Connections between vector-valued and highest weight Jack and Macdonald polynomials

Charles F. Dunkl; Jean-Gabriel Luque; Laura Colmenarejo

arxiv: 1907.04631 · v1 · pith:W2KAOCBYnew · submitted 2019-07-10 · 🧮 math-ph · math.MP· math.RT

Connections between vector-valued and highest weight Jack and Macdonald polynomials

Laura Colmenarejo , Charles F. Dunkl , Jean-Gabriel Luque This is my paper

Pith reviewed 2026-05-24 23:34 UTC · model grok-4.3

classification 🧮 math-ph math.MPmath.RT

keywords Jack polynomialsMacdonald polynomialsvector-valued polynomialsnonsymmetric polynomialsCherednik operatorssymmetric groupHecke algebraquasistaircase partition

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The pith

A projection from vector-valued Jack and Macdonald polynomials to scalar ones commutes with symmetric group or Hecke algebra actions and Cherednik operators under suitable conditions.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper examines conditions under which a projection from vector-valued Jack or Macdonald polynomials to scalar polynomials preserves key algebraic properties. It focuses on cases where this projection commutes with the action of the symmetric group or the Hecke algebra, as well as with the Cherednik operators for which the polynomials are eigenfunctions. Using the representation theory of these groups and algebras, the authors relate singular nonsymmetric Jack and Macdonald polynomials to highest weight symmetric versions. They further investigate the quasistaircase partition in connection with clustering properties of symmetric Jack polynomials.

Core claim

In the framework of the representation theory of the symmetric group and the Hecke algebra, projections from vector-valued Jack and Macdonald polynomials to scalar polynomials commute with the respective group or algebra actions and with the Cherednik operators, thereby relating singular nonsymmetric polynomials to highest weight symmetric ones; the quasistaircase partition is analyzed as a continuation of studies on Bernevig-Haldane clustering conjectures.

What carries the argument

The projection operator from vector-valued to scalar polynomials that commutes with symmetric group or Hecke algebra actions and Cherednik operators.

If this is right

The projection maps eigenfunctions of Cherednik operators to eigenfunctions while preserving symmetry properties.
Singular nonsymmetric polynomials correspond to highest weight symmetric polynomials via the commuting projection.
The quasistaircase partition yields explicit examples satisfying clustering properties for symmetric Jack polynomials.
The same projection technique applies uniformly to both Jack and Macdonald cases under the representation theory setting.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

These commuting projections could reduce the study of certain symmetric polynomials to computations in the vector-valued setting.
The approach may extend naturally to other deformed algebras or root systems where similar Cherednik operators exist.
Connections to physical models relying on Jack polynomial clustering could be tested by checking the projection on explicit low-degree cases.

Load-bearing premise

The representation-theoretic framework of the symmetric group and Hecke algebra suffices to relate singular nonsymmetric Jack and Macdonald polynomials to highest weight symmetric ones without additional assumptions on parameters or partitions.

What would settle it

An explicit partition and parameter value where the projection fails to commute with the Hecke algebra action on a singular nonsymmetric Macdonald polynomial.

read the original abstract

We analyze conditions under which a projection from the vector-valued Jack or Macdonald polynomials to scalar polynomials has useful properties, especially commuting with the actions of the symmetric group or Hecke algebra, respectively, and with the Cherednik operators for which these polynomials are eigenfunctions. In the framework of the representation theory of the symmetric group and the Hecke algebra, we study the relation between singular nonsymmetric Jack and Macdonald polynomials and highest weight symmetric Jack and Macdonald polynomials. Moreover, we study the quasistaircase partition as a continuation of our study on the conjectures of Bernevig and Haldane on clustering properties of symmetric Jack polynomials.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper spells out conditions for projections from vector-valued Jack/Macdonald polynomials to scalar ones that commute with group actions and Cherednik operators, links singular nonsymmetric to highest-weight symmetric versions, and extends clustering work to quasistaircase partitions.

read the letter

The main contribution is the analysis of when those projections commute with the symmetric group or Hecke algebra actions and with the Cherednik operators, plus the representation-theoretic link between singular nonsymmetric Jack and Macdonald polynomials and the highest weight symmetric ones. It also takes the Bernevig-Haldane clustering conjectures one step further by considering quasistaircase partitions. The setup uses the standard eigenfunction property of these polynomials under Cherednik operators, so the commutation conditions slot in cleanly within the existing framework rather than requiring new tools. This organizes some relations that had been treated separately in the literature. The work is incremental but consistent; it continues an established program without claiming a shift in perspective or new methods. The limitation is the narrow scope. Everything stays inside algebraic combinatorics and the theory of these special polynomials, with no sign of wider applications or techniques that would matter outside this corner. The claims rest on the usual parameter regimes for Jack and Macdonald polynomials, and nothing in the abstract suggests hidden restrictions or fitting issues. For someone already working on nonsymmetric versions or clustering properties, the explicit conditions and the quasistaircase extension could save time on checking commutation by hand. It is too specialized for a general reading group, but the approach is honest and matches the cited literature. I would send it to peer review; a referee familiar with Cherednik algebras and these polynomial families can assess the derivations quickly, and the topic is active enough to justify the effort.

Referee Report

0 major / 3 minor

Summary. The manuscript analyzes conditions under which a projection from vector-valued Jack or Macdonald polynomials to scalar polynomials commutes with the actions of the symmetric group (or Hecke algebra) and the Cherednik operators. In the representation theory of these algebras, it relates singular nonsymmetric Jack/Macdonald polynomials to highest-weight symmetric ones. It further studies the quasistaircase partition as a continuation of work on the Bernevig-Haldane conjectures concerning clustering properties of symmetric Jack polynomials.

Significance. If the identified conditions for commuting projections hold and the representation-theoretic relations are established without hidden parameter restrictions, the results would strengthen the structural understanding of these polynomials and their eigenfunction properties. The continuation of the Bernevig-Haldane clustering analysis via quasistaircase partitions is a natural specialization that could yield testable predictions in the field.

minor comments (3)

[Abstract] The abstract packs three distinct contributions into a single paragraph; separating them would improve readability for readers scanning the paper.
Notation for the projection map and the precise definition of 'quasistaircase partition' should be introduced with a displayed equation or explicit formula in the main text rather than only in prose.
The bibliography entry for the Bernevig-Haldane conjectures should include the specific reference number used in the text for easy cross-checking.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for their careful summary of the manuscript and for the positive assessment leading to a recommendation of minor revision. No specific major comments were provided in the report.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper is a theoretical analysis in representation theory of symmetric groups and Hecke algebras, examining projections from vector-valued Jack/Macdonald polynomials to scalar ones that commute with group actions and Cherednik operators, plus relations between singular nonsymmetric and highest-weight symmetric polynomials, and an extension to quasistaircase partitions as a continuation of prior conjectures. No equations, fitted parameters, or predictions appear in the provided text. The framework is standard and self-contained against external benchmarks in the field; the self-reference to Bernevig-Haldane work is an extension rather than a load-bearing justification for the central claims. No step reduces by construction to its inputs.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Only abstract available; no explicit free parameters, axioms, or invented entities can be extracted.

pith-pipeline@v0.9.0 · 5638 in / 1070 out tokens · 24939 ms · 2026-05-24T23:34:34.047638+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

33 extracted references · 33 canonical work pages

[1]

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Belbachir, A

H. Belbachir, A. Boussicault, and J.-G. Luque. Hankel hyperdet erminants, rectangular Jack polynomials and even powers of the Vandermonde. J. Algebra, 320(11):3911–3925, 2008

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Boussicault and J.-G

A. Boussicault and J.-G. Luque. Staircase Macdonald polynomials a nd the q-discriminant. In 20th Annual International Conference on Formal Power Series and Algebr aic Combinatorics (FPSAC 2008) , Discrete Math. Theor. Comput. Sci. Proc., AJ, pages 381–392. Assoc. Disc rete Math. Theor. Comput. Sci., Nancy, 2008

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Cherednik

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Colmenarejo and C

L. Colmenarejo and C. F. Dunkl. Singular nonsymmetric Macdonald polynomials and quasi-staircases. In preparation

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Colmenarejo, C

L. Colmenarejo, C. F. Dunkl, and J.-G. Luque. Factorizations of symmetric Macdonald polynomials. Symmetry, 10(Issue 11, 541), 2018

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Di Francesco, M

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C. F. Dunkl. Diﬀerential-diﬀerence operators associated to re ﬂection groups. Trans. Amer. Math. Soc. , 311(1):167–183, 1989

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[13]

C. F. Dunkl. Singular polynomials for the symmetric groups. Int. Math. Res. Not. , (67):3607–3635, 2004

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[14]

C. F. Dunkl and J.-G. Luque. Vector-valued Jack polynomials fr om scratch. SIGMA Symmetry Integra- bility Geom. Methods Appl. , 7:Paper 026, 48, 2011

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[15]

C. F. Dunkl and J.-G. Luque. Vector valued Macdonald polynomia ls. S´ em. Lothar. Combin., 66:Art. B66b, 68, 2011/12

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[16]

C. F. Dunkl and J.-G. Luque. Clustering properties of rectang ular Macdonald polynomials. Ann. Inst. Henri Poincar´ e D, 2(3):263–307, 2015

work page 2015
[17]

Feigin, M

B. Feigin, M. Jimbo, T. Miwa, and E. Mukhin. A diﬀerential ideal of s ymmetric polynomials spanned by Jack polynomials at β = − (r − 1)/(k + 1). Int. Math. Res. Not. , (23):1223–1237, 2002

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Feigin, M

B. Feigin, M. Jimbo, T. Miwa, and E. Mukhin. Symmetric polynomials v anishing on the shifted diagonals and Macdonald polynomials. Int. Math. Res. Not. , (18):1015–1034, 2003. VECTOR-V ALUED AND HIGHEST WEIGHT JACK AND MACDONALD POLYNO MIALS 40

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Griﬀeth, A

S. Griﬀeth, A. Gusenbauer, D. Juteau, and M. Lanini. Parabolic degeneration of rational Cherednik algebras. Selecta Math. (N.S.) , 23(4):2705–2754, 2017

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[20]

Jolicoeur and J.-G

Th. Jolicoeur and J.-G. Luque. Highest weight Macdonald and Jac k polynomials. J. Phys. A , 44(5):055204, 21, 2011

work page 2011
[21]

R. C. King, F. Toumazet, and B. G. Wybourne. The square of th e Vandermonde determinant and its q-generalization. J. Phys. A , 37(3):735–767, 2004

work page 2004
[22]

A. Lascoux. Yang-Baxter graphs, Jack and Macdonald polyno mials. Ann. Comb. , 5(3-4):397–424, 2001. Dedicated to the memory of Gian-Carlo Rota (Tianjin, 1999)

work page 2001
[23]

A. Lascoux. Schubert and Macdonald polynomials, a parallel. Not es available at http://igm.univ- mlv.fr/∼ al/ARTICLES/Dummies.pdf, 2008

work page 2008
[24]

Lassalle

M. Lassalle. Coeﬃcients binomiaux g´ en´ eralis´ es et polynˆ omesde Macdonald. J. Funct. Anal., 158(2):289– 324, 1998

work page 1998
[25]

Laughlin

B. Laughlin. Anomalous quantum hall eﬀect: An incompressible qu antum liquid with fractionally charged excitations. Phys. Rev. Lett. , 50, 1983

work page 1983
[26]

J.-G. Luque. Macdonald polynomials at t = qk. J. Algebra, 324(1):36–50, 2010

work page 2010
[27]

I. G. Macdonald. Symmetric functions and Hall polynomials . Oxford Mathematical Monographs. The Clarendon Press, Oxford University Press, New York, second edit ion, 1995

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[28]

I. G. Macdonald. Aﬃne Hecke algebras and orthogonal polynom ials. Ast´ erisque, (237):Exp. No. 797, 4, 189–207, 1996. S´ eminaire Bourbaki, Vol. 1994/95

work page 1996
[29]

Marshall

D. Marshall. Symmetric and nonsymmetric Macdonald polynomials. Ann. Comb., 3(2-4):385–415, 1999. On combinatorics and statistical mechanics

work page 1999
[30]

Moore and N

G. Moore and N. Read. Nonabelions in the fractional quantum Ha ll eﬀect. Nuclear Phys. B , 360(2- 3):362–396, 1991

work page 1991
[31]

E. M. Opdam. Harmonic analysis for certain representations of graded Hecke algebras. Acta Math. , 175(1):75–121, 1995

work page 1995
[32]

Read and E

N. Read and E. Rezayi. Beyond paired quantum hall states: Par afermions and incompressible states in the ﬁrst excited landau level. Phys. Rev. Lett. , 59, 1999

work page 1999
[33]

Scharf, J.-Y

T. Scharf, J.-Y. Thibon, and B. G. Wybourne. Powers of the Va ndermonde determinant and the quantum Hall eﬀect. J. Phys. A , 27(12):4211–4219, 1994. Laura Colmenarejo, University of Massachusetts at Amherst , US E-mail address : laura.colmenarejo.hernando@gmail.com URL: https://sites.google.com/view/l-colmenarejo/home Charles F. Dunkl, Department of Mathe...

work page 1994

[1] [1]

T. H. Baker and P. J. Forrester. Nonsymmetric Jack polynomials and integral kernels. Duke Math. J. , 95(1):1–50, 1998

work page 1998

[2] [2]

Belbachir, A

H. Belbachir, A. Boussicault, and J.-G. Luque. Hankel hyperdet erminants, rectangular Jack polynomials and even powers of the Vandermonde. J. Algebra, 320(11):3911–3925, 2008

work page 2008

[3] [3]

B. A. Bernevig and F.D.M. Haldane. Model fractional quantum hall states and Jack polynomials. Phys. Rev. Lett., 100:246802, 2008

work page 2008

[4] [4]

B. A. Bernevig and F.D.M. Haldane. Clustering properties and mode l wave functions for non-abelian fractional quantum hall quasielectrons. Phys. Rev. Lett. , 103, 2009

work page 2009

[5] [5]

Boussicault and J.-G

A. Boussicault and J.-G. Luque. Staircase Macdonald polynomials a nd the q-discriminant. In 20th Annual International Conference on Formal Power Series and Algebr aic Combinatorics (FPSAC 2008) , Discrete Math. Theor. Comput. Sci. Proc., AJ, pages 381–392. Assoc. Disc rete Math. Theor. Comput. Sci., Nancy, 2008

work page 2008

[6] [6]

Boussicault, J.-G

A. Boussicault, J.-G. Luque, and C. Tollu. Hyperdeterminantal c omputation for the Laughlin wavefunc- tion. J. Phys. A , 42(14):145301, 13, 2009

work page 2009

[7] [7]

Cherednik

I. Cherednik. Nonsymmetric Macdonald polynomials. Internat. Math. Res. Notices , (10):483–515, 1995

work page 1995

[8] [8]

Colmenarejo and C

L. Colmenarejo and C. F. Dunkl. Singular nonsymmetric Macdonald polynomials and quasi-staircases. In preparation

work page

[9] [9]

Colmenarejo, C

L. Colmenarejo, C. F. Dunkl, and J.-G. Luque. Factorizations of symmetric Macdonald polynomials. Symmetry, 10(Issue 11, 541), 2018

work page 2018

[10] [10]

Di Francesco, M

P. Di Francesco, M. Gaudin, C. Itzykson, and F. Lesage. Lau ghlin’s wave functions, Coulomb gases and expansions of the discriminant. Internat. J. Modern Phys. A , 9(24):4257–4351, 1994

work page 1994

[11] [11]

Dipper and G

R. Dipper and G. James. Representations of Hecke algebras of general linear groups. Proc. London Math. Soc. (3) , 52(1):20–52, 1986

work page 1986

[12] [12]

C. F. Dunkl. Diﬀerential-diﬀerence operators associated to re ﬂection groups. Trans. Amer. Math. Soc. , 311(1):167–183, 1989

work page 1989

[13] [13]

C. F. Dunkl. Singular polynomials for the symmetric groups. Int. Math. Res. Not. , (67):3607–3635, 2004

work page 2004

[14] [14]

C. F. Dunkl and J.-G. Luque. Vector-valued Jack polynomials fr om scratch. SIGMA Symmetry Integra- bility Geom. Methods Appl. , 7:Paper 026, 48, 2011

work page 2011

[15] [15]

C. F. Dunkl and J.-G. Luque. Vector valued Macdonald polynomia ls. S´ em. Lothar. Combin., 66:Art. B66b, 68, 2011/12

work page 2011

[16] [16]

C. F. Dunkl and J.-G. Luque. Clustering properties of rectang ular Macdonald polynomials. Ann. Inst. Henri Poincar´ e D, 2(3):263–307, 2015

work page 2015

[17] [17]

Feigin, M

B. Feigin, M. Jimbo, T. Miwa, and E. Mukhin. A diﬀerential ideal of s ymmetric polynomials spanned by Jack polynomials at β = − (r − 1)/(k + 1). Int. Math. Res. Not. , (23):1223–1237, 2002

work page 2002

[18] [18]

Feigin, M

B. Feigin, M. Jimbo, T. Miwa, and E. Mukhin. Symmetric polynomials v anishing on the shifted diagonals and Macdonald polynomials. Int. Math. Res. Not. , (18):1015–1034, 2003. VECTOR-V ALUED AND HIGHEST WEIGHT JACK AND MACDONALD POLYNO MIALS 40

work page 2003

[19] [19]

Griﬀeth, A

S. Griﬀeth, A. Gusenbauer, D. Juteau, and M. Lanini. Parabolic degeneration of rational Cherednik algebras. Selecta Math. (N.S.) , 23(4):2705–2754, 2017

work page 2017

[20] [20]

Jolicoeur and J.-G

Th. Jolicoeur and J.-G. Luque. Highest weight Macdonald and Jac k polynomials. J. Phys. A , 44(5):055204, 21, 2011

work page 2011

[21] [21]

R. C. King, F. Toumazet, and B. G. Wybourne. The square of th e Vandermonde determinant and its q-generalization. J. Phys. A , 37(3):735–767, 2004

work page 2004

[22] [22]

A. Lascoux. Yang-Baxter graphs, Jack and Macdonald polyno mials. Ann. Comb. , 5(3-4):397–424, 2001. Dedicated to the memory of Gian-Carlo Rota (Tianjin, 1999)

work page 2001

[23] [23]

A. Lascoux. Schubert and Macdonald polynomials, a parallel. Not es available at http://igm.univ- mlv.fr/∼ al/ARTICLES/Dummies.pdf, 2008

work page 2008

[24] [24]

Lassalle

M. Lassalle. Coeﬃcients binomiaux g´ en´ eralis´ es et polynˆ omesde Macdonald. J. Funct. Anal., 158(2):289– 324, 1998

work page 1998

[25] [25]

Laughlin

B. Laughlin. Anomalous quantum hall eﬀect: An incompressible qu antum liquid with fractionally charged excitations. Phys. Rev. Lett. , 50, 1983

work page 1983

[26] [26]

J.-G. Luque. Macdonald polynomials at t = qk. J. Algebra, 324(1):36–50, 2010

work page 2010

[27] [27]

I. G. Macdonald. Symmetric functions and Hall polynomials . Oxford Mathematical Monographs. The Clarendon Press, Oxford University Press, New York, second edit ion, 1995

work page 1995

[28] [28]

I. G. Macdonald. Aﬃne Hecke algebras and orthogonal polynom ials. Ast´ erisque, (237):Exp. No. 797, 4, 189–207, 1996. S´ eminaire Bourbaki, Vol. 1994/95

work page 1996

[29] [29]

Marshall

D. Marshall. Symmetric and nonsymmetric Macdonald polynomials. Ann. Comb., 3(2-4):385–415, 1999. On combinatorics and statistical mechanics

work page 1999

[30] [30]

Moore and N

G. Moore and N. Read. Nonabelions in the fractional quantum Ha ll eﬀect. Nuclear Phys. B , 360(2- 3):362–396, 1991

work page 1991

[31] [31]

E. M. Opdam. Harmonic analysis for certain representations of graded Hecke algebras. Acta Math. , 175(1):75–121, 1995

work page 1995

[32] [32]

Read and E

N. Read and E. Rezayi. Beyond paired quantum hall states: Par afermions and incompressible states in the ﬁrst excited landau level. Phys. Rev. Lett. , 59, 1999

work page 1999

[33] [33]

Scharf, J.-Y

T. Scharf, J.-Y. Thibon, and B. G. Wybourne. Powers of the Va ndermonde determinant and the quantum Hall eﬀect. J. Phys. A , 27(12):4211–4219, 1994. Laura Colmenarejo, University of Massachusetts at Amherst , US E-mail address : laura.colmenarejo.hernando@gmail.com URL: https://sites.google.com/view/l-colmenarejo/home Charles F. Dunkl, Department of Mathe...

work page 1994