Multi-Bubble Blow-up Analysis for an Almost Critical Problem

Abstract

Consider a smooth, bounded domain ⊂ Rn with n≥ 4 and a smooth positive function V. We analyze the asymptotic behavior of a sequence of positive solutions u to the equation - u +V(x)u =un+2n-2- in with zero Dirichlet boundary conditions, as 0. We determine the precise blow-up rate and characterize the locations of interior concentration points in the general case of multiple blow-up, providing an exhaustive description of interior blow-up phenomena of this equation. Our result is established through a delicate analysis of the gradient of the corresponding Euler-Lagrange functional.

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