论文信息 - Large solutions of semilinear elliptic equations under the Keller–Osserman condition

Large solutions of semilinear elliptic equations under the Keller–Osserman condition

Abstract We consider the equation Δ u = p ( x ) f ( u ) where p is a nonnegative nontrivial continuous function and f is continuous and nondecreasing on [ 0 , ∞ ) , satisfies f ( 0 ) = 0 , f ( s ) > 0 for s > 0 and the Keller–Osserman condition ∫ 1 ∞ ( F ( s ) ) − 1 / 2 d s = ∞ where F ( s ) = ∫ 0 s f ( t ) d t . We establish conditions on the function p that are necessary and sufficient for the existence of positive solutions, bounded and unbounded, of the given equation.

Alan V. Lair | A. Lair

[1] D. Sattinger. Topics in stability and bifurcation theory , 1973 .

[2] Alan V. Lair,et al. Large solutions of semilinear elliptic problems , 1999 .

[3] J. Keller. On solutions of δu=f(u) , 1957 .

[4] Alan V. Lair,et al. Large solutions of sublinear elliptic equations , 2000 .

[5] Alan V. Lair,et al. A Necessary and Sufficient Condition for Existence of Large Solutions to Semilinear Elliptic Equations , 1999 .

[6] A. Lair. Nonradial Large Solutions of Sublinear Elliptic Equations , 2003 .

[7] Robert Osserman,et al. On the inequality $\Delta u\geq f(u)$. , 1957 .

[8] Vicentiu D. Rădulescu,et al. Blow-up boundary solutions of semilinear elliptic problems , 2002 .