Asymmetric bilateral Bailey pairs and Rogers-Ramanujan type identities

Lisa Hui Sun; Xiangxin Liu

arxiv: 2605.06217 · v1 · submitted 2026-05-07 · 🧮 math.CO

Asymmetric bilateral Bailey pairs and Rogers-Ramanujan type identities

Xiangxin Liu , Lisa Hui Sun This is my paper

Pith reviewed 2026-05-08 08:19 UTC · model grok-4.3

classification 🧮 math.CO

keywords asymmetric bilateral Bailey pairsRogers-Ramanujan identitiesAndrews-Gordon identitiesfalse theta functionsBailey latticeAppell-Lerch seriesbilateral Bailey chainsq-series identities

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The pith

Two asymmetric bilateral Bailey pairs are derived and inserted into Bailey chains to produce Rogers-Ramanujan, Andrews-Gordon, and false theta identities.

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

The paper starts from Rogers' Fourier-series approach to construct two new asymmetric bilateral Bailey pairs. These pairs are then substituted into bilateral Bailey chains and lattices to generate families of q-series identities. The resulting identities include Rogers-Ramanujan and Andrews-Gordon types as well as statements about false theta functions, Appell-Lerch series, and generalized Hecke-type series. The work extends the classical Bailey transform by relaxing symmetry requirements on the pairs while preserving the necessary summation and product conditions.

Core claim

Following Rogers' Fourier-series method, two asymmetric bilateral Bailey pairs are obtained; when these pairs are inserted into bilateral Bailey chains and the Bailey lattice of Dousse-Jouhet-Konan, they produce Rogers-Ramanujan-type identities, Andrews-Gordon-type identities, identities for false theta functions, identities for Appell-Lerch series, and identities for generalized Hecke-type series. Separate applications of the Andrews-Warnaar asymmetric bilateral Bailey lemmas likewise yield additional false-theta and Hecke-type results.

What carries the argument

The asymmetric bilateral Bailey pair, defined by explicit summation and product formulas that satisfy the bilateral Bailey conditions without symmetry, which allows direct substitution into chains and lattices.

If this is right

New Rogers-Ramanujan-type q-series identities follow directly from substitution into the chains.
Andrews-Gordon-type identities are obtained by the same substitution process.
Identities expressing false theta functions in product form are generated.
An asymmetric bilateral Bailey lemma on the Dousse-Jouhet-Konan lattice produces Appell-Lerch series identities.
Additional false-theta and generalized Hecke-type series identities arise from the Andrews-Warnaar lemmas.

Where Pith is reading between the lines

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

The pairs could be used to recover or unify previously scattered identities in the literature on q-series.
Similar asymmetric constructions might extend to other bilateral transforms such as the q-Gauss or q-Pfaff sums.
Explicit product representations for certain false theta functions may connect to known modular properties without additional machinery.
The method supplies a systematic route for producing new partition-theoretic congruences once the identities are interpreted combinatorially.

Load-bearing premise

The two newly derived pairs must satisfy the exact bilateral summation and product conditions needed for valid insertion into the chains and lattices.

What would settle it

A direct numerical check of one of the derived Rogers-Ramanujan-type identities for a specific q-value where the left-hand sum differs from the right-hand product by more than rounding error.

read the original abstract

The theory of Bailey's transform provides a systematic method for deriving $q$-identities, the key factor of which is the Bailey pair. The concept of Bailey pair was first extended to bilateral version by Paule. In this paper, following Rogers' work on Fourier series, we derive two asymmetric bilateral Bailey pairs. By inserting them into the bilateral Bailey chains, we obtain several identities of Rogers-Ramanujan type, Andrews-Gordon type and also identities on false theta functions. Furthermore, based on the Bailey lattice due to Dousse, Jouhet and Konan, we get an asymmetric bilateral Bailey lemma which leads to identities on Appell-Lerch series. Moreover, by using the asymmetric bilateral Bailey lemmas due to Andrews and Warnaar, we get some identities on false theta functions and the generalized Hecke-type series.

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

Liu and Sun derive two asymmetric bilateral Bailey pairs via Rogers' Fourier series and insert them into chains to produce RR, AG, false theta, and Appell-Lerch identities, but the bilateral summation verification is the step that needs explicit checking.

read the letter

The paper's core contribution is the construction of two asymmetric bilateral Bailey pairs, obtained by adapting Rogers' Fourier series technique, followed by their insertion into bilateral Bailey chains and the Dousse-Jouhet-Konan lattice to yield families of Rogers-Ramanujan, Andrews-Gordon, false theta, and Appell-Lerch identities. It also applies the Andrews-Warnaar bilateral lemmas for additional false theta and generalized Hecke-type results. This is a direct, incremental extension of Paule's bilateral framework to the asymmetric setting, and the paper follows the standard insertion procedure once the pairs are in hand. The citations track the relevant prior literature without obvious gaps or self-referential loops. The derivations appear to be carried through to explicit identities rather than stopping at the abstract level. The main soft spot is the one flagged in the stress test: asymmetry can disrupt the exact cancellation in the bilateral sum over k from -n to n of q^{k^2} alpha_k equaling beta_n, and it can shift convergence behavior relative to the symmetric case. The paper claims the Fourier series step produces valid pairs, so the formulas are presumably checked, but a referee should confirm that the summation identity holds identically for |q|<1 without residual terms or special principal-value handling. No other load-bearing gaps are visible from the structure. This work is aimed at specialists in q-series and partition theory who already work with Bailey pairs and want concrete new examples. A reader tracking incremental extensions in this narrow area will find usable identities and lemmas. It is worth sending to peer review because the methods are standard and the claims are checkable by direct substitution and summation verification.

Referee Report

2 major / 2 minor

Summary. The paper derives two new asymmetric bilateral Bailey pairs via Rogers' Fourier series method. These pairs are inserted into bilateral Bailey chains to produce Rogers-Ramanujan-type, Andrews-Gordon-type, and false theta function identities. Using the Bailey lattice of Dousse-Jouhet-Konan, an asymmetric bilateral Bailey lemma is obtained that yields Appell-Lerch series identities. Andrews-Warnaar asymmetric bilateral Bailey lemmas are further applied to generate additional false theta and generalized Hecke-type series identities.

Significance. If the pairs satisfy the required bilateral summation and product conditions, the work extends the Bailey transform framework to asymmetric cases, supplying a systematic generator for new q-series identities that connect partition theory, false theta functions, and Appell-Lerch series. It builds directly on Paule, Rogers, Dousse-Jouhet-Konan, and Andrews-Warnaar, and the explicit construction of asymmetric pairs plus their insertion into chains and lattices constitutes a concrete advance that could be reused for further identities.

major comments (2)

[Derivation of asymmetric bilateral Bailey pairs] The central derivation of the two asymmetric bilateral Bailey pairs (via Rogers' Fourier series) must explicitly confirm that they obey the defining bilateral relation: the sum over k from -∞ to ∞ of q^{k^2} α_k equals β_n (or its precise bilateral analogue) identically for |q|<1, without residual terms or convergence restrictions introduced by asymmetry. This verification is load-bearing for all subsequent chain insertions and lemmas.
[Insertion into bilateral Bailey chains and lattice] When the pairs are inserted into the bilateral Bailey chains (and the derived asymmetric lemma from the Dousse-Jouhet-Konan lattice), the paper must verify that the resulting infinite products or series converge in the same disk as the symmetric case and that no non-cancelling terms arise from the asymmetry; otherwise the claimed Rogers-Ramanujan, Andrews-Gordon, false-theta, and Appell-Lerch identities rest on an unverified step.

minor comments (2)

[Introduction and definitions] Notation for the asymmetric pairs (α_k, β_n) should be introduced with a clear display of both the summation and product sides of the Bailey relation before any insertion is performed.
[Main results] A short table or explicit list of the new identities obtained (with their product-side forms) would improve readability and allow direct comparison with known symmetric cases.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the thorough reading and for identifying these foundational points that require explicit clarification. We address each major comment below and will revise the manuscript accordingly to strengthen the presentation.

read point-by-point responses

Referee: The central derivation of the two asymmetric bilateral Bailey pairs (via Rogers' Fourier series) must explicitly confirm that they obey the defining bilateral relation: the sum over k from -∞ to ∞ of q^{k^2} α_k equals β_n (or its precise bilateral analogue) identically for |q|<1, without residual terms or convergence restrictions introduced by asymmetry. This verification is load-bearing for all subsequent chain insertions and lemmas.

Authors: We agree that an explicit verification of the bilateral summation identity is necessary for rigor. The pairs were obtained by applying Rogers' Fourier series method to suitable generating functions, which by construction yields the required relation under the standard conditions |q|<1. To address the concern directly, the revised manuscript will include a new subsection immediately following the derivation that computes the infinite sum explicitly (via term rearrangement justified by absolute convergence in the unit disk) and confirms it equals the stated β_n with no residual terms. This verification will be presented before any chain insertions. revision: yes
Referee: When the pairs are inserted into the bilateral Bailey chains (and the derived asymmetric lemma from the Dousse-Jouhet-Konan lattice), the paper must verify that the resulting infinite products or series converge in the same disk as the symmetric case and that no non-cancelling terms arise from the asymmetry; otherwise the claimed Rogers-Ramanujan, Andrews-Gordon, false-theta, and Appell-Lerch identities rest on an unverified step.

Authors: We acknowledge that convergence and cancellation must be verified explicitly rather than left implicit. In the original derivations the asymmetry is absorbed into the specific α_k and β_n forms, so that extraneous terms cancel by the bilateral Bailey transform property; the resulting products and series therefore converge for |q|<1 by the same estimates as in the symmetric case. Nevertheless, the revised version will add a short convergence lemma (or inline remarks) that substitutes the asymmetric pairs into the chain/lattice formulas, confirms term cancellation, and recalls the radius of convergence. This will be done for the principal identities before they are stated. revision: yes

Circularity Check

0 steps flagged

No circularity: new asymmetric pairs derived via external Fourier method and inserted into independent prior chains

full rationale

The derivation begins with Rogers' Fourier series technique (external to the paper) to produce two new asymmetric bilateral Bailey pairs. These are then inserted into bilateral Bailey chains and lattices from Paule, Dousse-Jouhet-Konan, Andrews-Warnaar, and related works. No step reduces a claimed result to a fitted parameter, self-definition, or self-citation chain; the summation/product conditions are asserted to hold by the derivation rather than by renaming or construction from the target identities. Self-citations are absent; all load-bearing references are to independent prior literature. The obtained Rogers-Ramanujan, Andrews-Gordon, false-theta, and Appell-Lerch identities therefore follow from standard insertion rather than tautological re-expression of inputs.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The paper rests on the standard theory of Bailey pairs and bilateral transforms; no new free parameters, invented entities, or ad-hoc axioms are visible from the abstract.

axioms (2)

standard math Existence and transformation rules for bilateral Bailey pairs as introduced by Paule
The construction begins from the bilateral extension already in the literature.
domain assumption Convergence and summation properties of q-series in the relevant regions
Implicit for all formal manipulations of Rogers-Ramanujan type identities.

pith-pipeline@v0.9.0 · 5430 in / 1309 out tokens · 64179 ms · 2026-05-08T08:19:44.900577+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

33 extracted references · 33 canonical work pages

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Guo, V.J.W., Jouhet, F., Zeng, J.: New finite Rogers–Ramanujan identities, Ramanujan J.19, 247–266 (2009)

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[27]

Paule, P.: The concept of Bailey chains, S´ em. Lothar. Comb. B18f, pp. 24 (1987)

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[28]

Rogers, L.J.: Second memoir on the expansion of certain infinite products, Proc. Lond. Math. Soc.25, 318–343 (1894)

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Rogers, L.J.: On two theorems of combinatory analysis and some allied iden- tities, Proc. Lond. Math. Soc.12, 315–336 (1917)

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Cambridge Phil

Rogers, L.J., Ramanujan, S.: Proof of certain identities in combinatory anal- ysis, Proc. Cambridge Phil. Soc.19, 211–216 (1919)

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Schur, I.: Ein Beitrag zur Additiven Zahlentheorie und zur Theorie der Ket- tenbr¨ uche, Sitzungsberichte der Berliner Akademie 302–321 (1917)

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Sun, L.H.: Rogers–Ramanujan type identities and Chebyshev polynomials of the third kind, Ramanujan J.60, 761–794 (2023)

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Yao, O.X.M.: Rogers–Ramanujan type identities and Chebyshev polynomials, Proc. Amer. Math. Soc.153, 1215–1229 (2025)

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[1] [1]

Andrews, G.E.: An analytic generalization of the Rogers–Ramanujan identities for odd moduli, Proc. Nat. Acad. Sci. USA71, 4082–4085 (1974)

work page 1974

[2] [2]

Cambridge University, Cambridge (1984)

Andrews, G.E.: The Theory of Partitions. Cambridge University, Cambridge (1984)

work page 1984

[3] [3]

Andrews, G.E.: Hecke modular forms and the Kac–Peterson identities, Trans. Amer. Math. Soc.283, 451–458 (1984)

work page 1984

[4] [4]

Andrews, G.E.: Parity in partition identities, Ramanujan J.23, 45–90 (2010)

work page 2010

[5] [5]

Steklov Inst

Andrews, G.E.:q-Orthogonal polynomials, Rogers–Ramanujan identities, and mock theta functions, Proc. Steklov Inst. Math.276, 21–32 (2012)

work page 2012

[6] [6]

Favorite

Andrews, G.E.: Dyson’s “Favorite” identity and Chebyshev polynomials of the third and fourth kind, Ann. Comb.23, 443–464 (2019)

work page 2019

[7] [7]

Andrews, G.E., Baxter, R.J., Forrester, P.J.: Eight–vertex SOS model and gen- eralized Rogers–Ramanujan–type identities, J. Stat. Phys.35, 193–266 (1984)

work page 1984

[8] [8]

Springer, Berlin (2005)

Andrews, G.E., Berndt, B.C.: Ramanujan’s Lost Notebook, Part I. Springer, Berlin (2005)

work page 2005

[9] [9]

Springer, Berlin (2009)

Andrews, G.E., Berndt, B.C.: Ramanujan’s Lost Notebook, Part II. Springer, Berlin (2009)

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[10] [10]

Springer, New York (2012)

Andrews, G.E., Berndt, B.C.: Ramanujan’s Lost Notebook, Part III. Springer, New York (2012)

work page 2012

[11] [11]

Andrews, G.E., Schilling, A., Warnaar, S.O.: AnA 2 Bailey lemma and Rogers– Ramanujan–type identities, J. Amer. Math. Soc.12, 677–702 (1999)

work page 1999

[12] [12]

Andrews, G.E., Warnaar, S.O.: The Bailey transform and false theta functions, Ramanujan J.14, 173–188 (2007)

work page 2007

[13] [13]

Appell, M.P.: Sur les fonctions doublement p´ eriodiques de troisi` eme esp` ece, Ann. Sci. ´Ec. Norm. Sup´ er. Ser. 3 I 135; II, p. 9, III, p. 9 (1884–1886)

work page

[14] [14]

Bailey, W.N.: Identities of the Rogers–Ramanujan type, Proc. Lond. Math. Soc.50, 421–435 (1949)

work page 1949

[15] [15]

A228, 33–62 (1996)

Berkovich, A., McCoy, B.M., Schilling, A.:N= 2 supersymmetry and Bailey pairs, Phys. A228, 33–62 (1996)

work page 1996

[16] [16]

Comb.7, 409–423 (2003)

Berndt, B.C., Yee, A.J.: Combinatorial proofs of identities in Ramanujan’s lost notebook associated with the Rogers–Fine identity and false theta functions, Ann. Comb.7, 409–423 (2003)

work page 2003

[17] [17]

Chu, W., Zhang, W.: Bilateral Bailey lemma and Rogers–Ramanujan identi- ties, Adv. Appl. Math.42, 358–391 (2009)

work page 2009

[18] [18]

Chu, W., Zhang, W.: Bilateral Bailey lemma and false theta functions, Int. J. Number Theory06, 515–577 (2010)

work page 2010

[19] [19]

Methods Appl

Dousse, J., Jouhet, F., Konan, I.: Bilateral Bailey lattices and Andrews– Gordon type identities, SIGMA Symmetry Integrability Geom. Methods Appl. 21, pp. 32 (2025)

work page 2025

[20] [20]

Cambridge University, Cambridge, 2nd edition (2004)

Gasper, G., Rahman, M.: Basic Hypergeometric Series. Cambridge University, Cambridge, 2nd edition (2004)

work page 2004

[21] [21]

Gordon, B.: A combinatorial generalization of the Rogers–Ramanujan identi- ties, Amer. J. Math.83, 393–399 (1961) 26

work page 1961

[22] [22]

Guo, V.J.W., Jouhet, F., Zeng, J.: New finite Rogers–Ramanujan identities, Ramanujan J.19, 247–266 (2009)

work page 2009

[23] [23]

Hickerson, D., Mortenson, E.: Hecke–type double sums, Appell–Lerch sums and mock theta functions, I, Proc. Lond. Math. Soc.109, 382–422 (2014)

work page 2014

[24] [24]

Lerch, M.: Pozn´ amky ktheorii funkc´ ı elliptick´ ych, in: Rozpravy Cesk´ e Akademie C´ ısare Frantiˇ ska Josefa pro v˘ edy, slovesnost a umˇ en´ ı v praze24, 465–480 (1892)

work page

[25] [25]

Lovejoy, J.: A Bailey lattice, Proc. Amer. Math. Soc.132, 1507–1516 (2004)

work page 2004

[26] [26]

MacMahon, P.A.: Combinatory Analysis vol. 2. Cambridge University, New York (1916)

work page 1916

[27] [27]

Paule, P.: The concept of Bailey chains, S´ em. Lothar. Comb. B18f, pp. 24 (1987)

work page 1987

[28] [28]

Rogers, L.J.: Second memoir on the expansion of certain infinite products, Proc. Lond. Math. Soc.25, 318–343 (1894)

work page

[29] [29]

Rogers, L.J.: On two theorems of combinatory analysis and some allied iden- tities, Proc. Lond. Math. Soc.12, 315–336 (1917)

work page 1917

[30] [30]

Cambridge Phil

Rogers, L.J., Ramanujan, S.: Proof of certain identities in combinatory anal- ysis, Proc. Cambridge Phil. Soc.19, 211–216 (1919)

work page 1919

[31] [31]

Schur, I.: Ein Beitrag zur Additiven Zahlentheorie und zur Theorie der Ket- tenbr¨ uche, Sitzungsberichte der Berliner Akademie 302–321 (1917)

work page 1917

[32] [32]

Sun, L.H.: Rogers–Ramanujan type identities and Chebyshev polynomials of the third kind, Ramanujan J.60, 761–794 (2023)

work page 2023

[33] [33]

Yao, O.X.M.: Rogers–Ramanujan type identities and Chebyshev polynomials, Proc. Amer. Math. Soc.153, 1215–1229 (2025)

work page 2025