On compositions with $x^2/(1-x)$
HTML articles powered by AMS MathViewer
- by Hans-Christian Herbig, Daniel Herden and Christopher Seaton PDF
- Proc. Amer. Math. Soc. 143 (2015), 4583-4596 Request permission
Abstract:
In the past, empirical evidence has been presented that Hilbert series of symplectic quotients of unitary representations obey a certain universal system of infinitely many constraints. Formal series with this property have been called symplectic. Here we show that a formal power series is symplectic if and only if it is a formal composite with the formal power series $x^2/(1-x)$. Hence the set of symplectic power series forms a subalgebra of the algebra of formal power series. The subalgebra property is translated into an identity for the coefficients of the even Euler polynomials, which can be interpreted as a cubic identity for the Bernoulli numbers. Furthermore we show that a rational power series is symplectic if and only if it is invariant under the idempotent Möbius transformation $x\mapsto x/(x-1)$. It follows that the Hilbert series of a graded Cohen-Macaulay algebra $A$ is symplectic if and only if $A$ is Gorenstein with its a-invariant and its Krull dimension adding up to zero. It is shown that this is the case for algebras of regular functions on symplectic quotients of unitary representations of tori.References
- Tom M. Apostol, Mathematical analysis, 2nd ed., Addison-Wesley Publishing Co., Reading, Mass.-London-Don Mills, Ont., 1974. MR 0344384
- Winfried Bruns and Jürgen Herzog, Cohen-Macaulay rings, Cambridge Studies in Advanced Mathematics, vol. 39, Cambridge University Press, Cambridge, 1993. MR 1251956
- Harm Derksen and Gregor Kemper, Computational invariant theory, Invariant Theory and Algebraic Transformation Groups, I, Springer-Verlag, Berlin, 2002. Encyclopaedia of Mathematical Sciences, 130. MR 1918599, DOI 10.1007/978-3-662-04958-7
- Arthur Erdélyi, Wilhelm Magnus, Fritz Oberhettinger, and Francesco G. Tricomi, Higher transcendental functions. Vols. I, II, McGraw-Hill Book Co., Inc., New York-Toronto-London, 1953. Based, in part, on notes left by Harry Bateman. MR 0058756
- Carla Farsi, Hans-Christian Herbig, and Christopher Seaton, On orbifold criteria for symplectic toric quotients, SIGMA Symmetry Integrability Geom. Methods Appl. 9 (2013), Paper 032, 33. MR 3056176, DOI 10.3842/SIGMA.2013.032
- Ira M. Gessel, Applications of the classical umbral calculus, Algebra Universalis 49 (2003), no. 4, 397–434. Dedicated to the memory of Gian-Carlo Rota. MR 2022347, DOI 10.1007/s00012-003-1813-5
- Hans-Christian Herbig, Srikanth B. Iyengar, and Markus J. Pflaum, On the existence of star products on quotient spaces of linear Hamiltonian torus actions, Lett. Math. Phys. 89 (2009), no. 2, 101–113. MR 2534878, DOI 10.1007/s11005-009-0331-6
- Hans-Christian Herbig and Christopher Seaton, The Hilbert series of a linear symplectic circle quotient, Exp. Math. 23 (2014), no. 1, 46–65. MR 3177456, DOI 10.1080/10586458.2013.863745
- Th. Molien, Über die Invarianten der linearen Substitutionsgruppen, Sitzungsber. der Königl. Preuss. Akad. d. Wiss. zweiter Halbband (1897), 1152–1156.
- Reyer Sjamaar and Eugene Lerman, Stratified symplectic spaces and reduction, Ann. of Math. (2) 134 (1991), no. 2, 375–422. MR 1127479, DOI 10.2307/2944350
- N. J. A. Sloane, Online Encyclopaedia of Integer Sequences, https://oeis.org (cited February 2014).
- Richard P. Stanley, Hilbert functions of graded algebras, Advances in Math. 28 (1978), no. 1, 57–83. MR 485835, DOI 10.1016/0001-8708(78)90045-2
- Richard P. Stanley, Invariants of finite groups and their applications to combinatorics, Bull. Amer. Math. Soc. (N.S.) 1 (1979), no. 3, 475–511. MR 526968, DOI 10.1090/S0273-0979-1979-14597-X
- Bernd Sturmfels, Algorithms in invariant theory, Texts and Monographs in Symbolic Computation, Springer-Verlag, Vienna, 1993. MR 1255980, DOI 10.1007/978-3-7091-4368-1
- I. R. Shafarevich (ed.), Algebraic geometry. IV, Encyclopaedia of Mathematical Sciences, vol. 55, Springer-Verlag, Berlin, 1994. Linear algebraic groups. Invariant theory; A translation of Algebraic geometry. 4 (Russian), Akad. Nauk SSSR Vsesoyuz. Inst. Nauchn. i Tekhn. Inform., Moscow, 1989 [ MR1100483 (91k:14001)]; Translation edited by A. N. Parshin and I. R. Shafarevich. MR 1309681, DOI 10.1007/978-3-662-03073-8
- Keiichi Watanabe, Certain invariant subrings are Gorenstein. I, Osaka J. Math. 11 (1974), 1–8.
- Keiichi Watanabe, Certain invariant subrings are Gorenstein. II, Osaka J. Math. 11 (1974), 379–388.
- Wolfram Research, Mathematica edition: Version 7.0, (2008), http://www.wolfram.com /mathematica/.
Additional Information
- Hans-Christian Herbig
- Affiliation: Departamento de Matemática Aplicada, Universidade Federal do Rio de Janeiro, Av. Athos da Silveira Ramos 149, Centro de Tecnologia - Bloco C, CEP: 21941-909, Rio de Janeiro, Brazil
- Email: herbig@labma.ufrj.br
- Daniel Herden
- Affiliation: Department of Mathematics, Baylor University, One Bear Place #97328, Waco, Texas 76798-7328
- MR Author ID: 810921
- Email: Daniel_Herden@baylor.edu
- Christopher Seaton
- Affiliation: Department of Mathematics and Computer Science, Rhodes College, 2000 N. Parkway, Memphis, Tennessee 38112
- MR Author ID: 788748
- Email: seatonc@rhodes.edu
- Received by editor(s): April 3, 2014
- Published electronically: July 29, 2015
- Additional Notes: The first and second author were supported by the grant GA CR P201/12/G028. The third author was supported by a Rhodes College Faculty Development Grant as well as the E.C. Ellett Professorship in Mathematics.
- Communicated by: Harm Derksen
- © Copyright 2015 American Mathematical Society
- Journal: Proc. Amer. Math. Soc. 143 (2015), 4583-4596
- MSC (2010): Primary 05A15; Secondary 11B68, 13A50, 53D20
- DOI: https://doi.org/10.1090/proc/12806
- MathSciNet review: 3391019