摘要
Interface problems for second order quasi-linear elliptic partial differential equations in a two-dimensional space are studied.We prove that each weak solution can be decomposed into two parts near singular points,one of which is a finite sum of functions of the form cr~α log^m r(?)(θ),where the coefficients c depend on the H^1-norm of the solution,the C^(0,δ)-norm of the solution,and the equation only;and the other one of which is a regular one,the norm of which is also estimated.
Interface problems for second order quasi-linear elliptic partial differential equations in a two-dimensional space are studied.We prove that each weak solution can be decomposed into two parts near singular points,one of which is a finite sum of functions of the form cr~α log^m r(?)(θ),where the coefficients c depend on the H^1-norm of the solution,the C^(0,δ)-norm of the solution,and the equation only;and the other one of which is a regular one,the norm of which is also estimated.
基金
supported by the China State Major Key Project for Basic Researches
the Science Fund of the Ministry of Education of China
