Helmholtz-Hodge Theorems: Unification of Integration and Decomposition Perspectives

Abstract

We develop a Helmholtz-like theorem for differential forms in Euclidean space En using a uniqueness theorem similar to the one for vector fields. We then apply it to Riemannian manifolds, Rn, which, by virtue of the Schlaefli-Janet-Cartan theorem of embedding, are here considered as hypersurfaces in EN with N≥ n(n+1)/2. We obtain a Hodge decomposition theorem that includes and goes beyond the original one, since it specifies the terms of the decomposition. We then view the same issue from a perspective of integrability of the system (dα =μ , δ α = ), relating boundary conditions to solutions of (dα =0, δ α =0), [δ is what goes by the names of divergence and co-derivative, inappropriate for the Kaehler calculus, with which we obtained the foregoing).