Boundary behavior of large solutions to elliptic equations with nonlinear gradient terms | |
Mi, Ling ; Liu, Bin | |
2013 | |
关键词 | Nonlinear elliptic equations Nonlinear gradients The asymptotic behavior Boundary blow-up solutions BLOW-UP SOLUTIONS ASYMPTOTIC-BEHAVIOR SINGULAR WEIGHTS RADEMACHER TYPE UNIQUENESS EXISTENCE BIEBERBACH |
英文摘要 | In this paper, we mainly study the asymptotic behavior of solutions to the following problems , where Omega is a bounded domain with a smooth boundary in , q > 0, is positive in Omega, and is nonnegative in Omega and may be vanishing on the boundary. We assume that f is I"-varying at a, whose variation at a is not regular. Our analysis is based on the sub-supersolution method and Karamata regular variation theory.; Mathematics, Applied; SCI(E); EI; 1; ARTICLE; 4; 1283-1304; 64 |
语种 | 英语 |
出处 | SCI ; EI |
出版者 | zeitschrift fur angewandte mathematik und physik |
内容类型 | 其他 |
源URL | [http://hdl.handle.net/20.500.11897/157461] ![]() |
专题 | 数学科学学院 |
推荐引用方式 GB/T 7714 | Mi, Ling,Liu, Bin. Boundary behavior of large solutions to elliptic equations with nonlinear gradient terms. 2013-01-01. |
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