Exterior multiplication with singularities: a Saito's theorem on vector bundles

Abstract

Let E be a vector bundle over a suitable differential manifold M and let p E denote p-exterior product of E. Given sections ω1,…,ωk of E and a section η of p E, we consider the problem if η can be written in the form η=Σ ωiγi, where γi are sections of p-1E. An obvious necessary condition η=0, where =ω1·sωk, has to be supplemented with a condition that the form has sufficiently regular singularities at points where (x)=0. Such a local condition is suggested by an algebraic theorem of K. Saito and is given in terms of the depth of the ideal defined by coefficients of . Working in the smooth, real analytic and holomorphic (with M Stein manifold) categories, we show that the condition is sufficient for the above property to hold. Moreover, in the smooth category it is sufficient for existence of a continuous right inverse to the operator defined by (γ1,…,γk)Σ ωiγi. All these results are also proven in the case where E is a bundle over a suitable closed subset of M.