Positive solutions of asymptotically linear elliptic eigenvalue problems

In this paper we are going to discuss bifurcation from infinity for asymptotically linear elliptic eigenvalue problems having nonlinear boundary conditions. Behavior of the bifurcation components is also studied.  2002 Elsevier Science (USA)

In this paper, we show that semilinear elliptic systems of the form where k and l are nonnegative numbers, f(x, t) and g(x, t) are continuous functions on R N ×R and asymptotically linear as t →+∞.

We derive a result on the limit of certain sequences of principal eigenvalues associated with some elliptic eigenvalue problems. This result is then used to give a complete description of the global structure of the curves of positive steady states of a parameter dependent diffusive version of the c

In this article, we consider cooperative and noncooperative elliptic systems that are asymptotically linear at infinity. We obtain infinitely many solutions with small energy if the potential is even. If the noncooperative system is resonant both at zero and at infinity, then the number of nontrivia