Affine Lie algebras on Riemann surfaces

1. I. Krichever and S. Novikov, “Algebras of Virasoro type, Riemann surfaces and soliton theory,” Funkts. Anal. Prilozhen.,21, No. 2, 46–63 (1987).

   Google Scholar 

2. I. Krichever and S. Novikov, “Algebras of Virasoro type, Riemann surfaces and strings in Minkowski space,” Funkts. Anal. Prilozhen.,21, No. 4, 47–61 (1987).

   Google Scholar 

3. I. Krichever and S. Novikov, “Algebras of Virasoro type, the energy-momentum tensor and operator expansions on Riemann surfaces,” Funkts. Anal. Prilozhen.,23, No. 1, 24–40 (1989).

   Google Scholar 

4. A. Jaffe, S. Klimek, and A. Lesniewsky, Representations of the Heisenberg algebra on a Riemann surface, Harvard University Preprint HUTMP 89/B293 (1989).

5. O. K. Sheinman, “Elliptic affine Lie algebras,” Funkts. Anal. Prilozhen.,24, No. 3, 51–61 (1990).

   Google Scholar 

6. O. K. Sheinman, “Highest weight modules over certain quasigraded Lie algebras on elliptic curves,” Funkts. Anal. Prilozhen.,26, No. 3, 65–71 (1992).

   Google Scholar 

7. I. B. Frenkel, “Orbital theory of affine Lie algebras,” Invent. Math.,77, No. 2, 301–352 (1984).

   Google Scholar 

8. G. Segal, “Unitary representations of some infinite-dimensional groups,” Comm. Math. Phys.,80, No. 3, 301–342 (1981).

   Google Scholar 

9. V. G. Kač and D. H. Peterson, “Affine Lie algebras and Hecke modular forms,” Bull. Am. Math. Soc.,3, No. 3, 1057–1061 (1980).

   Google Scholar 

10. E. Zverovich, “Boundary value problems in the theory of analytic functions in Hölder classes on Riemann surfaces,” Usp. Mat. Nauk,26, No. 1, 113–180 (1971).

    Google Scholar 

11. I. Bernstein, I. Gelfand, and S. Gelfand, “Structure of representations that are generated by vectors of highest weight,” Funkts. Anal. Prilozhen.,5, No. 1, 1–9 (1971).

    Google Scholar 

12. V. Kac, “Infinite-dimensional algebras, Dedekind'sη-functions and the very strange formula,” Adv. Math.,30, 85–136 (1978).

    Google Scholar 

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