CFT, String Theory and Moonshine by Prof. Kishore Marathe City University of New York, Brooklyn College International Fall Workshop on Geometry and Physics

Source URL: gigda.ugr.es

• Group theory
• Sporadic groups
• Analytic number theory
• Modular forms
• Moonshine theory
• Monstrous moonshine
• Monster Lie algebra
• Simple group
• String theory
• Finite group
• Classification of finite simple groups
• Representation theory

MATH 669: COMBINATORICS, GEOMETRY AND COMPLEXITY OF INTEGER POINTS Alexander Barvinok Abstract. These are rather condensed notes, not really proofread or edited, presenting key definitions and results of the course that

Source URL: www.math.lsa.umich.edu

• Leech lattice
• Moonshine theory
• Lattice
• Spectral theory of ordinary differential equations
• Lambda calculus

MOONSHINE JOHN F. R. DUNCAN, MICHAEL J. GRIFFIN AND KEN ONO Abstract. Monstrous moonshine relates distinguished modular functions to the representation theory of the Monster M. The celebrated observations that (*) 1 = 1

Source URL: web.math.princeton.edu

Replication identities in 2d CFT ELTE, April

Source URL: bodri.elte.hu

• Group theory
• Differential topology
• Orbifold
• Monstrous moonshine
• Modular forms
• Character theory
• Representation theory
• Vertex operator algebra
• Conformal field theory
• Abstract algebra
• Mathematical analysis
• Mathematics

The Rankin LecturesThe numbers 12 and 24 play a central role in mathematics thanks to a series of ‘coincidences’ that is just beginning to be understood. One of the first hints of this fact was Euler’s bizar

Source URL: math.ucr.edu

• Analytic number theory
• Lattice points
• Quadratic forms
• Leech lattice
• Moonshine theory
• 1 + 2 + 3 + 4 + …
• Riemann zeta function
• Modular form
• 24
• Mathematical analysis
• Abstract algebra
• Mathematics

CURRICULUM VITAE OF PAULA TRETKOFF Summary of personal data Name: Paula Tretkoff Professional mailing address: Department of Mathematics, Texas A&M University, College Station, TX[removed], USA. e-mail: ptretkoff@math.

Source URL: www.math.tamu.edu

• Algebraic geometry
• Modular forms
• J-invariant
• Moonshine theory
• Noncommutative geometry
• Number theory
• Shimura variety
• Hypergeometric function
• Transcendental number
• Mathematical analysis
• Mathematics
• Abstract algebra

What is the monster. Richard E. Borcherds, ∗ Mathematics department, Evans Hall #3840, University of California at Berkeley, CA[removed]U. S. A. e-mail: [removed] www home page www.math.berkeley.edu/˜re

Source URL: math.berkeley.edu

• Moonshine theory
• Group theory
• Sporadic groups
• Nonassociative algebra
• Monstrous moonshine
• Monster Lie algebra
• J-invariant
• Representation theory
• Griess algebra
• Abstract algebra
• Algebra
• Lie algebras

Automorphic forms on Os+2,2 (R)+ and generalized Kac-Moody algebras. Proceedings of the International Congress of Mathematicians, Vol. 1, 2 (Z¨ urich, 1994), 744–752, Birkh¨auser, Basel, 1995. Richard E. Borcherds *

Source URL: math.berkeley.edu

• Lie algebras
• Modular forms
• Elliptic functions
• Moonshine theory
• Q-analogs
• J-invariant
• Monster Lie algebra
• Generalized Kac–Moody algebra
• Representation theory
• Abstract algebra
• Mathematical analysis
• Mathematics

Modular Moonshine II. 24 July 1994, corrected 19 Sept 1995 Duke Math. J[removed]no. 2, [removed]Richard E. Borcherds,∗

Source URL: math.berkeley.edu

• Lie algebras
• Moonshine theory
• Conformal field theory
• Nonassociative algebra
• Vertex operator algebra
• Monstrous moonshine
• Weight
• Monster vertex algebra
• Monster Lie algebra
• Abstract algebra
• Algebra
• Mathematics

Chapter 17 The 24-dimensional odd unimodular lattices. R. E. Borcherds. This chapter completes the classification of the 24-dimensional unimodular lattices by enumerating the odd lattices. These are (essentially) in one-

Source URL: math.berkeley.edu

• Quadratic forms
• Lattice points
• Lie groups
• Moonshine theory
• Sporadic groups
• II25
• 1
• Leech lattice
• Unimodular lattice
• Niemeier lattice
• Algebra
• Abstract algebra
• Mathematics