Add to ORKGOrdinary representation theory has been widely researched to the extent that there is a well-understood method for constructing the ordinary irreducible characters of a finite group. In parallel, John McKay showed how to associate to a finite group a graph constructed from the group\u27s irreducible representations. In this project, we prove a structure theorem for the McKay graphs of products of groups as well as develop formulas for the graphs of two infinite families of groups. We then study the modular representations of these families and give conjectures for a modular version of the McKay graphs
Modern computers and computer algebra systems yield powerful tools for mathematicalresearch. In this...
I have studied representation theory of finite groups, in particular of the symmetric group over fie...
The main problem of representation theory of finite groups is to find proofs of several conjectures ...
Given a finite group $G$ and its representation $\rho$, the corresponding McKay graph is a graph $\G...
AbstractA central problem in the representation theory of finite groups is, given a prime p, the stu...
The McKay correspondence is an interesting connection between many different areas of mathematics. T...
The Representation Theory of Finite Groups is a thriving subject, with many fascinating and deep ope...
McKay's original observation on characters of odd degrees of finite groups is reduced to almost simp...
This thesis solves the following question posed by Etingof, Rowell, and Witherspoon: Are the images ...
In this paper we prove an analogue of the McKay correspondence for Landau-Ginzburg models. Our proof...
AbstractLet G be a finite group. It is easy to compute the character of G corresponding to a given c...
AbstractIt is shown that a collection of vertex two-colorable graphs with certain degree restriction...
ABSTRACT: The McKay conjecture asserts that for every finite group G and every prime p, the number o...
AbstractChain spaces for a Cohen-Macaulay complex split into subspaces corresponding to cycles for t...
We refine the reduction theorem for the McKay Conjecture proved by Isaacs, Malle and Navarro. Assumi...
Modern computers and computer algebra systems yield powerful tools for mathematicalresearch. In this...
I have studied representation theory of finite groups, in particular of the symmetric group over fie...
The main problem of representation theory of finite groups is to find proofs of several conjectures ...
Given a finite group $G$ and its representation $\rho$, the corresponding McKay graph is a graph $\G...
AbstractA central problem in the representation theory of finite groups is, given a prime p, the stu...
The McKay correspondence is an interesting connection between many different areas of mathematics. T...
The Representation Theory of Finite Groups is a thriving subject, with many fascinating and deep ope...
McKay's original observation on characters of odd degrees of finite groups is reduced to almost simp...
This thesis solves the following question posed by Etingof, Rowell, and Witherspoon: Are the images ...
In this paper we prove an analogue of the McKay correspondence for Landau-Ginzburg models. Our proof...
AbstractLet G be a finite group. It is easy to compute the character of G corresponding to a given c...
AbstractIt is shown that a collection of vertex two-colorable graphs with certain degree restriction...
ABSTRACT: The McKay conjecture asserts that for every finite group G and every prime p, the number o...
AbstractChain spaces for a Cohen-Macaulay complex split into subspaces corresponding to cycles for t...
We refine the reduction theorem for the McKay Conjecture proved by Isaacs, Malle and Navarro. Assumi...
Modern computers and computer algebra systems yield powerful tools for mathematicalresearch. In this...
I have studied representation theory of finite groups, in particular of the symmetric group over fie...
The main problem of representation theory of finite groups is to find proofs of several conjectures ...