The affine automorphism group of \(\mathbb{A}^{3}\) is not a maximal subgroup of the tame automorphism group
From MaRDI portal
Publication:887905
DOI10.1307/mmj/1441116658zbMath1338.14056arXiv1410.0901OpenAlexW2963225240MaRDI QIDQ887905
Publication date: 3 November 2015
Published in: Michigan Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1410.0901
Related Items (5)
A PROBLEM ON α-SIMPLE RINGS ⋮ Normal subgroups generated by a single polynomial automorphism ⋮ Stably co-tame polynomial automorphisms over commutative rings ⋮ Co-tame polynomial automorphisms ⋮ Some co-tame automorphisms of affine spaces
Cites Work
- Unnamed Item
- Polynomial automorphisms and the Jacobian conjecture
- Generalisations of the tame automorphisms over a domain of positive characteristic
- The generalized amalgamated product structure of the tame automorphism group in dimension three
- Coordinates ofR[x,y: Constructions and Classifications]
- ON GENERATORS OF THE TAME INVERTIBLE POLYNOMIAL MAPS GROUP
- The tame and the wild automorphisms of polynomial rings in three variables
- Über ganze birationale Transformationen der Ebene.
This page was built for publication: The affine automorphism group of \(\mathbb{A}^{3}\) is not a maximal subgroup of the tame automorphism group
