On the geometry of surfaces in manifolds with density
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Université de Mostaganem
Abstract
This thesis explores the geometry of surfaces in pseudo-Riemmennian manifolds with density,
an important extension of classical geometric analysis that provides a natural framework
for studying variational problems, curvature, and minimal surfaces under weighted volume
measures. A manifold with density is a Riemannian or pseudo-Riemannian manifold (M, g)
endowed with a smooth weight function ρ = eφ, which modifies the standard geometric structure
and leads to generalized notions of curvature, mean curvature, and divergence. Such
weighted structures arise naturally in probability theory, diffusion processes, and the study
of geometric flows.
In this work, we investigate the geometric properties of surfaces in Euclidean space R3
and in Minkowski space R31
, both endowed with a density function ρ = eφ. After reviewing
the necessary preliminaries on differential geometry and pseudo-Riemannian manifolds, we
develop and analyze weighted curvature formulas, including the generalized Gauss curvature
and mean curvature. We also examine Plateau-type problems and study the behavior of the
weighted divergence operator in manifolds with density, supported by explicit examples.
The main contributions of this thesis focus on the classification and geometric analysis of
weighted flat translation surfaces in Minkowski 3-space R31
and weighted flat radial surfaces in
both Euclidean R3 and Minkowski R31
spaces. By deriving the corresponding flatness conditions
and curvature relations, we extend previous results on linear densities and establish new
characterizations of surfaces governed by weighted geometric structures. These results provide
deeper insight into minimal and flat surfaces in weighted settings and offer a foundation
for future research in differential geometry with density.