Sharp Lp-Moser inequality on Riemannian manifolds

Abstract

We consider (M,g) a smooth compact Riemannian manifold of dimension n ≥ 2 without boundary, 1 < p a real parameter and r = p(n + p)n. This paper concerns the validity of the optimal Moser inequality \[ (∫M |u|r\; dvg )τp ≤ ( A(p,n)τp (∫M |∇g u|p\; dvg)τp + Bopt (∫M |u|p\; dvg)τp ) ( ∫M |u|p\; dvg )τn \; . \] This kind of inequality was already studied in the last years in the particular cases 1 < p < n. Here we solve the case n ≤ p and we introduce one more parameter 1 ≤ τ ≤ \p,2\. Moreover, we prove the existence of an extremal function for the optimal inequality above.