Article:Math.AG/9912104/unidentified-references: Difference between revisions
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R. Bezrukavnikov and V. Ginzburg, {\em Hilbert schemes and reductive groups}, in preparation. |
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J. Fogarty, {\em Algebraic families on an algebraic surface}, Amer. J. Math. {\bf 90} (1968) 511--521. |
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I.~B. Frenkel and V.~G. Kac, {\em Basic representations of affine Lie algebras and dual resonance models}, Invent. Math. {\bf 62} (1980) 23--66. |
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A. Garsia and M. Haiman, {\em A graded representation model for Macdonald's polynomials}, Proc. Nat. Acad. USA {\bf 903} (1993) 3607--3610. |
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G.~Gonzalez-Sprinberg and J.-L.~Verdier, {\em Construction g\'eom\'etrique de la correspondance de McKay}, Ann. Sci. \'Ecole Norm. Sup. {\bf 16} (1983) 409--449. |
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L. G\"ottsche, {\em The Betti numbers of the Hilbert scheme of points on a smooth projective surface}, Math. Ann. {\bf 286} (1990) 193--207. |
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I.~Grojnowski, {\em Instantons and affine algebras I: the Hilbert scheme and vertex operators}, Math. Res. Lett. {\bf 3} (1996) 275--291. |
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M. Haiman, {\em Macdonald polynomials and Hilbert schemes}, UCSD preprint. |
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Y. Ito and I. Nakamura, {\em McKay correspondence and Hilbert schemes}, Proc. Japan Acad. Ser. {\bf A 72} (1996) 135--138. |
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M. Kapranov, {\em Chow quotients of Grassmannians}, in Gelfand Seminar {\bf 1} (eds. S.~Gelfand, S.~Gindikin), Adv. in Soviet Math. {\bf 16} (1993) 29--110, Amer. Math. Soc. Providence RI. |
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P.~Kronheimer, {\em The construction of ALE spaces as hyper-K\"ahler quotients}, J. Diff. Geom. {\bf 28} (1989) 665--683. |
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P.~Kronheimer and H.~Nakajima, {\em Yang-Mills instantons on ALE gravitational instantons}, Math. Ann. {\bf 288} (1990) 263--307. % |
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M. Lehn, %{\em Chern classes of tautological sheaves on Hilbert schemes of %points on surfaces}, Invent. Math. {\bf 136} (1999) 157--207. |
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I.~G. Macdonald, {\em Polynomial functors and wreath products}, J. Pure Appl. Alg. {\bf 18} (1980) 173--204. |
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J.~McKay, {\em Graphs, singularities and finite groups}, Proc. Sympos. Pure Math. {\bf 37}, Amer. Math. Soc, Providence, RI (1980) 183--186. |
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H. Nakajima, {\em Instantons on ALE spaces, quiver varieties, and Kac-Moody algebras}, Duke Math. J. {\bf 76} (1994) 365--416. |
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H. Nakajima, {\em Heisenberg algebra and Hilbert schemes of points on projective surfaces}, Ann. Math. {\bf 145} (1997) 379--388. |
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H. Nakajima, {\em Lectures on Hilbert schemes of points on surfaces}, to be published by AMS. |
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H. Nakajima, {\em Quiver varieties and Kac-Moody algebras}, Duke Math. J. {\bf 91} (1998) 515--560. |
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H. Nakajima, {\em Private communications}. |
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I. Nakamura, {\em Hilbert schemes of abelian group orbits}, to appear in J. Alg. Geom. |
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S.-S. Roan, {\em Minimal resolutions of Gorenstein orbifolds in dimension three}. Topology 35 (1996) 489--508. |
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G.~Segal, {\em Unitary representations of some infinite dimensional groups}, Commun. Math. Phys. {\bf 80} (1981) 301--342. |
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G.~Segal, {\em Equivariant K-theory and symmetric products}, 1996 preprint (unpublished). |
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C. Vafa and E. Witten, {\em A strong coupling test of $S$-duality}, Nucl. Phys. {\bf B 431} (1994) 3--77. |
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H. Weyl, {\em The classical groups, their invariants and representations}, Princeton University Press, 1946. |
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A.~Zelevinsky, {\em Representations of finite classical groups. A Hopf algebra approach}, Lect. Notes in Math. {\bf 869}, Springer-Verlag, Berlin-New York, 1981. |
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</pre> |
</pre> |
Latest revision as of 04:14, 17 September 2006
R. Bezrukavnikov and V. Ginzburg, {\em Hilbert schemes and reductive groups}, in preparation. J. Fogarty, {\em Algebraic families on an algebraic surface}, Amer. J. Math. {\bf 90} (1968) 511--521. I.~B. Frenkel and V.~G. Kac, {\em Basic representations of affine Lie algebras and dual resonance models}, Invent. Math. {\bf 62} (1980) 23--66. A. Garsia and M. Haiman, {\em A graded representation model for Macdonald's polynomials}, Proc. Nat. Acad. USA {\bf 903} (1993) 3607--3610. G.~Gonzalez-Sprinberg and J.-L.~Verdier, {\em Construction g\'eom\'etrique de la correspondance de McKay}, Ann. Sci. \'Ecole Norm. Sup. {\bf 16} (1983) 409--449. L. G\"ottsche, {\em The Betti numbers of the Hilbert scheme of points on a smooth projective surface}, Math. Ann. {\bf 286} (1990) 193--207. I.~Grojnowski, {\em Instantons and affine algebras I: the Hilbert scheme and vertex operators}, Math. Res. Lett. {\bf 3} (1996) 275--291. M. Haiman, {\em Macdonald polynomials and Hilbert schemes}, UCSD preprint. Y. Ito and I. Nakamura, {\em McKay correspondence and Hilbert schemes}, Proc. Japan Acad. Ser. {\bf A 72} (1996) 135--138. M. Kapranov, {\em Chow quotients of Grassmannians}, in Gelfand Seminar {\bf 1} (eds. S.~Gelfand, S.~Gindikin), Adv. in Soviet Math. {\bf 16} (1993) 29--110, Amer. Math. Soc. Providence RI. P.~Kronheimer, {\em The construction of ALE spaces as hyper-K\"ahler quotients}, J. Diff. Geom. {\bf 28} (1989) 665--683. P.~Kronheimer and H.~Nakajima, {\em Yang-Mills instantons on ALE gravitational instantons}, Math. Ann. {\bf 288} (1990) 263--307. % M. Lehn, %{\em Chern classes of tautological sheaves on Hilbert schemes of %points on surfaces}, Invent. Math. {\bf 136} (1999) 157--207. I.~G. Macdonald, {\em Polynomial functors and wreath products}, J. Pure Appl. Alg. {\bf 18} (1980) 173--204. J.~McKay, {\em Graphs, singularities and finite groups}, Proc. Sympos. Pure Math. {\bf 37}, Amer. Math. Soc, Providence, RI (1980) 183--186. H. Nakajima, {\em Instantons on ALE spaces, quiver varieties, and Kac-Moody algebras}, Duke Math. J. {\bf 76} (1994) 365--416. H. Nakajima, {\em Heisenberg algebra and Hilbert schemes of points on projective surfaces}, Ann. Math. {\bf 145} (1997) 379--388. H. Nakajima, {\em Lectures on Hilbert schemes of points on surfaces}, to be published by AMS. H. Nakajima, {\em Quiver varieties and Kac-Moody algebras}, Duke Math. J. {\bf 91} (1998) 515--560. H. Nakajima, {\em Private communications}. I. Nakamura, {\em Hilbert schemes of abelian group orbits}, to appear in J. Alg. Geom. S.-S. Roan, {\em Minimal resolutions of Gorenstein orbifolds in dimension three}. Topology 35 (1996) 489--508. G.~Segal, {\em Unitary representations of some infinite dimensional groups}, Commun. Math. Phys. {\bf 80} (1981) 301--342. G.~Segal, {\em Equivariant K-theory and symmetric products}, 1996 preprint (unpublished). C. Vafa and E. Witten, {\em A strong coupling test of $S$-duality}, Nucl. Phys. {\bf B 431} (1994) 3--77. H. Weyl, {\em The classical groups, their invariants and representations}, Princeton University Press, 1946. A.~Zelevinsky, {\em Representations of finite classical groups. A Hopf algebra approach}, Lect. Notes in Math. {\bf 869}, Springer-Verlag, Berlin-New York, 1981.