Pluckerians twisted with linear forms and Druzkowski maps

Abstract

We introduce a class of so-called Plucker polynomials with respect to 2l× l matrices, which varies the standard quadratic Plucker expression by increased power and twisted linear forms. Besides general interests exhibited by novel algebraic identities and delicate nested structures, these polynomials fit into Druzkowski's well-known reduction of the Jacobian Conjecture. The core jacobian condition therein breaks into homogeneous linear equations with polynomial coefficients, and the Plucker polynomials are applied to study both existence and expression of their nontrivial solutions.

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