Metrizability and Dynamics of Weil Bundles

Abstract

This paper bridges synthetic and classical differential geometry by investigating the metrizability and dynamics of Weil bundles. For a smooth, compact manifold \(M\) and a Weil algebra \(A\), we prove that the manifold \(MA\) of \(A\)-points admits a canonical, complete, weighted metric \(dw\) that encodes both base-manifold geometry and infinitesimal deformations. Key results include: (1) Metrization: \(dw\) induces a complete metric topology on \(MA\). (2) Path Lifting: Curves lift from \(M\) to \(MA\) while preserving topological invariants. (3) Dynamics: Fixed-point theorems for diffeomorphisms on \(MA\) connected to stability analysis. (4) Topological Equivalence: \(H*(MA) H*(M)\) and \(π(MA) π(M)\).