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Topology of intersections of Schubert cells and Hecke algebra

✍ Scribed by Boris Shapiro; Michael Shapiro; Alek Vainshtein

Publisher
Elsevier Science
Year
1996
Tongue
English
Weight
760 KB
Volume
153
Category
Article
ISSN
0012-365X

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✦ Synopsis

We consider intersections of Schubert cells ~. ~ and tr~tr-[3. ~ in the space of complete flags F = SL/~, where ~ denotes the Borel subgroup of upper triangular matrices, while ct, /~ and tr belong to the Weyl group W (coinciding with the symmetric group). We obtain a special decomposition of F which subdivides all ~at • ~ N a~a-~ • ~ into strata of a simple form. It enables us to establish a new geometrical interpretation of the structure constants for the corresponding Hecke algebra and in particular of the so-called R-polynomials used in Kazhdan-Lusztig theory. Structure constants of the Hecke algebra appear to be the alternating sums of the Hodge numbers for the mixed Hodge structure in the cohomology with compact supports of the above intersections. We derive a new efficient combinatorial algorithm calculating the R-polynomials and structure constants in general.

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Hecke Algebras and Semisimplicity of Mon
Hecke Algebras and Semisimplicity of Monoid Algebras
✍ Mohan S Putcha 📂 Article 📅 1999 🏛 Elsevier Science 🌐 English ⚖ 140 KB

We begin by constructing Hecke algebras for arbitrary finite regular monoids M. We then show that the semisimplicity of the complex monoid algebra ‫ރ‬ M is equivalent to the semisimplicity of the associated Hecke algebras and a condition on induced group characters. We apply these results to finite