Theoretical Analysis of Generalized W^h-Birecurrent Finsler Spaces with Emphasis on Weyl’s Projective Curvature and Its Relevance to Geometric Mechanics

Abstract

The present work develops a rigorous theoretical framework for the structure of generalized -birecurrent Finsler spaces, with special emphasis on the analytical behavior of Weyl’s projective curvature tensor. By employing Cartan’s h-covariant differentiation and exploiting the identities governing affinely connected Finsler manifolds, several equivalent conditions characterizing generalized -birecurrent spaces are established. New commutation relations for higher-order h-covariant derivatives of Weyl’s projective curvature, torsion, and deviation tensors are derived. The analysis clarifies how these tensors behave under recurrence and birecurrence conditions, and how such properties propagate in affinely connected settings.

Furthermore, the study highlights the relevance of these curvature structures to geometric mechanics and theoretical physics, where Finsler-type curvatures naturally arise in the modeling of non-Euclidean trajectories and anisotropic dynamical systems. The results deepen the understanding of curvature-driven geometric behavior and provide a foundation for future applications in mechanical and physical systems governed by generalized geometric dynamics.