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FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS

Year 2007, Volume: 2 Issue: 2, 137 - 188, 01.12.2007

Abstract

We give a combinatorial construction, not involving a presentation, of almost all untwisted affine Kac-Moody algebras modulo their onedimensional centres in terms of signed raising and lowering operators on a certain distributive lattice B. The lattice B is constructed combinatorially as a set of ideals of a “full heap” over the Dynkin diagram, which leads to a kind of categorification of the positive roots for the Kac-Moody algebra. The lattice B is also a crystal in the sense of Kashiwara, and its span affords representations of the associated quantum affine algebra and affine Weyl group. There are analogues of these results for two infinite families of twisted affine Kac-Moody algebras, which we hope to treat more fully elsewhere. By restriction, we obtain combinatorial constructions of the finite dimensional simple Lie algebras over C, except those of types E8, F4 and G2. The Chevalley basis corresponding to an arbitrary orientation of the Dynkin diagram is then represented explicitly by raising and lowering operators. We also obtain combinatorial constructions of the spin modules for Lie algebras of types B and D, which avoid Clifford algebras, and in which the action of Chevalley bases on the canonical bases of the modules may be explicitly calculated.

References

  • J.C. Baez and J. Dolan, CategoriŞcation, Contemp. Math. 230 (1998), 1-36.
  • J. Beck and H. Nakajima, Crystal bases and two-sided cells of quantum affine algebras, Duke Math. J. 123 (2004), 335-402.
  • G. Benkart and T. Roby, Down-up algebras, J. Algebra 209 (1998), 305-344.
  • R.W. Carter, Lie algebras of Şnite and affine type, Cambridge University Press, Cambridge, 2005.
  • V. Diekert and G. Rozenberg (eds.), The book of traces, World ScientiŞc, Sin- gapore, 1995.
  • J.J. Graham, Modular representations of Hecke algebras and related algebras, Ph.D. thesis, University of Sydney, 1995.
  • R.M. Green, Tabular algebras and their asymptotic versions, J. Algebra 252 (2002), 27-64.
  • R.M. Green, On rank functions for heaps, J. Combin. Theory Ser. A 102 (2003), 424.
  • R.M. Green, Standard modules for tabular algebras, Algebr. Represent. Theory (2004), 419-440.
  • M. Hagiwara, Minuscule heaps over Dynkin diagrams of type ˜ A, Electron. J. Combin. 11 (2004).
  • J.E. Humphreys, Introduction to Lie algebras and representation theory, Springer, New York, 1978.
  • V.G. Kac, InŞnite dimensional Lie algebras (third edition), Cambridge Uni- versity Press, Cambridge, UK, 1990.
  • M. Kashiwara, On crystal bases of the q-analogue of universal enveloping al- gebras, Duke Math. J. 63 (1991), 465-516.
  • M.Kashiwara, Crystal bases of modiŞed quantized enveloping algebra, Duke Math. J. 73 (1994), 383-413.
  • M. Khovanov, A categoriŞcation of the Jones polynomial, Duke Math. J. 101 (2000), 359-426. P. Littelmann,
  • A Littlewood−Richardson type rule for symmetrizable Kac−Moody algebras, Invent. Math. 116 (1994), 329-346.
  • P. Littelmann, Paths and root operators in representation theory, Ann. of Math. 142 (1995), 499-525.
  • G. Lusztig, Introduction to quantum groups, Birkh¨auser, Basel, 1993.
  • P. Magyar, Littelmann paths for the basic representation of an affine Lie alge- bra, J. Algebra 305 (2006), 1037-1054.
  • J.R. Stembridge, Minuscule elements of Weyl groups, J. Algebra 235 (2001), 743.
  • G.X. Viennot, Heaps of pieces, I: basic deŞnitions and combinatorial lemmas, Combinatoire ´Enum´erative, ed. G. Labelle and P. Leroux, Springer-Verlag, Berlin, (1986), 321-350.
  • N.J. Wildberger, A combinatorial construction for simply-laced Lie algebras, Adv. Appl. Math. 30 (2003), 385-396.
  • N.J. Wildberger, A combinatorial construction of G, J. Lie Theory 13 (2003), 165.
  • N.J. Wildberger, Minuscule posets from neighbourly graph sequences, Euro- pean J. Combinatorics 24 (2003), 741-757. R.M. Green
  • Department of Mathematics, University of Colorado Campus Box 395 Boulder, CO 80309-0395 USA
  • E-mail: rmg@euclid.colorado.edu
Year 2007, Volume: 2 Issue: 2, 137 - 188, 01.12.2007

Abstract

References

  • J.C. Baez and J. Dolan, CategoriŞcation, Contemp. Math. 230 (1998), 1-36.
  • J. Beck and H. Nakajima, Crystal bases and two-sided cells of quantum affine algebras, Duke Math. J. 123 (2004), 335-402.
  • G. Benkart and T. Roby, Down-up algebras, J. Algebra 209 (1998), 305-344.
  • R.W. Carter, Lie algebras of Şnite and affine type, Cambridge University Press, Cambridge, 2005.
  • V. Diekert and G. Rozenberg (eds.), The book of traces, World ScientiŞc, Sin- gapore, 1995.
  • J.J. Graham, Modular representations of Hecke algebras and related algebras, Ph.D. thesis, University of Sydney, 1995.
  • R.M. Green, Tabular algebras and their asymptotic versions, J. Algebra 252 (2002), 27-64.
  • R.M. Green, On rank functions for heaps, J. Combin. Theory Ser. A 102 (2003), 424.
  • R.M. Green, Standard modules for tabular algebras, Algebr. Represent. Theory (2004), 419-440.
  • M. Hagiwara, Minuscule heaps over Dynkin diagrams of type ˜ A, Electron. J. Combin. 11 (2004).
  • J.E. Humphreys, Introduction to Lie algebras and representation theory, Springer, New York, 1978.
  • V.G. Kac, InŞnite dimensional Lie algebras (third edition), Cambridge Uni- versity Press, Cambridge, UK, 1990.
  • M. Kashiwara, On crystal bases of the q-analogue of universal enveloping al- gebras, Duke Math. J. 63 (1991), 465-516.
  • M.Kashiwara, Crystal bases of modiŞed quantized enveloping algebra, Duke Math. J. 73 (1994), 383-413.
  • M. Khovanov, A categoriŞcation of the Jones polynomial, Duke Math. J. 101 (2000), 359-426. P. Littelmann,
  • A Littlewood−Richardson type rule for symmetrizable Kac−Moody algebras, Invent. Math. 116 (1994), 329-346.
  • P. Littelmann, Paths and root operators in representation theory, Ann. of Math. 142 (1995), 499-525.
  • G. Lusztig, Introduction to quantum groups, Birkh¨auser, Basel, 1993.
  • P. Magyar, Littelmann paths for the basic representation of an affine Lie alge- bra, J. Algebra 305 (2006), 1037-1054.
  • J.R. Stembridge, Minuscule elements of Weyl groups, J. Algebra 235 (2001), 743.
  • G.X. Viennot, Heaps of pieces, I: basic deŞnitions and combinatorial lemmas, Combinatoire ´Enum´erative, ed. G. Labelle and P. Leroux, Springer-Verlag, Berlin, (1986), 321-350.
  • N.J. Wildberger, A combinatorial construction for simply-laced Lie algebras, Adv. Appl. Math. 30 (2003), 385-396.
  • N.J. Wildberger, A combinatorial construction of G, J. Lie Theory 13 (2003), 165.
  • N.J. Wildberger, Minuscule posets from neighbourly graph sequences, Euro- pean J. Combinatorics 24 (2003), 741-757. R.M. Green
  • Department of Mathematics, University of Colorado Campus Box 395 Boulder, CO 80309-0395 USA
  • E-mail: rmg@euclid.colorado.edu
There are 26 citations in total.

Details

Other ID JA48PM37HN
Journal Section Articles
Authors

R. M. Green This is me

Publication Date December 1, 2007
Published in Issue Year 2007 Volume: 2 Issue: 2

Cite

APA Green, R. M. (2007). FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS. International Electronic Journal of Algebra, 2(2), 137-188.
AMA Green RM. FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS. IEJA. December 2007;2(2):137-188.
Chicago Green, R. M. “FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS”. International Electronic Journal of Algebra 2, no. 2 (December 2007): 137-88.
EndNote Green RM (December 1, 2007) FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS. International Electronic Journal of Algebra 2 2 137–188.
IEEE R. M. Green, “FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS”, IEJA, vol. 2, no. 2, pp. 137–188, 2007.
ISNAD Green, R. M. “FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS”. International Electronic Journal of Algebra 2/2 (December 2007), 137-188.
JAMA Green RM. FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS. IEJA. 2007;2:137–188.
MLA Green, R. M. “FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS”. International Electronic Journal of Algebra, vol. 2, no. 2, 2007, pp. 137-88.
Vancouver Green RM. FULL HEAPS AND REPRESENTATIONS OF AFFINE KAC-MOODY ALGEBRAS. IEJA. 2007;2(2):137-88.