On the splitting of weak nearly ${\cal C}$-manifolds

TL;DR

This paper investigates weak nearly ${ m extbf{C}}$-manifolds, a generalization of almost ${ m extbf{C}}$-manifolds, providing conditions for their local product structure and characterizations, with implications for classical nearly ${ m extbf{C}}$-manifolds.

Contribution

It introduces the concept of weak nearly ${ m extbf{C}}$-manifolds and establishes new conditions and characterizations, expanding the understanding of their geometric structure.

Findings

Conditions for local Riemannian product structure

Characterization of $(4+s)$-dimensional weak nearly ${ m extbf{C}}$-manifolds

New results for nearly ${ m extbf{C}}$-manifolds

Abstract

The interest of mathematicians in metric $f$-manifolds, in particular, almost contact metric manifolds, is motivated by the study of the geometry and dynamics of contact foliations, as well as their applications in physics. Weak metric $f$-manifolds, defined by V. Rovenski and R. Wolak (2022), open a new perspective on classical theory of $f$-manifolds and discover new applications. In this paper, we study manifolds of this type, called weak nearly ${\cal C}$-manifolds, which generalize almost ${\cal C}$-manifolds. We find conditions under which a $(2n+s)$-dimensional weak nearly ${\cal C}$-manifold becomes locally a Riemannian product, and characterize $(4+s)$-dimensional weak nearly ${\cal C}$-manifolds. The consequences of these theorems present new results for nearly ${\cal C}$-manifolds.