Bifurcation for a Type of Quasilinear Elliptic Equations On R" under the Natural Growth Conditions

The article proved the existence of H~1 (R) ∩ L~∞ (R~n) at the bifurcation λ= 0 by discussing the following nonlinear eigenvalue:—D-(ij)(a_(ij)(x,u)D_ju) +1/2a_(iju)(x,u)D_iuD_ju — q(x)|u|~σu = λu0≠u∈H~1(R~n) ,0<σ< 4/n,n≥3,x∈ R~nMeanwhile the article studied the conditions of q(x) under which λ=0 was a bifurcation point for the nonlinear eigenvalue . Here a_(ij) are not required to be bounded as u varies.

Bifurcation for a Type of Quasilinear Elliptic Equations On R" under the Natural Growth Conditions