Jet Functors and Weil Algebras in Automatic Differentiation: A Geometric Analysis

Abstract: We present a geometric formulation of automatic differentiation (AD) using jet bundles and Weil algebras. Reverse-mode AD emerges as cotangent-pullback, while Taylor-mode corresponds to evaluation in a Weil algebra. From these principles, we derive concise statements on correctness, stability, and complexity: a functorial identity for reverse-mode, algebraic exactness of higher-order derivatives, and explicit bounds on truncation error. We further show that tensorized Weil algebras permit one-pass computation of all mixed derivatives with cost linear in the algebra dimension, avoiding the combinatorial blow-up of nested JVP/VJP schedules. This framework interprets AD theory through the lens of differential geometry and offers a foundation for developing structure-preserving differentiation methods in deep learning and scientific computing. Code and examples are available at https://git.nilu.no/geometric-ad/jet-weil-ad.