[1]曾羽群.一类发展的p(x)-Laplace方程解的存在唯一性[J].集美大学学报(自然科学版),2021,26(2):119-124.
ZENG Yuqun.Existence and Uniqueness of Solutions to an Evolutionary p(x)-Laplace Equation[J].Journal of Jimei University,2021,26(2):119-124.
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一类发展的p(x)-Laplace方程解的存在唯一性(PDF)
ZENG Yuqun.Existence and Uniqueness of Solutions to an Evolutionary p(x)-Laplace Equation[J].Journal of Jimei University,2021,26(2):119-124.
《集美大学学报(自然科学版)》[ISSN:1007-7405/CN:35-1186/N]
- 卷:
- 第26卷
- 期数:
- 2021年第2期
- 页码:
- 119-124
- 栏目:
- 数理科学与信息工程
- 出版日期:
- 2021-03-28
文章信息/Info
- Title:
- Existence and Uniqueness of Solutions to an Evolutionary p(x)-Laplace Equation
- 作者:
- 曾羽群
- (集美大学理学院,福建 厦门 361021)
- Author(s):
- ZENG Yuqun
- (School of Science,Jimei University,Xiamen 361021,China)
- 关键词:
- 发展的p(x)-Laplace方程; 存在唯一性; 稳定性; 部分边界条件; 子流形
- Keywords:
- evolutionary p(x)-Laplace equation; existence and uniqueness; stability; partial boundary value condition; submanifold
- 分类号:
- -
- DOI:
- -
- 文献标志码:
- -
- 摘要:
- 讨论一类发展的p(x)-Laplace方程ut=div(a(x,t)∣△u∣p(x)-2△u)+f(u,x,t)解的存在唯一性。不同于此前的研究,文中假设a(x,t)≥0,且当x∈Ω时,a(x,t)>0,解的稳定性是建立在一个合理的部分边界条件u(x,t)=0,(x,t)∈Σ1上,其中Σ1 Ω(0,T)仅仅是一个子流形。
- Abstract:
- The following evolutionary p(x)-Laplace equations t=div(a(x,t)∣△u∣p(x)-2△u)+f(u,x,t) were discussed,and the existence and the uniqueness of weak solutions were proved.Different from the previous works,it was assumed a(x,t)≥0and a(x,t)x∈Ω>0 in this paper.The stability of weak solutions was based on a reasonable partial boundary value condition u(x,t)=0,(x,t)∈Σ1,where Σ1Ω×(0,T) was just a submanifold.
参考文献/References:
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更新日期/Last Update:
2021-05-17