A sharp isoperimetric inequality and the top order Q-curvature

Abstract

For a smooth, complete and normal metric g = e2u|dx|2 with finite total n-th order Q-curvature on Rn with dimension n ≥ 2, we first show that everywhere non-negativity (resp. non-positivity) n-th order Q-curvature Qg(n) implies everywhere non-negativity (resp. non-positivity) of the sectional curvature. Based on this fact, we secondly show that, once Qg(n) is non-negative, then for any compact domain Ω⊂ Rn with smooth boundary ∂Ω, the following sharp isoperimetric inequality holds: |∂Ω|gnn-1 ≥ nnn-1 |Bn|1n-1 (1 - 2(n-1)!\,|Sn| ∫Rn Qg(n) \, dμg) |Ω|g. The third claim in this article is that, if the n-th order Q-curvature, Qg(n), is non-positive and under the main assumption that Cartan-Hadamard conjecture holds true, then we have the sharp inequality |∂Ω|gnn-1 ≥ nnn-1 |Bn|1n-1|Ω|g.

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