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GENERALISED QUANTUM DETERMINANTAL RINGS ARE MAXIMAL ORDERS

Part of: Linear algebraic groups and related topics Chain conditions, growth conditions, and other forms of finiteness Lie algebras and Lie superalgebras Hopf algebras, quantum groups and related topics Rings and algebras arising under various constructions

Published online by Cambridge University Press:  04 August 2020

T. H. LENAGAN  and
L. RIGAL
T. H. LENAGAN
Affiliation:
Maxwell Institute, School of Mathematics, University of Edinburgh, James Clerk Maxwell Building, The King’s Buildings, Peter Guthrie Tait Road, Edinburgh, EH9 3FD, UK, e-mail: tom@maths.ed.ac.uk
L. RIGAL
Affiliation:
Université Sorbonne Paris Nord, LAGA, CNRS, UMR 7539, F-93430, Villetaneuse, France, e-mail: rigal@math.univ-paris13.fr
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Abstract

Generalised quantum determinantal rings are the analogue in quantum matrices of Schubert varieties. Maximal orders are the noncommutative version of integrally closed rings. In this paper, we show that generalised quantum determinantal rings are maximal orders. The cornerstone of the proof is a description of generalised quantum determinantal rings, up to a localisation, as skew polynomial extensions.

MSC classification

Primary: 16T20: Ring-theoretic aspects of quantum groups
Secondary: 16P40: Noetherian rings and modules 16S38: Rings arising from non-commutative algebraic geometry 17B37: Quantum groups (quantized enveloping algebras) and related deformations 20G42: Quantum groups (quantized function algebras) and their representations
Type
Research Article
Information
Glasgow Mathematical Journal , Volume 63 , Issue 3 , September 2021 , pp. 515 - 525
Copyright
© The Author(s), 2020. Published by Cambridge University Press on behalf of Glasgow Mathematical Journal Trust

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References

Bruns, W. and Vetter, U., Determinantal rings , Lecture notes in Mathematics, vol. 1327 (Springer-Verlag, Berlin, 1988).Google Scholar
Goodearl, K. R. and Lenagan, T. H., Quantum determinantal ideals, Duke Math. J. 103 (2000), 165190.CrossRefGoogle Scholar
Goodearl, K. R. and Lenagan, T. H., Prime ideals invariant under winding automorphisms in quantum matrices, Int. J. Math. 13 (2002), 497532.CrossRefGoogle Scholar
Kelly, A. C., Lenagan, T. H. and Rigal, L., Ring theoretic properties of quantum grassmannians, J. Algebra Appl. 3 (2004), 930.CrossRefGoogle Scholar
Krause, G. R. and Lenagan, T. H., Growth of algebras and Gelfand–Kirillov dimension, Graduate Studies in Mathematics, vol. 22, Revised edition (American Mathematical Society, Providence, RI, 2000).Google Scholar
Lenagan, T. H. and Rigal, L., The maximal order property for quantum determinantal rings, Proc. Edin. Math. Soc. 46 (2003), 513529.CrossRefGoogle Scholar
Lenagan, T. H. and Rigal, L., Quantum graded algebras with a straightening law and the AS–Cohen–Macaulay property for quantum determinantal rings and quantum grassmannians, J. Algebra 301 (2006), 670702.CrossRefGoogle Scholar
Lenagan, T. H. and Rigal, L., Quantum analogues of Schubert varieties in the grassmannian, Glasgow Math. J. 50 (2008), 5570.CrossRefGoogle Scholar
Maury, G. and Raynaud, J., Ordres maximaux au sens de K. Asano , Lecture Notes in Mathematics, vol. 808 (Springer-Verlag, Berlin, 1980).Google Scholar
Parshall, B. and Wang, J.-P., Quantum linear groups, Mem. Amer. Math. Soc. 89(439) (1991), vi+157pp.Google Scholar