In this paper, by using the idea of category, we investigate how the shape of the graph of h(x) affects the number of positive solutions to the following weighted nonlinear elliptic system: = ( N-2-2a 2. where 0 ...In this paper, by using the idea of category, we investigate how the shape of the graph of h(x) affects the number of positive solutions to the following weighted nonlinear elliptic system: = ( N-2-2a 2. where 0 is a smooth bounded domain in ]1N (N 〉 3), A, cr 〉 0 are parameters, 0 ≤ μ 〈 μa a 2 ' h(x), KI(X) and K2(x) are positive continuous functions in , 1 〈 q 〈 2, a, β 〉 1 and a + β = 2*(a,b) (2* (a, b) 2N = N-2(1+a-b) is critical Sobolev-Hardy exponent). We prove that the system has at least k nontrivial nonnegative solutions when the pair of the parameters (), r) belongs to a certain subset of N2.展开更多
In this paper,a system of elliptic equations is investigated,which involves multiple critical Sobolev exponents and symmetric multi-polar potentials.By variational methods and analytic techniques,the relevant best con...In this paper,a system of elliptic equations is investigated,which involves multiple critical Sobolev exponents and symmetric multi-polar potentials.By variational methods and analytic techniques,the relevant best constants are studied and the existence of(Zk×SO(N.2))2-invariant solutions to the system is established.展开更多
This paper studies multi-solitons of non-integrable generalized Davey-Stewartson system in the elliptic-elliptic case. By extending the method for constructing multi-solitons of non-integrable nonlinear SchrSdinger eq...This paper studies multi-solitons of non-integrable generalized Davey-Stewartson system in the elliptic-elliptic case. By extending the method for constructing multi-solitons of non-integrable nonlinear SchrSdinger equations and systems developed by Martel et al. to the present non-integrable generalized Davey- Stewartson system and overcoming some new difficulties caused by the nonlocal operator B, we prove the existence of multi-solitons for this system. Furthermore, we also give a generalization of this result to a more general class of equations with nonlocal nonlinearities.展开更多
文摘In this paper, by using the idea of category, we investigate how the shape of the graph of h(x) affects the number of positive solutions to the following weighted nonlinear elliptic system: = ( N-2-2a 2. where 0 is a smooth bounded domain in ]1N (N 〉 3), A, cr 〉 0 are parameters, 0 ≤ μ 〈 μa a 2 ' h(x), KI(X) and K2(x) are positive continuous functions in , 1 〈 q 〈 2, a, β 〉 1 and a + β = 2*(a,b) (2* (a, b) 2N = N-2(1+a-b) is critical Sobolev-Hardy exponent). We prove that the system has at least k nontrivial nonnegative solutions when the pair of the parameters (), r) belongs to a certain subset of N2.
基金supported by the Science Foundation of State Ethnic Affairs Commission of the People’s Republic of China(Grant No.12ZNZ004)
文摘In this paper,a system of elliptic equations is investigated,which involves multiple critical Sobolev exponents and symmetric multi-polar potentials.By variational methods and analytic techniques,the relevant best constants are studied and the existence of(Zk×SO(N.2))2-invariant solutions to the system is established.
基金supported by National Natural Science Foundation of China (Grant No. 11571381)
文摘This paper studies multi-solitons of non-integrable generalized Davey-Stewartson system in the elliptic-elliptic case. By extending the method for constructing multi-solitons of non-integrable nonlinear SchrSdinger equations and systems developed by Martel et al. to the present non-integrable generalized Davey- Stewartson system and overcoming some new difficulties caused by the nonlocal operator B, we prove the existence of multi-solitons for this system. Furthermore, we also give a generalization of this result to a more general class of equations with nonlocal nonlinearities.
