Email:goodman at math dot uiowa dot eduPaper Mail:Fred Goodman Department of Mathematics MLH The University of Iowa Iowa City, IA 52242-1419 USAPhone:Voice: 319-335-0791 Fax: 319-335-0627Office:325G Maclean Hall |
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banff pictures 2006 (web page)
Courses from previous semesters: Click Here.
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Algebra Text:Algebra: Abstract and Concrete Edition 2.5, available for download. |
F.M. Goodman, Cellularity of Cyclotomic Birman--Wenzl--Murakami algebras, J. Algebra, in press; preprint version: arXiv:0801.0306.
F.M. Goodman and Holly Hauschild Mosley, Cyclotomic Birman-Wenzl-Murakami algebras I: Freeness
and realization as tangle algebras, to appear in J. Knot Theory and Ramifications; preprint version: math.QA/0612064.
F.M. Goodman and Holly Hauschild Mosley, Cyclotomic Birman-Wenzl-Murakami algebras II: Admissibility relations and freeness, preprint (2007, REVISED), math archive math.QA/0612065.
F. M. Goodman and H. Hauschild, Affine Birman-Wenzl-Murakami algebras and tangles in the solid torus, Fundamenta Mathematicae, 190 (2006), 77-137; preprint version: math.QA/0411155.
F. M. Goodman , Zn--graded independence, Indiana University Mathematics Journal,
53 (2004), 515-532; preprint version: math.OA/0206296.
Philippe Biane, F. M. Goodman, and Alexandru Nica, Non-crossing cumulants of type B, Trans. Am. Math. Soc., 355 (2003), 2263-2303; preprint version: math.OA/0206167.
F. M. Goodman and Hans Wenzl, Ideals in the Temperley-Lieb Category, an appendix to Michael Freedman, A magnetic model with a possible Chern-Simons phase, Comm. Math. Phys., 234 (2003) pp 129-183; preprint version: math.QA/0206301.
F. M. Goodman and Hans Wenzl, A path algorithm for affine Kazhdan-Lusztig polynomials, Math. Z. 237 (2001), no. 2, 235--249; preprint version: math.RT/0011245.
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Publication List:
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Notes from lectures in mathematical physics seminar, fall 1998, on "Fock space and Kazhdan-Lusztig polynomials."
