A generalized Trudinger-Moser inequality on a compact Riemannian surface
Abstract
Let (, g) be a compact Riemannian surface. Let , h be two smooth functions on with ∫ dvg ≠ 0 and h≥0, h0. In this paper, using a method of blowup analysis, we prove that the functional alignfunctionalJ J,h(u)=12∫ |∇g u|2dvg + 8π1∫ dvg∫ udvg-8π∫ heudvg align is bounded from below in W1,2(,g). Moreover, we obtain a sufficient condition under which J, h attains its infimum in W1,2(,g). These results generalize the main results in DJLW97 and YZ2016.
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