Access the full text.
Sign up today, get DeepDyve free for 14 days.
B Feigin, E Feigin, M Jimbo, T Miwa, E Mukhin (2011)
Quantum continuous $$\mathfrak{gl}_{\infty }$$ gl ∞ : tensor products of Fock modules and $${\cal {W}}_n$$ W n -charactersKyoto J. Math., 51
J. Green (1995)
Hall algebras, hereditary algebras and quantum groupsInventiones mathematicae, 120
T Bridgeland (2013)
Quantum groups via Hall algebras of complexesAnn. Math. (2), 177
B Feigin, K Hashizume, A Hoshino, J Shiraishi, S Yanagida (2009)
A commutative algebra on degenerate $${\mathbb{C}}{\mathbb{P}}^{1}$$ C P 1 and Macdonald polynomialsJ. Math. Phys., 50
O. Schiffmann, E. Vasserot (2012)
Cherednik algebras, W-algebras and the equivariant cohomology of the moduli space of instantons on A2Publications mathématiques de l'IHÉS, 118
O Schiffmann, E Vasserot (2013)
Cherednik algebras, W algebras and the equivariant cohomology of the moduli space of instantons on $${\mathbb{A}}^2$$ A 2Publ. Math. Inst. Hautes Études Sci., 118
D Huybrechts (2006)
Fourier-Mukai Transforms in Algebraic Geometry, Oxford Mathematical Monographs
I. Burban, O. Schiffmann (2005)
On the Hall algebra of an elliptic curve, IDuke Mathematical Journal, 161
B. Feigin, A. Tsymbaliuk (2009)
Equivariant K-theory of Hilbert schemes via shuffle algebraJournal of Mathematics of Kyoto University, 51
(2007)
A (q, γ ) algebra
C. Ringel (1990)
Hall algebras and quantum groupsInventiones mathematicae, 101
M. Gorsky (2013)
Semi-derived Hall algebras and tilting invariance of Bridgeland-Hall algebrasarXiv: Quantum Algebra
B. Feigin, E. Feigin, M. Jimbo, T. Miwa, E. Mukhin (2011)
Quantum continuous gl ∞ : Tensor products of Fock modules and W n -characters
K Miki (2007)
A $$(q,\gamma )$$ ( q , γ ) algebraJ. Math. Phys., 48
B. Feigin, K. Hashizume, A. Hoshino, J. Shiraishi, S. Yanagida (2009)
A commutative algebra on degenerate CP^1 and Macdonald polynomialsarXiv: Combinatorics
J. Xiao (1997)
Drinfeld Double and Ringel–Green Theory of Hall AlgebrasJournal of Algebra, 190
T. Cramer (2008)
Double Hall algebras and derived equivalencesarXiv: Quantum Algebra
O Schiffmann, E Vasserot (2013)
The elliptic Hall algebra and the equivariant K-theory of the Hilbert scheme of $${\mathbb{A}}^2$$ A 2Duke Math. J., 162
T. Bridgeland (2011)
Quantum groups via Hall algebras of complexesarXiv: Quantum Algebra
B Feigin, A Tsymbaliuk (2011)
Equivariant $$K$$ K -theory of Hilbert schemes via shuffle algebraKyoto J. Math., 51
L. Keldysh (2006)
Fourier-Mukai Transforms in Algebraic Geometry
J. Weiss (2016)
Quantum Groups And Their Primitive Ideals
O. Schiffmann (2006)
LECTURES ON HALL ALGEBRASarXiv: Representation Theory
We show that the Hall algebra of two-periodic complexes, which is recently introduced by T. Bridgeland, coincides with the Drinfeld double of the ordinary Hall bialgebra.
Mathematische Zeitschrift – Springer Journals
Published: Nov 4, 2015
Read and print from thousands of top scholarly journals.
Already have an account? Log in
Bookmark this article. You can see your Bookmarks on your DeepDyve Library.
To save an article, log in first, or sign up for a DeepDyve account if you don’t already have one.
Copy and paste the desired citation format or use the link below to download a file formatted for EndNote
Access the full text.
Sign up today, get DeepDyve free for 14 days.
All DeepDyve websites use cookies to improve your online experience. They were placed on your computer when you launched this website. You can change your cookie settings through your browser.