On the Sn-module structure of the noncommutative harmonics

Noncommutative symmetric functions and Lagrange inversion

Novelli, Jean-Christophe
Thibon, Jean-Yves

January 2008

AbstractWe compute the non-commutative Frobenius characteristic of the natural action of the 0-Hecke...

A Conjecture of Procesi and a New Basis for the Decomposition of the Graded Left Regular Representation of Sn

Allen, E.E.

August 1993

AbstractLet R=Q[x1,x2 ,...,xn] be the ring of polynomials in the variables x1,x2,...xn and let R* de...

A Conjecture of Procesi and a New Basis for the Decomposition of the Graded Left Regular Representation of Sn

Allen, E.E.

August 1993

AbstractLet R=Q[x1,x2 ,...,xn] be the ring of polynomials in the variables x1,x2,...xn and let R* de...

On the Sn-module structure of the noncommutative harmonics

Briand, Emmanuel
Rosas, Mercedes
Zabrocki, Mike

August 2008

AbstractUsing a noncommutative analog of Chevalley's decomposition of polynomials into symmetric pol...

On the Sn-module structure of the noncommutative harmonics

Briand, Emmanuel
Rosas Celis, Mercedes Helena
Zabrocki, Mike

August 2008

Using the a noncommutative version of Chevalley’s theorem due to Bergeron, Reutenauer, Rosas, and Za...

Invariants and coinvariants of the symmetric group in noncommuting variables

Bergeron, Nantel
Reutenauer, Christophe
Rosas Celis, Mercedes Helena
Zabrocki, Mike

January 2008

We introduce a natural Hopf algebra structure on the space of noncommutative symmetric functions. Th...

Invariant and Coinvariant Spaces for the Algebra of Symmetric Polynomials in Non-Commuting Variables

Bergeron, Francois
Lauve, Aaron

December 2010

We analyze the structure of the algebra K⟨x⟩Sn of symmetric polynomials in non-commuting variables i...

Invariant and coinvariant spaces for the algebra of symmetric polynomials in non-commuting variables

Bergeron, François
Lauve, Aaron

January 2008

We analyze the structure of the algebra $\mathbb{K}\langle \mathbf{x}\rangle^{\mathfrak{S}_n}$ of sy...

Invariant and Coinvariant Spaces for the Algebra of Symmetric Polynomials in Non-Commuting Variables

Bergeron, Francois
Lauve, Aaron

December 2010

We analyze the structure of the algebra K⟨x⟩Sn of symmetric polynomials in non-commuting variables i...

Noncommutative algebra and geometry

De Concini, Corrado
Van Oystaeyen, Freddy
Vavilov, Nikolai

January 2005

Finite Galois Stable Subgroups of Gln. Derived Categories for Nodal Rings and Projective Configurati...

A combinatorial formula for the character of the diagonal convariants

Haglund, J
Haiman, M
Loehr, N
Remmel, J B
Ulyanov, A

February 2005

Let Rn be the ring of coinvariants for the diagonal action of the symmetric group Sn. It is known t...

Multiple Left Regular Representations Generated by Alternants

Bergeron, François
Garsia, Adriano
Tesler, Glenn

July 2000

AbstractLet p1>…>pn⩾0, and Δp=det‖xpji‖ni, j=1. Let Mp be the linear span of the partial derivatives...

Noncommutative plurisubharmonic polynomials part I: Global assumptions

Greene, Jeremy M.
Helton, J. William
Vinnikov, Victor

December 2011

AbstractWe consider symmetric polynomials, p, in the noncommutative (nc) free variables {x1,x2,…,xg}...

EXTENDING THE PARKING SPACE

Andrew Berget
Brendon Rhoades

August 2016

Abstract. The action of the symmetric group Sn on the set Parkn of parking functions of size n has r...

The Algebra of Multiple Harmonic Series

Hoffman, Michael E.

August 1997

AbstractRecently there has been much interest in multiple harmonic seriesζ(i1,i2,…,ik)=∑n1>n2>···>nk...

Noncommutative symmetric functions and Lagrange inversion

Novelli, Jean-Christophe
Thibon, Jean-Yves

January 2008

AbstractWe compute the non-commutative Frobenius characteristic of the natural action of the 0-Hecke...

A Conjecture of Procesi and a New Basis for the Decomposition of the Graded Left Regular Representation of Sn

Allen, E.E.

August 1993

AbstractLet R=Q[x1,x2 ,...,xn] be the ring of polynomials in the variables x1,x2,...xn and let R* de...

A Conjecture of Procesi and a New Basis for the Decomposition of the Graded Left Regular Representation of Sn

Allen, E.E.

August 1993

AbstractLet R=Q[x1,x2 ,...,xn] be the ring of polynomials in the variables x1,x2,...xn and let R* de...

On the Sn-module structure of the noncommutative harmonics

Briand, Emmanuel
Rosas, Mercedes
Zabrocki, Mike

August 2008

AbstractUsing a noncommutative analog of Chevalley's decomposition of polynomials into symmetric pol...

On the Sn-module structure of the noncommutative harmonics

Briand, Emmanuel
Rosas Celis, Mercedes Helena
Zabrocki, Mike

August 2008

Using the a noncommutative version of Chevalley’s theorem due to Bergeron, Reutenauer, Rosas, and Za...

Invariants and coinvariants of the symmetric group in noncommuting variables

Bergeron, Nantel
Reutenauer, Christophe
Rosas Celis, Mercedes Helena
Zabrocki, Mike

January 2008

We introduce a natural Hopf algebra structure on the space of noncommutative symmetric functions. Th...

Invariant and Coinvariant Spaces for the Algebra of Symmetric Polynomials in Non-Commuting Variables

Bergeron, Francois
Lauve, Aaron

December 2010

We analyze the structure of the algebra K⟨x⟩Sn of symmetric polynomials in non-commuting variables i...

Invariant and coinvariant spaces for the algebra of symmetric polynomials in non-commuting variables

Bergeron, François
Lauve, Aaron

January 2008

We analyze the structure of the algebra $\mathbb{K}\langle \mathbf{x}\rangle^{\mathfrak{S}_n}$ of sy...

Invariant and Coinvariant Spaces for the Algebra of Symmetric Polynomials in Non-Commuting Variables

Bergeron, Francois
Lauve, Aaron

December 2010

We analyze the structure of the algebra K⟨x⟩Sn of symmetric polynomials in non-commuting variables i...

Noncommutative algebra and geometry

De Concini, Corrado
Van Oystaeyen, Freddy
Vavilov, Nikolai

January 2005

Finite Galois Stable Subgroups of Gln. Derived Categories for Nodal Rings and Projective Configurati...

A combinatorial formula for the character of the diagonal convariants

Haglund, J
Haiman, M
Loehr, N
Remmel, J B
Ulyanov, A

February 2005

Let Rn be the ring of coinvariants for the diagonal action of the symmetric group Sn. It is known t...

Multiple Left Regular Representations Generated by Alternants

Bergeron, François
Garsia, Adriano
Tesler, Glenn

July 2000

AbstractLet p1>…>pn⩾0, and Δp=det‖xpji‖ni, j=1. Let Mp be the linear span of the partial derivatives...

Noncommutative plurisubharmonic polynomials part I: Global assumptions

Greene, Jeremy M.
Helton, J. William
Vinnikov, Victor

December 2011

AbstractWe consider symmetric polynomials, p, in the noncommutative (nc) free variables {x1,x2,…,xg}...

EXTENDING THE PARKING SPACE

Andrew Berget
Brendon Rhoades

August 2016

Abstract. The action of the symmetric group Sn on the set Parkn of parking functions of size n has r...

The Algebra of Multiple Harmonic Series

Hoffman, Michael E.

August 1997

AbstractRecently there has been much interest in multiple harmonic seriesζ(i1,i2,…,ik)=∑n1>n2>···>nk...

Noncommutative symmetric functions and Lagrange inversion

Novelli, Jean-Christophe
Thibon, Jean-Yves

January 2008

AbstractWe compute the non-commutative Frobenius characteristic of the natural action of the 0-Hecke...

A Conjecture of Procesi and a New Basis for the Decomposition of the Graded Left Regular Representation of Sn

Allen, E.E.

August 1993

AbstractLet R=Q[x1,x2 ,...,xn] be the ring of polynomials in the variables x1,x2,...xn and let R* de...

A Conjecture of Procesi and a New Basis for the Decomposition of the Graded Left Regular Representation of Sn

Allen, E.E.

August 1993

AbstractLet R=Q[x1,x2 ,...,xn] be the ring of polynomials in the variables x1,x2,...xn and let R* de...

On the Sn-module structure of the noncommutative harmonics

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On the Sn-module structure of the noncommutative harmonics

Abstract

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