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Feingold, Alex - Department of Mathematical Sciences, State University of New York at Binghamton
Math 507 Linear Algebra and Matrix Theory Fall 2010 Exam 2 Feingold SHOW ALL NECESSARY WORK FOR EACH PROBLEM
Contemporary Mathematics Subalgebras of Hyperbolic Kac-Moody Algebras
FUSION ALGEBRAS, SYMMETRIC POLYNOMIALS,
Math 304 Linear Algebra Spring 2008 Exam 2 Feingold SHOW ALL NECESSARY WORK FOR EACH PROBLEM
A Hyperbolic Kac-Moody Algebra and the Theory of Siegel Modular Forms of Genus 2...
A New Perspective on the Frenkel-Zhu Fusion Rule Theorem
Math 507 Linear Algebra and Matrix Theory Fall 2010 Exam 1 Feingold (1) (20 Points) Let V = {f : R R | f is differentiable}, so V is a vector space
Math 507 Linear Algebra and Matrix Theory Fall 2010 Exam 3 Feingold SHOW ALL NECESSARY WORK FOR EACH PROBLEM
Math 304 Linear Algebra Spring 2008 Exam 1 Feingold (1) (25 Points) Let LA : R4
Matrix Realizations of Hyperbolic Triangle Groups Elizabeth A. Dwornik
MINIMAL MODEL FUSION RULES FROM 2-GROUPS F"usun Akman
ContemporaryVMathematicsolume 00, 0000 Spinor Construction of the
TYPE A FUSION RULES FROM ELEMENTARY GROUP THEORY
CONSTRUCTIONS OF VERTEX OPERATOR ALGEBRAS Alex J. Feingold
Contemporary Mathematics Fusion Rules for Ane Kac-Moody Algebras
REPRESENTATIONS OF HYPERBOLIC KAC-MOODY ALGEBRAS Alex J. Feingold1
Charter Members Installation
Math 404 Advanced Linear Algebra Spring 2012 Exam 1 Feingold (1) (10 Points) For integer n > 1 let V be the vector space Fn
Math 507 Linear Algebra and Matrix Theory Fall 2010 Exam 1 Feingold (1) (20 Points) Let V = {f : R R | f is differentiable}, so V is a vector space
Math 507 Linear Algebra and Matrix Theory Fall 2010 Exam 2 Feingold SHOW ALL NECESSARY WORK FOR EACH PROBLEM
