An approximate bifurcation function and existence of solutions for semilinear elliptic PDEs

We investigate the existence, multiplicity and bifurcation of solutions of a model nonlinear degenerate elliptic differential equation: &x 2 u"=\*u+ |u| p&1 u in (0, 1); u(0)=u(1)=0. This model is related to a simplified version of the nonlinear Wheeler DeWitt equation as it appears in quantum cosmo

The elliptic equation \(\Delta u+f(u)=0\) in \(R^{n}\) is discussed in the case where \(f(u)=\) \(|u|^{n} \quad u(|u| \geqslant 1),=|u|^{4} \quad{ }^{1} u(|u|<1), 10\). It is further proved that for any \(k \geqslant 0\) there exist at least three radially symmetric solutions which have exactly \(k\

We are concerned with the uniqueness and existence of positive solutions for the following Dirichlet

The existence and multiplicity results are obtained for solutions of a class of the Dirichlet problem for semilinear elliptic equations by the least action principle and the minimax methods, respectively.

In this paper, we consider the semilinear elliptic equation For p=2NÂ(N&2), we show that there exists a positive constant +\\*>0 such that (V) + possesses at least one solution if + # (0, +\\*) and no solutions if +>+\\*. Furthermore, (V) + possesses a unique solution when +=+\\*, and at least two s