306940
