A remark on a polynomial mapping F: n n

Abstract

In Valette, Guillaume and Anna Valette associate singular varieties VF to a polynomial mapping F: n n. In the case F: 2 2, if the set K0(F) of critical values of F is empty, then F is not proper if and only if the 2-dimensional homology or intersection homology (with any perversity) of VF are not trivial. In ThuyValette, the results of Valette are generalized in the case F: n n where n ≥ 3, with an additional condition. In this paper, we prove that if F: 2 2 is a non-proper generic dominant polynomial mapping, then the 2-dimensional homology and intersection homology (with any perversity) of VF are not trivial. We prove that this result is true also for a non-proper generic dominant polynomial mapping F: n n (\, n ≥ 3), with the same additional condition than in ThuyValette. In order to compute the intersection homology of the variety VF, we provide an explicit Thom-Mather stratification of the set K0(F) SF.