【摘 要】
:
Several physical phenomena can be described by a certain number of densities(of mass,population,probability,…)distributed in a domain and subject to laws o
【机 构】
:
Universit(a)diTorino
【出 处】
:
非线性偏微分方程和数学物理研讨会(NPDEMP 2016)
论文部分内容阅读
Several physical phenomena can be described by a certain number of densities(of mass,population,probability,…)distributed in a domain and subject to laws of diffusion,reaction,and competitive interac-tion.Whenever the competitive interaction is the prevailing phenomenon,the several densities can not coexist and tend to segregate,hence determining a partition of the domain(Gauses experimental principle of competitive exclusion(1932)).
其他文献
In this talk I will present two results concerning construction of infinite time bubbling solutions for critical nonlinear heat equations of Fujita type.The
Data enrichment has been undertaken widely in practice to increase ei-ther subject-level information by combining individual clinical data,omics data and im
We will talk about the following poly-harmonic equations with critical exponents:(-△)mu = K(y)uN+2m/N-2m , u>0 in RN,where N>2m+2,m∈N+,K(y)is positive and
A conjecture about the mean field equation △u+eu = 8nπδ0 on a at torus Eτ is the non-existence of solutions if τ∈iR+.For any n∈2 N≥2,this conjectur
This is joint work with Philippe Gravejat and Mathieu Lewin(2016,arXiv:1602.04047).The Euler-Heisenberg model provides a nonlinear system of equations for t
We present recent results that show that the singular Liouville equation in the plane can be viewed as a limit of semilinear elliptic equations of Lane-Emde
Conventionally,the virial theorem(about the ratio of the total kinetic energy and the total potential energy)is useful to get the eigenvalue estimate of lin
The nontopological solutions and mixed type solutions in SU(3)Chern-Simons model over R2 are subtle one.There are variational functionals for them but they
We consider a critical weakly coupled elliptic systems in a domain D in RN with N = 3, 4.We prove the existence of positive solutions which blow-up at one o
In this talk,we are concerned with the existence,multiplicity and local uniqueness of nonradial solutions for equations with critical exponent,including pol