Relative exactness modulo a polynomial map and algebraic (Cp,+)-actions

Abstract

Let F=(f1,...,fq) be a polynomial dominating map from Cn to Cq. We study the quotient T1(F) of polynomial 1-forms that are exact along the fibres of F, by 1-forms of type dR+Σ aidfi, where R,a1,...,aq are polynomials. We prove that T1(F) is always a torsion C[t1,...,tq]-module. The we determine under which conditions on F we have T1(F)=0. As an application, we study the behaviour of a class of algebraic (Cp,+)-actions on Cn, and determine in particular when these actions are trivial.

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