FRINK Linked Data Fragments server

Matches in SemOpenAlex for { <https://semopenalex.org/work/W4320928958> ?p ?o ?g. }

• W4320928958 endingPage "301" @default.
• W4320928958 startingPage "275" @default.
• W4320928958 abstract "In this paper, we are concerned with the optimal integrability, regularity and symmetry of integrable solutions for the following Wolff type integral systems:(1.1){u(x)=R1(x)Wβ,γ(vq)(x),u(x)>0,x∈RN,v(x)=R2(x)Wβ,γ(up)(x),v(x)>0,x∈RN, where γ>2, β>0, βγ<N, p,q>γ−1 with γ−1p+γ−1+γ−1q+γ−1=N−βγN, R1,R2 are double bounded in RN andWβ,γ(h)(x):=∫0∞[∫Bt(x)h(y)dytN−βγ]1γ−1dtt. Firstly, we prove the optimal integrability and boundedness of solutions (u,v)∈Lp+γ−1(RN)×Lq+γ−1(RN) for system (1.1), by constructing a nonlinear, contracting operator and applying the regularity lifting lemma of C. Ma, W. Chen and C. Li (2011) [21]. Moreover, we exploit the general regularity lifting theorem to derive the Lipschitz continuity of u and v when R1≡R2≡1 in RN. These extend the above important results of C. Ma, W. Chen and C. Li to γ>2. We also prove that u and v vanish at infinity. As the corollaries of the above results, we obtain the optimal integrability, boundedness and the property of vanishing at infinity of integrable solutions for the corresponding γ-Laplace and k-Hessian systems. Secondly, we use the method of moving planes in integral forms to prove the symmetry and monotonicity of solutions (u,v)∈Lp+γ−1(RN)×Lq+γ−1(RN) for system (1.1) when R1≡R2≡1 in RN, which extends the useful result of W. Chen and C. Li (2011) [5] to γ>2. In comparison with the above two papers, Minkowski's inequality is crucial in our proofs. We believe that our arguments can be used to prove similar results for other Wolff type integral systems when γ>2." @default.
• W4320928958 created "2023-02-16" @default.
• W4320928958 creator A5024974419 @default.
• W4320928958 creator A5055268501 @default.
• W4320928958 date "2023-06-01" @default.
• W4320928958 modified "2023-09-24" @default.
• W4320928958 title "Integrability, regularity and symmetry of positive integrable solutions for Wolff type integral systems" @default.
• W4320928958 cites W1949063937 @default.
• W4320928958 cites W1979049759 @default.
• W4320928958 cites W1994134181 @default.
• W4320928958 cites W2000774502 @default.
• W4320928958 cites W2011667189 @default.
• W4320928958 cites W2012063459 @default.
• W4320928958 cites W2014601829 @default.
• W4320928958 cites W2016670537 @default.
• W4320928958 cites W2027815054 @default.
• W4320928958 cites W2049535402 @default.
• W4320928958 cites W2053903989 @default.
• W4320928958 cites W2055205893 @default.
• W4320928958 cites W2065122068 @default.
• W4320928958 cites W2073043804 @default.
• W4320928958 cites W2073460085 @default.
• W4320928958 cites W2082434794 @default.
• W4320928958 cites W2097775664 @default.
• W4320928958 cites W2102768481 @default.
• W4320928958 cites W2107784368 @default.
• W4320928958 cites W2312590008 @default.
• W4320928958 cites W2320214009 @default.
• W4320928958 cites W2905260143 @default.
• W4320928958 cites W2963573629 @default.
• W4320928958 cites W3128896600 @default.
• W4320928958 cites W4235609472 @default.
• W4320928958 doi "https://doi.org/10.1016/j.jde.2023.02.010" @default.
• W4320928958 hasPublicationYear "2023" @default.
• W4320928958 type Work @default.
• W4320928958 citedByCount "0" @default.
• W4320928958 crossrefType "journal-article" @default.
• W4320928958 hasAuthorship W4320928958A5024974419 @default.
• W4320928958 hasAuthorship W4320928958A5055268501 @default.
• W4320928958 hasConcept C114614502 @default.
• W4320928958 hasConcept C134306372 @default.
• W4320928958 hasConcept C18903297 @default.
• W4320928958 hasConcept C200741047 @default.
• W4320928958 hasConcept C202444582 @default.
• W4320928958 hasConcept C22324862 @default.
• W4320928958 hasConcept C2524010 @default.
• W4320928958 hasConcept C2777299769 @default.
• W4320928958 hasConcept C2779886137 @default.
• W4320928958 hasConcept C33923547 @default.
• W4320928958 hasConcept C34388435 @default.
• W4320928958 hasConcept C37914503 @default.
• W4320928958 hasConcept C7321624 @default.
• W4320928958 hasConcept C86803240 @default.
• W4320928958 hasConceptScore W4320928958C114614502 @default.
• W4320928958 hasConceptScore W4320928958C134306372 @default.
• W4320928958 hasConceptScore W4320928958C18903297 @default.
• W4320928958 hasConceptScore W4320928958C200741047 @default.
• W4320928958 hasConceptScore W4320928958C202444582 @default.
• W4320928958 hasConceptScore W4320928958C22324862 @default.
• W4320928958 hasConceptScore W4320928958C2524010 @default.
• W4320928958 hasConceptScore W4320928958C2777299769 @default.
• W4320928958 hasConceptScore W4320928958C2779886137 @default.
• W4320928958 hasConceptScore W4320928958C33923547 @default.
• W4320928958 hasConceptScore W4320928958C34388435 @default.
• W4320928958 hasConceptScore W4320928958C37914503 @default.
• W4320928958 hasConceptScore W4320928958C7321624 @default.
• W4320928958 hasConceptScore W4320928958C86803240 @default.
• W4320928958 hasFunder F4320321001 @default.
• W4320928958 hasFunder F4320335774 @default.
• W4320928958 hasFunder F4320335777 @default.
• W4320928958 hasLocation W43209289581 @default.
• W4320928958 hasOpenAccess W4320928958 @default.
• W4320928958 hasPrimaryLocation W43209289581 @default.
• W4320928958 hasRelatedWork W2006641431 @default.
• W4320928958 hasRelatedWork W2010527967 @default.
• W4320928958 hasRelatedWork W2030189348 @default.
• W4320928958 hasRelatedWork W2053374910 @default.
• W4320928958 hasRelatedWork W2317560809 @default.
• W4320928958 hasRelatedWork W2612586646 @default.
• W4320928958 hasRelatedWork W2965795862 @default.
• W4320928958 hasRelatedWork W2999232206 @default.
• W4320928958 hasRelatedWork W3040978533 @default.
• W4320928958 hasRelatedWork W4287726655 @default.
• W4320928958 hasVolume "357" @default.
• W4320928958 isParatext "false" @default.
• W4320928958 isRetracted "false" @default.
• W4320928958 workType "article" @default.