REFERENCES
- Bao, L., Carbone, L. (2015). Integer forms of Kac–Moody groups and Eisenstein series in low dimensional supergravity theories. Submitted arXiv: 1308.6194.
- Bass, H. (1993). Covering theory for graphs of groups. Journal of Pure and Applied Algebra 89:3–47.
- Bass, H., Lubotzky, A. (2001). Tree Lattices. With appendices by H. Bass, L. Carbone, A. Lubotzky, G. Rosenberg and J. Tits. Progress in Mathematics, Vol. 176. Boston, MA: Birkhaüser Boston, Inc.
- Carbone, L. (2008). Conjecture on the structure of fundamental domains for nonuniform lattices in Kac–Moody groups. In: Presented at the workshop ‘DIAMANT meets GQT’, Lorentz Center, Leiden, Netherlands, October 2008, http://www.math.rutgers.edu/carbonel/
- Carbone, L., Cobbs, C. (2011). Infinite descending chains of cocompact lattices in Kac–Moody groups. Journal of Algebra and its Applications 10(6):1–33.
- Carbone, L., Cobbs, C., Murray, S. (2011). Fundamental domains for congruence subgroups of SL2 in positive characteristic. Journal of Algebra 325:431–439.
- Carbone, L., Ershov, M., Ritter, G. (2008). Abstract simplicity of complete Kac–Moody groups over finite fields. Journal of Pure and Applied Algebra 212: 2147–2162.
- Carbone, L., Garland, H. (2003). Existence of lattices in Kac–Moody groups over finite fields. Communications in Contemporary Math. 5(5):813–867.
- Carbone, L., Garland, H., Gourevich, D., Liu, D. (2015). Eisenstein series on rank 2 Kac–Moody groups over finite fields. Preprint.
- Carbone, L., Lee, K.-H., Liu, D. (2015). Eisenstein series on rank 2 hyperbolic Kac–Moody groups over ℝ. To appear in Math. Annalen, arXiv:1306.3280.
- Garland, H. On extending the Langlands-Shahidi method to arithmetic quotients of loop groups. http://arxiv.org/pdf/1009.4507
- Kac, V., Peterson, D. (1985). Defining Relations of Certain Infinite-Dimensional Groups. Astérisque Numéro Hors Série, pp. 165–208.
- Lubotzky, A. (1999). Lattices of minimial covolume in SL2. Journal of the Amer. Math. Society 78:961–975.
- Rémy, B. (2002). Groupes de Kac–Moody déployés et presque déployés. (French) [Split and almost split Kac–Moody groups], Astérisque No. 277, pp. viii+ 348.
- Ronan, M. (2009). Lectures on Buildings, Updated and Revised, Chicago: University of Chicago Press.
- Serre, J. P. (1980). Trees. Translated from the French by John Stillwell. Berlin-New York: Springer-Verlag, pp. ix+ 142.
- Tits, J. (1980–1981). Resume de Cours - Theorie des Groupes. Annuaire du College de France, pp. 75–87.
- Tits, J. (1987). Uniqueness and presentation of Kac–Moody groups over fields. Journal of Algebra 105:542–573.