Mathematics – Analysis of PDEs
Scientific paper
2011-03-03
Mathematics
Analysis of PDEs
35 pages. To appear in "Advances in the Calculus of Variations"
Scientific paper
We investigate fourth order Paneitz equations of critical growth in the case of $n$-dimensional closed conformally flat manifolds, $n \ge 5$. Such equations arise from conformal geometry and are modelized on the Einstein case of the geometric equation describing the effects of conformal changes of metrics on the $Q$-curvature. We obtain sharp asymptotics for arbitrary bounded energy sequences of solutions of our equations from which we derive stability and compactness properties. In doing so we establish the criticality of the geometric equation with respect to the trace of its second order terms.
Hebey Emmanuel
Robert Frédéric
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