Bifurcation sets and global monodromies of Newton non-degenerate polynomials on algebraic sets

Abstract

Let S⊂ Cn be a non-singular algebraic set and f Cn C be a polynomial function. It is well-known that the restriction f|S S C of f on S is a locally trivial fibration outside a finite set B(f|S) ⊂ C. In this paper, we give an explicit description of a finite set T∞(f|S) ⊂ C such that B(f|S) ⊂ K0(f|S) T∞(f|S), where K0(f|S) denotes the set of critical values of the f|S. Furthermore, T∞(f|S) is contained in the set of critical values of certain polynomial functions provided that the f|S is Newton non-degenerate at infinity. Using these facts, we show that if \ft\t ∈ [0, 1] is a family of polynomials such that the Newton polyhedron at infinity of ft is independent of t and the ft|S is Newton non-degenerate at infinity, then the global monodromies of the ft|S are all isomorphic.