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Weyl group multiple Dirichlet Series: Type A Combinatorial Theory
Ben Brubaker
, Daniel Bump, Solomon Friedberg
School of Mathematics
Research output
:
Book/Report
›
Book
33
Scopus citations
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Dive into the research topics of 'Weyl group multiple Dirichlet Series: Type A Combinatorial Theory'. Together they form a unique fingerprint.
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Keyphrases
Weyl Group multiple Dirichlet Series
100%
Series Type
100%
Combinatorial Theory
100%
Functional Equation
50%
Dirichlet Series
50%
Riemann zeta Function
50%
Combinatorics
25%
Sum-product
25%
Analytic Continuation
25%
Weyl Group
25%
Polytope
25%
Eisenstein Series
25%
Functions of Several Complex Variables
25%
Roots of Unity
25%
Euler Product
25%
Analytic number Theory
25%
Metaplectic Group
25%
Yang-Baxter Equation
25%
Analytic Properties
25%
Analytic Functional
25%
Lattice Points
25%
Cartan Type
25%
Gauss Sums
25%
Crystal Deformation
25%
Kashiwara Crystals
25%
Irreducible Representation
25%
Whittaker Equation
25%
Weyl Character Formula
25%
Representations of Lie Groups
25%
Mathematics
Dirichlet Series
100%
Functional Equation
33%
Riemann Zeta Function
33%
Combinatorics
16%
Analytic Continuation
16%
Multiplicative
16%
Eisenstein Series
16%
Several Complex Variables
16%
Polytope
16%
Irreducible Representation
16%
Yang-Baxter Equation
16%
Gauss Sums
16%
Lattice Point
16%
Analytic Number Theory
16%
Lie Group
16%