Homepage
of Nicolas Guay
I am an algebraist with
interests in representation theory, Lie algebras, quantum groups,
symplectic reflection algebras, Cherednik algebras and Hecke algebras.
E-mail:
nguay arobas ualberta dot ca
Telephone: +1-780-492-3001, office:
CAB 665
Mailing
address: University
of Alberta
Department of
Mathematical and Statistical Sciences
CAB
632
Edmonton, AB
T6G 2G1
Canada.
CV (pdf)
Abstracts
of papers
Publications
and preprints:
- Quantum superalgebras of type P, with Patrick Conner and Dimitar Grantcharov, in preparation.
- Twisted Yangians, twisted quantum loop algebras and affine Hecke algebras of type BC, with Xiaoguang Ma, submitted. pdf
- From quantum loop algebras to Yangians, with Xiaoguang Ma, to appear in Journal of the London Mathematical Society. pdf
- Twisted
affine Lie superalgebra of type Q and quantization of its enveloping
superalgebra, with Hongjia Chen, to appear in Mathematische Zeitschrift. pdf
- Central extensions of matrix Lie
superalgebras over Z/2Z-graded algebras, with Hongjia Chen, to appear in Algebras and Representation Theory. pdf
- Quantum algebras and
symplectic reflection algebras for wreath products, Representation Theory, 14 (2010), pp.148-200. pdf
- Double affine Lie algebras and finite
groups, with D. Hernandez and S. Loktev, Pacific Journal of
Mathematics, 243 (2009), no.1,
pp.1-41. pdf
- Quantum
algebras and quivers, Selecta
Mathematica, 14
(2009), no. 3-4, pp. 667-700. pdf
- Affine
Yangians and deformed double
current algebras,
Advances in Mathematics, 211 (2007), no. 2, pp.
436-484. pdf
- Cherednik
algebras and Yangians,
International Mathematics Research Notices, 2005 no.57, pp. 3551-3593. pdf
- On
the category O for rational
Cherednik
algebras, with V. Ginzburg,
E. Opdam and R. Rouquier,
Inventiones mathematicae, 154 no 3 (December 2003), pp.
617-651. pdf
- Projective modules in
the category O for the Cherednik algebra, Journal of Pure
and
Applied Algebra, 182
(2003), pp. 209-221. pdf.
- Embeddings of
symmetric varieties,
Transformation Groups, volume 6, no 4 (2001), pp. 333-352. pdf
MATH 228 - Introduction to Ring Theory: see e-class.
To
Department
of Mathematical and Statistical Sciences
homepage