共查询到10条相似文献,搜索用时 93 毫秒
1.
In this paper, we consider the following fractional Schrödinger–Poissonproblem where and , the potential is weakly differentiable and . By introducing some new tricks, we prove that the problem admits a ground state solution of Nehari–Pohozaev type under mild assumptions on and . The results here extend the existing study. 相似文献
2.
In this paper, we execute elementary row and column operations on the partitioned matrix into to compute generalized inverse of a given complex matrix , where is a matrix such that and . The total number of multiplications and divisions operations is and the upper bound of is less than when . A numerical example is shown to illustrate that this method is correct. 相似文献
3.
In this work, we are interested in considering the following nonlocal problem where is a smooth bounded domain, and is the critical Sobolev exponent. By using the variational method and the critical point theorem, some existence and multiplicity results are obtained. 相似文献
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5.
Hong-Ying Li 《Computers & Mathematics with Applications》2018,75(8):2858-2873
In this work, we are interested in studying the following Kirchhoff type problem where is a smooth bounded domain, is the critical Sobolev exponent, , and with the set of positive measures, and with By the Nehari method and variational method, the existence of positive ground state solutions is obtained. 相似文献
6.
O.H. Miyagaki L.C. Paes-Leme B.M. Rodrigues 《Computers & Mathematics with Applications》2018,75(9):3201-3212
In this work we study the existence and multiplicity of solutions to the following Kirchhoff-type problem with critical nonlinearity in where , and the nonlinearity satisfies certain subcritical growth conditions. By using topological and variational methods, infinitely many positive solutions are obtained. 相似文献
7.
Juntang Ding 《Computers & Mathematics with Applications》2013,65(11):1808-1822
In this paper we discuss the blow-up for classical solutions to the following class of parabolic equations with Robin boundary condition: where is a bounded domain of with smooth boundary . By constructing some appropriate auxiliary functions and using a first-order differential inequality technique, we derive conditions on the data which guarantee the blow-up or the global existence of the solution. For the blow-up solution, a lower bound on blow-up time is also obtained. Moreover, some examples are presented to illustrate the applications. 相似文献
8.
Global asymptotic stability of steady states in a chemotaxis-growth system with singular sensitivity
Pan Zheng Chunlai Mu Robert Willie Xuegang Hu 《Computers & Mathematics with Applications》2018,75(5):1667-1675
This paper deals with a fully parabolic chemotaxis-growth system with singular sensitivity under homogeneous Neumann boundary conditions in a smooth bounded domain , where the parameters and . Global existence and boundedness of solutions to the above system were established under some suitable conditions by Zhao and Zheng (2017). The main aim of this paper is further to show the large time behavior of global solutions which cannot be derived in the previous work. 相似文献
9.
In this paper, we consider the blow-up of solutions to a class of quasilinear reaction–diffusion problems where is a bounded convex domain in , weighted nonlocal source satisfies and and are positive constants. By utilizing a differential inequality technique and maximum principles, we establish conditions to guarantee that the solution remains global or blows up in a finite time. Moreover, an upper and a lower bound for blow-up time are derived. Furthermore, two examples are given to illustrate the applications of obtained results. 相似文献
10.
Shuyan Qiu Chunlai Mu Liangchen Wang 《Computers & Mathematics with Applications》2018,75(9):3213-3223
This paper deals with the following quasilinear chemotaxis-growth system in a smoothly bounded domain under zero-flux boundary conditions. The parameters and are positive and the diffusion function is supposed to generalize the prototype with and . Under the assumption , it is proved that whenever , and , for any given nonnegative and suitably smooth initial data (, , ) satisfying , the corresponding initial–boundary problem possesses a unique global solution which is uniformly-in-time bounded. The novelty of the paper is that we use the boundedness of the with to estimate the boundedness of . Moreover, the result in this paper can be regarded as an extension of a previous consequence on global existence of solutions by Hu et al. (2016) under the condition that and . 相似文献