Degree bounds for invariant skew polynomials

Abstract: When we consider the action of a finite group on a polynomial ring, a polynomial unchanged by the action is called an invariant polynomial. A famous result of Noether states that in characteristic zero the maximal degree of a minimal invariant polynomial is bounded above by the order of the group. Our work establishes that the same bound holds for invariant skew polynomials in the exterior algebra. Our approach to the problem relies on a theorem of Derksen that connects invariant theory to the study of ideals … Show more

“…Invariant theory. Gandini [Gan18,Gan21] has studied equivariant resolutions over exterior algebras in characteristic zero by transferring well-established results about the polynomial ring to the exterior algebra using the transpose functor (see [SS12,Section 7.4]). In positive characteristic, the transpose functor does not exist, and moreover these results…”

GL-equivariance in positive characteristic I: The infinite exterior algebra

“…Invariant theory. Gandini [Gan18,Gan21] has studied equivariant resolutions over exterior algebras in characteristic zero by transferring well-established results about the polynomial ring to the exterior algebra using the transpose functor (see [SS12,Section 7.4]). In positive characteristic, the transpose functor does not exist, and moreover these results…”

GL-equivariance in positive characteristic I: The infinite exterior algebra