Calculus of Variations and Geometric Measure Theory

G. Catino - P. Mastrolia - D. D. Monticelli - F. Punzo

Four dimensional closed manifolds admit a weak harmonic Weyl metric

created by catino on 16 Oct 2018
modified on 08 Jul 2022

[BibTeX]

Accepted Paper

Inserted: 16 oct 2018
Last Updated: 8 jul 2022

Journal: Comm. Cont. Math.
Year: 2022

Abstract:

On four-dimensional closed manifolds we introduce a class of canonical Riemannian metrics, that we call weak harmonic Weyl metrics, defined as critical points in the conformal class of a quadratic functional involving the norm of the divergence of the Weyl tensor. This class includes Einstein and, more in general, harmonic Weyl manifolds. We prove that every closed four-manifold admits a weak harmonic Weyl metric, which is the unique (up to dilations) minimizer of the functional in a suitable conformal class. In general the problem is degenerate elliptic due to possible vanishing of the Weyl tensor. In order to overcome this issue, we minimize the functional in the conformal class determined by a reference metric, constructed by Aubin, with nowhere vanishing Weyl tensor. Moreover, we show that anti-self-dual metrics with positive Yamabe invariant can be characterized by pinching conditions involving suitable quadratic Riemannian functionals.


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