Isolated singularities for the exponential type semilinear elliptic equation in ℝ²

Abstract: Abstract. In this article we study positive solutions of the equation −∆u = f (u) in a punctured domain Ω = Ω \ {0} in R 2 and show sharp conditions on the nonlinearity f (t) that enables us to extend such a solution to the whole domain Ω and also preserve its regularity. We also show, using the framework of bifurcation theory, the existence of at least two solutions for certain classes of exponential type nonlinearities. IntroductionLet Ω ⊂ R 2 be a bounded domain with 0 ∈ Ω. Denote Ω = Ω \ {0}. Let f : (0, ∞… Show more

“…In the present paper, we extend the results contained in [9] to the radial quasilinear case and obtain a complete answer to questions (Q1) and (Q2) above. We also provide a partial answer to (Q3).…”

“…When N = 2 and f has at most a polynomial growth, the first two questions (Q1) and (Q2) were discussed in detail in Brezis-Lions [6] and Lions [18]. For a corresponding discussion involving exponential growth nonlinearities in the case N = 2, we refer to Dhanya-Giacomoni-Prashanth [9].…”

Radial singular solutions for the N-Laplace equation with exponential nonlinearities

“…In the present paper, we extend the results contained in [9] to the radial quasilinear case and obtain a complete answer to questions (Q1) and (Q2) above. We also provide a partial answer to (Q3).…”

“…When N = 2 and f has at most a polynomial growth, the first two questions (Q1) and (Q2) were discussed in detail in Brezis-Lions [6] and Lions [18]. For a corresponding discussion involving exponential growth nonlinearities in the case N = 2, we refer to Dhanya-Giacomoni-Prashanth [9].…”

Radial singular solutions for the N-Laplace equation with exponential nonlinearities

“…For the dimension N ≥ 3, P.L.Lions [10] found a sharp condition on f that determines whether α is zero or not in the previous expression. In [5], the authors further extended the result for dimension N = 2 by finding the minimal growth rate of the function f which guranteed α to be 0.…”

Isolated singularities of polyharmonic operator in even dimension

“…For the dimension N ≥ 3, P.L.Lions [10] found a sharp condition on f that determines whether α is zero or not in the previous expression. In [5], the authors further extended the result for dimension N = 2 by finding the minimal growth rate of the function f which guranteed α to be 0. Taliaferro, in his series of papers (see for e.g.…”

Isolated Singularities of Polyharmonic Operator in Even Dimension