We study the existence of at least one conformal metric of prescribed Gaussian curvature on a closed surface Σ admitting conical singularities of orders αi’s at points pi’s. In particular, we are concerned with the case where the prescribed Gaussian curvature is sign-changing. Such a geometrical problem reduces to solving a singular Liouville equation. By employing a min–max scheme jointly with a finite dimensional reduction method, we deduce new perturbative results providing existence when the quantity χ(Σ) + ∑_ i α_i approaches a positive even integer, where χ(Σ) is the Euler characteristic of the surface Σ.
Prescribed Gauss curvature problem on singular surfaces / D'Aprile, T.; De Marchis, F.; Ianni, I.. - In: CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS. - ISSN 0944-2669. - STAMPA. - 57:4(2018), pp. ...-.... [10.1007/s00526-018-1373-3]
Prescribed Gauss curvature problem on singular surfaces
F. De Marchis;I. Ianni
2018
Abstract
We study the existence of at least one conformal metric of prescribed Gaussian curvature on a closed surface Σ admitting conical singularities of orders αi’s at points pi’s. In particular, we are concerned with the case where the prescribed Gaussian curvature is sign-changing. Such a geometrical problem reduces to solving a singular Liouville equation. By employing a min–max scheme jointly with a finite dimensional reduction method, we deduce new perturbative results providing existence when the quantity χ(Σ) + ∑_ i α_i approaches a positive even integer, where χ(Σ) is the Euler characteristic of the surface Σ.| File | Dimensione | Formato | |
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