Localized Boundary-Domain Singular Integral Equations Based on Harmonic Parametrix for Divergence-Form Elliptic PDEs with Variable Matrix Coefficients

被引:0
作者
O. Chkadua
S. E. Mikhailov
D. Natroshvili
机构
[1] I.Javakhishvili Tbilisi State University,A.Razmadze Mathematical Institute
[2] Sokhumi State University,Department of Mathematics
[3] Brunel University London,Department of Mathematics
[4] Georgian Technical University,I. Vekua Institute of Applied Mathematics
[5] Tbilisi State University,undefined
来源
Integral Equations and Operator Theory | 2013年 / 76卷
关键词
35J25; 31B10; 45K05; 45A05; Partial differential equations; variable coefficients; boundary value problems; localized parametrix; localized potentials; localized boundary-domain integral equations; pseudo-differential equations;
D O I
暂无
中图分类号
学科分类号
摘要
Employing the localized integral potentials associated with the Laplace operator, the Dirichlet, Neumann and Robin boundary value problems (BVPs) for general variable-coefficient divergence-form second-order elliptic partial differential equations are reduced to some systems of localized boundary-domain singular integral equations. Equivalence of the integral equations systems to the original BVPs is proved. It is established that the corresponding localized boundary-domain integral operators belong to the Boutet de Monvel algebra of pseudo-differential operators. Applying the Vishik–Eskin theory based on the factorization method, the Fredholm properties and invertibility of the operators are proved in appropriate Sobolev spaces.
引用
收藏
页码:509 / 547
页数:38
相关论文
共 36 条
  • [11] Chkadua O.(2005)Localized direct boundary-domain integro-differential formulations for scalar nonlinear boundary-value problems with variable coefficients J. Eng. Math. 51 283-302
  • [12] Mikhailov S.(2006)Analysis of united boundary-domain integro-differential and integral equations for a mixed BVP with variable coefficient Math. Methods Appl. Sci. 29 715-739
  • [13] Natroshvili D.(2011)Traces, extensions and co-normal derivatives for elliptic systems on Lipschitz domains J. Math. Anal. Appl. 378 324-342
  • [14] Chkadua O.(2005)Mesh-based numerical implementation of the localized boundary-domain integral equation method to a variable-coefficient Neumann problem J. Eng. Math. 51 251-259
  • [15] Mikhailov S.E.(1994)An Mem. Differ. Equ. Math. Phys. 2 41-146
  • [16] Natroshvili D.(2000) -analogue of the Vishik–Eskin theory Comput. Mech. 24 456-462
  • [17] Chkadua O.(1998)Local boundary integral equation (LBIE) method for solving problems of elasticity with nonhomogeneous material properties Comput. Mech. 21 223-235
  • [18] Mikhailov S.E.(1999)A local boundary integral equation (LBIE) method in computational mechanics, and a meshless discretization approach Eng. Anal. Bound. Elem. 23 375-389
  • [19] Natroshvili D.(undefined)A meshless numerical method based on the local boundary integral equation (LBIE) to solve linear and non-linear boundary value problems undefined undefined undefined-undefined
  • [20] Costabel M.(undefined)undefined undefined undefined undefined-undefined
1234