{"title":"关于椭圆型问题正解的先验界的存在性","authors":"R. Pardo","doi":"10.18273/REVINT.V37N1-2019005","DOIUrl":null,"url":null,"abstract":"espanolContinuamos estudiando la existencia de cotas uniformes a priori para soluciones positivas de equaciones elipticas subcriticas (P)p − \\Delta_pu = f(u), en \\Omega, u = 0, sobre ∂\\Omega, Proporcionamos condiciones suficientes para que las soluciones positivas en C1,μ (\\overline{\\Omega }) de una clase de problemas elipticos subcriticos tengan cotas a-priori L∞ en dominios acotados, convexos, y de clase C2. En esta parte II, extendemos nuestros resultados a sistemas elipticos Hamiltonianos −\\Delta u = f(v), −\\Delta v = g(u), en \\Omega , u = v = 0 sobre ∂ \\Omega, cuando f(v) = vp/[ln(e + v)]α, g(u) = uq/[ln(e + u)]β, con α, β > 2/(N − 2), y p, q varian sobre la hiperbola critica de Sobolev 1/p+1 + 1/q+1 = N−2/N . Para ecuaciones elipticas cuasilineales que involucran al operador p-Laplacian, existen cotas a-priori para soluciones positivas de (P)p en el espacio C1,μ(\\overline {\\Omega }), μ ∈ (0, 1), cuando f(u) = up⋆−1/[ln(e + u)]α, con p∗ = Np/(N − p), y α > p/(N − p). Tambien estudiamos el comportamiento asintotico de soluciones radialmente simetric uα = uα(r) de (P)2 cuando α → 0. EnglishWe continue studying the existence of uniform L∞ a priori bounds for positive solutions of subcritical elliptic equations(P)p − \\Delta_pu = f(u), in \\Omega, u = 0, on ∂\\Omega,We provide sufficient conditions for having a-priori L∞ bounds for C1,μ (\\overline{\\Omega }) positive solutions to a class of subcritical elliptic problems in bounded, convex, C2 domains. In this part II, we extend our results to Hamiltonian elliptic systems −\\Delta u = f(v),−\\Deltav = g(u), in \\Omega, u = v = 0 on ∂\\Omega, when f(v) = vp /[ln(e + v)]α, g(u) = uq/[ln(e + u)]β, with α, β > 2/(N − 2), and p, q are lying in the critical Sobolev hyperbolae 1/p+1 + 1/q+1 = N−2/N . For quasilinear elliptic equations involving the p-Laplacian, there exists a-priori bounds for positive solutions of (P)p when f(u) = up⋆−1/[ln(e + u)]α, with p∗ = Np/(N−p), and α > p/(N−p). We also study the asymptotic behavior of radially symmetric solutions uα = uα(r) of (P)2 as α → 0.","PeriodicalId":402331,"journal":{"name":"Revista Integración","volume":"130 1","pages":"0"},"PeriodicalIF":0.0000,"publicationDate":"2019-04-12","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"9","resultStr":"{\"title\":\"On the existence of a priori bounds for positive solutions of elliptic problems, I\",\"authors\":\"R. Pardo\",\"doi\":\"10.18273/REVINT.V37N1-2019005\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"espanolContinuamos estudiando la existencia de cotas uniformes a priori para soluciones positivas de equaciones elipticas subcriticas (P)p − \\\\Delta_pu = f(u), en \\\\Omega, u = 0, sobre ∂\\\\Omega, Proporcionamos condiciones suficientes para que las soluciones positivas en C1,μ (\\\\overline{\\\\Omega }) de una clase de problemas elipticos subcriticos tengan cotas a-priori L∞ en dominios acotados, convexos, y de clase C2. En esta parte II, extendemos nuestros resultados a sistemas elipticos Hamiltonianos −\\\\Delta u = f(v), −\\\\Delta v = g(u), en \\\\Omega , u = v = 0 sobre ∂ \\\\Omega, cuando f(v) = vp/[ln(e + v)]α, g(u) = uq/[ln(e + u)]β, con α, β > 2/(N − 2), y p, q varian sobre la hiperbola critica de Sobolev 1/p+1 + 1/q+1 = N−2/N . Para ecuaciones elipticas cuasilineales que involucran al operador p-Laplacian, existen cotas a-priori para soluciones positivas de (P)p en el espacio C1,μ(\\\\overline {\\\\Omega }), μ ∈ (0, 1), cuando f(u) = up⋆−1/[ln(e + u)]α, con p∗ = Np/(N − p), y α > p/(N − p). Tambien estudiamos el comportamiento asintotico de soluciones radialmente simetric uα = uα(r) de (P)2 cuando α → 0. EnglishWe continue studying the existence of uniform L∞ a priori bounds for positive solutions of subcritical elliptic equations(P)p − \\\\Delta_pu = f(u), in \\\\Omega, u = 0, on ∂\\\\Omega,We provide sufficient conditions for having a-priori L∞ bounds for C1,μ (\\\\overline{\\\\Omega }) positive solutions to a class of subcritical elliptic problems in bounded, convex, C2 domains. In this part II, we extend our results to Hamiltonian elliptic systems −\\\\Delta u = f(v),−\\\\Deltav = g(u), in \\\\Omega, u = v = 0 on ∂\\\\Omega, when f(v) = vp /[ln(e + v)]α, g(u) = uq/[ln(e + u)]β, with α, β > 2/(N − 2), and p, q are lying in the critical Sobolev hyperbolae 1/p+1 + 1/q+1 = N−2/N . For quasilinear elliptic equations involving the p-Laplacian, there exists a-priori bounds for positive solutions of (P)p when f(u) = up⋆−1/[ln(e + u)]α, with p∗ = Np/(N−p), and α > p/(N−p). We also study the asymptotic behavior of radially symmetric solutions uα = uα(r) of (P)2 as α → 0.\",\"PeriodicalId\":402331,\"journal\":{\"name\":\"Revista Integración\",\"volume\":\"130 1\",\"pages\":\"0\"},\"PeriodicalIF\":0.0000,\"publicationDate\":\"2019-04-12\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"9\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"Revista Integración\",\"FirstCategoryId\":\"1085\",\"ListUrlMain\":\"https://doi.org/10.18273/REVINT.V37N1-2019005\",\"RegionNum\":0,\"RegionCategory\":null,\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"\",\"JCRName\":\"\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"Revista Integración","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.18273/REVINT.V37N1-2019005","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
引用次数: 9
摘要
espanolContinuamos探索解决方案的台阶制服事先存在积极的equaciones elipticas subcriticas (P) P−\ Delta_pu = f (u),ω,u = 0,关于∂\ω足够提供条件,积极解决C1,μ(overline{\欧米茄})类问题elipticos subcriticos有台阶a-priori升∞有限域、、类和C2。在第二部分中,扩展我们的发现系统elipticos Hamiltonianos−\ Delta u = f (v),−\ Delta v = g (u)、\ω,u ' = v = 0∂\ω,当f (v) = vp /[还好吗(e + v)]α,g (u) = uq /[这里吗(e + u)]β、α,β> 2 / (N−2),而p, q varian hiperbola批评Sobolev 1 / p / q + 1 + 1 + 1 = N−2 / N。为方程式elipticas cuasilineales涉及接线员p-Laplacian积极的解决方案,有台阶a-priori C1,μ空间(P) P (overline{\欧米茄})、μ∈(0,1),当f (u) = up⋆−1 /[这里吗(e + u)]α,P .∗= Np / (N−(P)和α> P / (N−P)亦被检查行为asintotico解决径向非simetric或α= uα(r) (P) 2当α→0。EnglishWe继续学习制品和事先对L∞bounds for积极solutions of亚临界elliptic equations (P) P−Delta_pu = f (u), in \ω,u = 0,∂\ω上,我们提供sufficient conditions for L已经a-priori∞bounds for C1,μ(overline{\ω})积极solutions to class of亚临界elliptic problems in bounded convex、C2域名。In this part II,我们扩展我们的结果to Hamiltonian elliptic systems−\ Delta u = f (v),−Deltav = g (u), In \ω、u = v = 0 on∂\ω,当f (v) = vp /[这里吗(e + v)α,g (u) = uq] /[这里吗(e + u)]β、α、β> 2 / (N−2),and p, q are lying In the critical Sobolev hyperbolae 1 / q / p + 1 + 1 + 1 = N−2 / N。对于涉及P -拉普拉斯的拟线性椭圆方程,当f(u) = up—1/[ln(e + u)]α时,存在(P) P的正解的a先验边界,且P∗= Np/(N−P),且α > P /(N−P)。我们还研究了(P)2 as α→0的径向对称解uα = uα(r)的渐近行为。
On the existence of a priori bounds for positive solutions of elliptic problems, I
espanolContinuamos estudiando la existencia de cotas uniformes a priori para soluciones positivas de equaciones elipticas subcriticas (P)p − \Delta_pu = f(u), en \Omega, u = 0, sobre ∂\Omega, Proporcionamos condiciones suficientes para que las soluciones positivas en C1,μ (\overline{\Omega }) de una clase de problemas elipticos subcriticos tengan cotas a-priori L∞ en dominios acotados, convexos, y de clase C2. En esta parte II, extendemos nuestros resultados a sistemas elipticos Hamiltonianos −\Delta u = f(v), −\Delta v = g(u), en \Omega , u = v = 0 sobre ∂ \Omega, cuando f(v) = vp/[ln(e + v)]α, g(u) = uq/[ln(e + u)]β, con α, β > 2/(N − 2), y p, q varian sobre la hiperbola critica de Sobolev 1/p+1 + 1/q+1 = N−2/N . Para ecuaciones elipticas cuasilineales que involucran al operador p-Laplacian, existen cotas a-priori para soluciones positivas de (P)p en el espacio C1,μ(\overline {\Omega }), μ ∈ (0, 1), cuando f(u) = up⋆−1/[ln(e + u)]α, con p∗ = Np/(N − p), y α > p/(N − p). Tambien estudiamos el comportamiento asintotico de soluciones radialmente simetric uα = uα(r) de (P)2 cuando α → 0. EnglishWe continue studying the existence of uniform L∞ a priori bounds for positive solutions of subcritical elliptic equations(P)p − \Delta_pu = f(u), in \Omega, u = 0, on ∂\Omega,We provide sufficient conditions for having a-priori L∞ bounds for C1,μ (\overline{\Omega }) positive solutions to a class of subcritical elliptic problems in bounded, convex, C2 domains. In this part II, we extend our results to Hamiltonian elliptic systems −\Delta u = f(v),−\Deltav = g(u), in \Omega, u = v = 0 on ∂\Omega, when f(v) = vp /[ln(e + v)]α, g(u) = uq/[ln(e + u)]β, with α, β > 2/(N − 2), and p, q are lying in the critical Sobolev hyperbolae 1/p+1 + 1/q+1 = N−2/N . For quasilinear elliptic equations involving the p-Laplacian, there exists a-priori bounds for positive solutions of (P)p when f(u) = up⋆−1/[ln(e + u)]α, with p∗ = Np/(N−p), and α > p/(N−p). We also study the asymptotic behavior of radially symmetric solutions uα = uα(r) of (P)2 as α → 0.
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