Polynomial Retracts and the Jacobian Conjecture
Abstract
Let be the polynomial algebra in two variables over a field of characteristic . A subalgebra of is called a retract if there is an idempotent homomorphism (a {\it retraction}, or {\it projection}) such that . The presence of other, equivalent, definitions of retracts provides several different methods of studying them, and brings together ideas from combinatorial algebra, homological algebra, and algebraic geometry. In this paper, we characterize all the retracts of up to an automorphism, and give several applications of this characterization, in particular, to the well-known Jacobian conjecture. Notably, we prove that if a polynomial mapping of has invertible Jacobian matrix {\it and } fixes a non-constant polynomial, then is an automorphism.
Cite
@article{arxiv.math/9701210,
title = {Polynomial Retracts and the Jacobian Conjecture},
author = {Vladimir Shpilrain and Jie-Tai Yu},
journal= {arXiv preprint arXiv:math/9701210},
year = {2016}
}