Infinitely many turning points for an elliptic problem with a singular non-linearity

doi:10.1112/jlms/jdm121

Oxford Journals

Journal of the London Mathematical Society Advance Access originally published online on March 20, 2008
Journal of the London Mathematical Society 2008 78(1):21-35; doi:10.1112/jlms/jdm121

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Infinitely many turning points for an elliptic problem with a singular non-linearity

Zongming Guo

Department of Mathematics
Henan Normal University
Xinxiang 453002
PR China
guozm@public.xxptt.ha.cn

Juncheng Wei

Department of Mathematics
The Chinese University of Hong Kong
Shatin
Hong Kong

We consider the problem – ${Delta}$ u = ${lambda}$ |x|/(1 – u)^p inB, u = 0 on ${partial}$ B, 0 < u < 1 in B, where ${alpha}$ $≥$ 0, p $≥$ 1 and Bis the unit ball in $R$ ^N (N $≥$ 2). We show that there exists a ${lambda}$ _*> 0 such that for ${lambda}$ < ${lambda}$ _*, the minimizer is the only positiveradial solution. Furthermore, if , then the branch of positive radial solutions must undergoinfinitely many turning points as the maximums of the radialsolutions on the branch converge to 1. This solves ConjectureB in [N. Ghoussoub and Y. Gun, SIAM J. Math. Anal. 38 (2007)1423–1449]. The key ingredient is the use of monotonicityformula.

2000 Mathematics Subject Classification 35B45 (primary), 35J40(secondary).

Received November 10, 2006; revised September 14, 2007; published online March 20, 2008.

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