Hall-Littlewood polynomials at roots of unity

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last updates: 1 June 2011

Hall-Littlewood polynomials at roots of unity

Following [Mac, I (2.14)] and [Mac III (4.1)], for a partition $λ = (1^{m_{1}} 2^{m_{2}} \dots)$ let

z_{λ} = 1^{m_{1}} m_{1}! 2^{m_{2}} m_{2}! \dots, and z_{λ} (t) = z_{λ} \prod_{i \in ℤ_{> 0}} \frac{1}{1 - t^{λ_{i}}}

As in [Mac III (2.11-2.13)] let

φ (t) = (1 - t) (1 - t^{2}) \dots (1 - t^{ℓ}) and b_{λ} (t) = φ_{m_{1}} (t) φ_{m_{2}} (t) \dots

Then (see [Mac III (2.11-2.13)])

Q_{λ} (x; t) = b_{λ} (t) P_{λ} (x; t) and q_{ℓ} (x; t) = Q_{(ℓ)} (x; t)

By [Mac III Ex. 7.1],

Q_{(ℓ)} (x; t) = \sum_{ρ ⊢ ℓ} \frac{1}{z_{ρ} (t)} p_{ρ} (x)

and, by [Mac III Ex. 7.2],

p_{ℓ} (x) = \sum_{λ ⊢ ℓ} t^{n (λ)} (\prod_{i = 1}^{ℓ (λ) - 1} (1 - t^{- i})) P_{λ} (x; t)

Let $r \in ℤ_{> 0}$ and let $ζ = e^{2 π i / r}$ . Let

Λ_{(r)} = ℤ [ζ] -span {P_{λ} (x; ζ) | m_{i} (λ) < r}

By [Mac III Ex. 7.7],

Λ_{(r)}

is a

ℤ [ζ]

-algebra and

Λ_{(r)} \otimes_{ℤ [ζ]} ℚ (ζ) = ℚ (ζ) [p_{i} | i \neq 0 \mod r]

By [To, Lemma 2.2] the map

\begin{matrix} \frac{ℤ [e_{1}, e_{2}, \dots]}{⟨ e_{i} (x_{1}^{r}, x_{2}^{r}, \dots) | i \in ℤ_{> 0} ⟩} \otimes_{ℤ} ℤ [ζ] & \tilde{⟶} & Λ_{(r)} \\ e_{i} & ⟼ & q_{i} \end{matrix}

is a

ℤ [ζ]

-algebra isomorphism. By [To, Remark after Lemma 2.2],

\begin{matrix} \frac{ℤ [e_{1}, e_{2}, \dots e_{k}]}{⟨ e_{i} (x_{1}^{r}, x_{2}^{r}, \dots) | i \in ℤ_{> 0} ⟩} \otimes_{ℤ} ℤ [ζ] & \tilde{⟶} & \frac{Λ_{(r)}}{⟨ q_{i} | i > k ⟩} \\ e_{i} & ⟼ & q_{i} \end{matrix}

is an isomorphism of

ℤ [ζ]

-algebras and

\frac{Λ_{(r)}}{⟨ q_{i} | i > k ⟩}

has

ℤ [ζ]

-bases

{Q_{λ} (x; ζ) | m_{i} (λ) < r and λ_{1} \leq k} and {q_{λ} (x; ζ) | m_{i} (λ) < r and λ_{1} \leq k} .

In [FJ+, §3.1 eqn (6)] they define

F^{(r, 2)} = {f \in {ℂ [x_{1}, \dots, x_{k}]}^{S_{k}} | f (x_{1}, ζ x_{1}, ζ^{2} x_{1}, \dots, ζ^{r - 1} x_{1}, x_{r + 1}, \dots, x_{k}) = 0} .

By [FJ+, Prop. 3.5],

F^{(r, 2)} ≃ \frac{Λ_{(r)}}{⟨ q_{i} | i > k ⟩}

(is this exactly right??). The [FJ+] proof has two steps:

If $m_{i} (λ) < r$ for all $i$ then $Q_{λ} (x; ζ) \in F^{(r, 2)}$ ,
[FJ+, Lemma 3.2] which almost coincides with [To, Lemma 2.2] to say
$F^{(r, 2)} ≃ \frac{ℤ [e_{1}, e_{2}, \dots e_{k}]}{⟨ e_{i} (x_{1}^{r}, x_{2}^{r}, \dots) | i \in ℤ_{> 0} ⟩} \otimes_{ℤ} ℤ [ζ]$

The fundamental formula is that

if Q (u) = \sum_{i \in ℤ_{> 0}} q_{i} u^{i} then \prod_{j = 0}^{r - 1} Q (ζ^{j} u) = 1,

and if

E (u) = \sum_{i \in ℤ_{> 0}} e_{i} u^{i} = \prod_{i \in ℤ_{> 0}} (1 + x_{i} u)

then

\prod_{j = 0}^{r - 1} E (ζ^{j} u) = \sum_{ℓ \in ℤ_{\geq 0}} {(- 1)}^{ℓ (r - 1)} e_{ℓ} (x_{1}^{r}, x_{1}^{r}, \dots) u^{ℓ r}

Notes and References

The bulk of the paper of Morris is contained in [Mac III Ex. 7.7]. In the last section Morris makes a very interesting comparison to the modular representation theory of the symmetric group.
[Mac II Ex. 5.7] gives a "factorisation formula" due to [LLT].
These notes are a typed version of a scan of handwritten notes sent to Z. Daugherty on 16 March 2011.

References

[FJ+] B. Feigin, M. Jimbo, T. Miwa, E. Mukhin and Y. Takeyama, Symmetric polynomials vanishing on the diagonals shifted by roots of unity, arXiv:math/0209126 [math.QA], Int Math. res. Notices 2003 no. 18, 1015-1034.

[Mac] I.G. Macdonald, Symmetric functions and Hall polynomials, Second edition, Oxford Univ. Press 1995. MR?????.

[Mo] A.O. Morris, On an algebra of symmetric functions, Quart. J. Math. 16 (1965), 53-64. MR?????.

[To] B. Totaro, Towards a Schubert calculus for complex reflection groups, Math. Proc. Camb. Phil. Soc. 134 (2003) 83-93, http://www.dpmms.cam.ac.uk/~bt219/papers.html MR?????.

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