Energy asymptotics and blow-up phenomena for biharmonic Br\'ezis-Nirenberg problem

Abstract

For dimensions n≥8, we are concerned with the quotient functional of the biharmonic Br\'ezis-Nirenberg problem under the Navier boundary condition S( V):=∈f0 u∈ H2() H01()∫| u|2dx+∫V|u|2dx(∫|u|2dx)2/2, where 2=2nn-4 is the critical Sobolev exponent of the embedding H2() H01() L2(), ⊂Rn is a bounded open set and V:→R is a continuous function. Under certain assumptions on V, we establish sharp asymptotics for the energy difference S(0)-S( V), as →0+, by means of matching upper and lower bound estimates. Moreover, we give a precise description of the blow-up profile of (almost) minimizing sequences and characterize the blow-up rate and the location of concentration points.