Your search keyword '"Modular forms"' showing total 3,611 results

1. Certain eta-quotients and ℓ-regular partitions with distinct odd parts.

Author

Ray, Chiranjit

Abstract

Let pod ℓ (n) be the number of ℓ -regular partitions of n with distinct odd parts. In this article, we prove that for any positive integer k, the set of non-negative integers n for which pod ℓ (n) ≡ 0 (mod p k) has density one. We also exhibit several multiplicative identities for pod 3 (n) , pod 5 (n) and pod 7 (n) using the Hecke eigenforms, and some results of Ono, Robins, and Wahl. [ABSTRACT FROM AUTHOR]

Published

2024

2. Hypergeometric solutions to Schwarzian equations.

Author

Besrour, Khalil and Sebbar, Abdellah

Abstract

In this paper we study the modular differential equation y ′ ′ + s E 4 y = 0 where E 4 is the weight 4 Eisenstein series and s = π 2 r 2 with r = n / m being a rational number in reduced form such that m ≥ 7 . This study is carried out by solving the associated Schwarzian equation { h , τ } = 2 s E 4 and using the theory of equivariant functions on the upper half-plane and the 2-dimensional vector-valued modular forms. The solutions are expressed in terms of the Gauss hypergeometric series. This completes the study of the above-mentioned modular differential equation of the associated Schwarzian equation given that the cases 1 ≤ m ≤ 6 have already been treated in Saber and Sebbar (Forum Math 32(6):1621–1636, 2020; Ramanujan J 57(2):551–568, 2022; J Math Anal Appl 508:125887, 2022; Modular differential equations and algebraic systems, http://arxiv.org/abs/2302.13459). [ABSTRACT FROM AUTHOR]

Published

2024

3. Rankin–Cohen type differential operators on Hermitian modular forms.

Author

Dunn, Francis

Subjects

*HERMITIAN operators, *DIFFERENTIAL operators, *REPRESENTATIONS of groups (Algebra), *AUTOMORPHIC forms, *MODULAR forms, *HERMITIAN forms

Abstract

We construct Rankin–Cohen type differential operators on Hermitian modular forms of signature (n, n). The bilinear differential operators given here specialize to the original Rankin–Cohen operators in the case n = 1 , and more generally satisfy some analogous properties, including uniqueness. Our approach builds on previous work by Eholzer–Ibukiyama in the case of Siegel modular forms, together with results of Kashiwara–Vergne on the representation theory of unitary groups. [ABSTRACT FROM AUTHOR]

Published

2024

4. Arithmetic properties of 5-regular partitions into distinct parts.

Author

Baruah, Nayandeep Deka and Sarma, Abhishek

Subjects

*MODULAR forms, *GENERATING functions, *ARITHMETIC, *COMBINATORICS

Abstract

A partition is said to be ℓ-regular if none of its parts is a multiple of ℓ. Let b5′(n) denote the number of 5-regular partitions into distinct parts (equivalently, into odd parts) of n. This function has also close connections to representation theory and combinatorics. In this paper, we study arithmetic properties of b5′(n). We provide full characterization of the parity of b5′(2n + 1), present several congruences modulo 4, and prove that the generating function of the sequence (b5′(5n + 1)) is lacunary modulo any arbitrary positive powers of 5. [ABSTRACT FROM AUTHOR]

Published

2024

5. Biomimetic Modular Honeycomb with Enhanced Crushing Strength and Flexible Customizability.

Author

Shen, Lumin, Wu, Yuanzhi, Ye, Tuo, Gao, Tianyu, Zheng, Shanmei, Long, Zhihao, Ren, Xi, Zhang, Huangyou, Huang, Junwen, and Liu, Kai

Subjects

*HONEYCOMB structures, *SPECIFIC gravity, *LIMIT theorems, *MODULAR forms, *ENERGY dissipation

Abstract

The integration of biomimetic principles into the sophisticated design of honeycomb structures has gained significant traction. Inspired by the natural reinforcement mechanisms observed in tree stems, this research introduces localized thickening to the conventional honeycombs, leading to the development of variable-density honeycomb blocks. These blocks are strategically configured to form modular honeycombs. Initially, the methodology for calculating the relative density of the new design is meticulously detailed. Following this, a numerical model based on the plastic limit theorem, verified experimentally, is used to investigate the in-plane deformation models of modular honeycomb under the low- and high-velocity impact and to establish a theoretical framework for compressive strength. The results confirm that the theoretical predictions for crushing strength in the modular honeycomb align closely with numerical findings across both low- and high-velocity impacts. Further investigation into densification strain, energy absorption, and gradient strategy is conducted using both simulation and experimental approaches. The outcomes indicate that the innovative design outperforms conventional honeycombs by significantly enhancing the crushing strength under low-velocity impacts through the judicious arrangement of honeycomb blocks. Additionally, with a negligible difference in densification strains, the modular honeycomb demonstrates superior energy dissipation capabilities compared to its conventional counterparts. At a strain of 0.85, the modular honeycomb's energy absorption capacity improves by 36.68% at 1 m/s and 25.47% at 10 m/s compared to the conventional honeycomb. By meticulously engineering the arrangement of sub-honeycombs, it is possible to develop a modular honeycomb that exhibits a multi-plateau stress response under uniaxial and biaxial compression. These advancements are particularly beneficial to the development of auto crash absorption systems, high-end product transportation packaging, and personalized protective gear. [ABSTRACT FROM AUTHOR]

Published

2024

6. Development of a B‐risk.

Author

Bemelmans, Dagmar and Verbeke, Tobias

Subjects

*BUMBLEBEES, *WEB analytics, *HONEYBEES, *MODULAR forms, *WEB-based user interfaces

Abstract

In specific contract No 12 issued under the framework agreement OC/EFSA/AMU/2019/02, EFSA requested Open Analytics to implement a web application to do a risk assessment for honey bees, solitary bees and bumble bees. The software is developed in R and consists of a WEB‐based tool composed by several modules providing data entry for active substances, uses, metabolites and the modelling of toxicity studies. The application is developed in a modular form such that new modules can be added when available, either by the developers of the application or by EFSA. [ABSTRACT FROM AUTHOR]

Published

2024

7. ℓ-Adic properties and congruences of ℓ-regular partition functions.

Author

El-Guindy, Ahmad and Ghazy, Mostafa M.

Subjects

*PARTITION functions, *ENCODING

Abstract

We study ℓ -regular partitions by defining a sequence of modular forms of level ℓ and quadratic character which encode their ℓ -adic behavior. We show that this sequence is congruent modulo increasing powers of ℓ to level 1 modular forms of increasing weights. We then prove that certain Z / ℓ m Z -modules generated by our sequence are isomorphic to certain subspaces of level 1 cusp forms of weight independent of the power of ℓ , leading to a uniform bound on the ranks of those modules and consequently to ℓ -adic relations between ℓ -regular partition values. [ABSTRACT FROM AUTHOR]

Published

2024

8. p-adic limit of the Eisenstein series on the exceptional group of type E_{7,3}.

Author

Katsurada, Hidenori and Kim, Henry H.

Subjects

*MODULAR forms, *EISENSTEIN series

Abstract

In this paper, we show that the p-adic limit of a family of Eisenstein series on the exceptional domain where the exceptional group of type E_{7,3} acts is an ordinary modular form for a congruence subgroup. [ABSTRACT FROM AUTHOR]

Published

2024

9. Compactifications of Iwahori-level Hilbert modular varieties.

Author

Diamond, Fred

Subjects

*SET theory, *MODULAR forms, *HILBERT transform

Abstract

We study minimal and toroidal compactifications of p -integral models of Hilbert modular varieties. We review the theory in the setting of Iwahori level at primes over p , and extend it to certain finer level structures. We also prove extensions to compactifications of recent results on Iwahori-level Kodaira–Spencer isomorphisms and cohomological vanishing for degeneracy maps. Finally we apply the theory to study q -expansions of Hilbert modular forms, especially the effect of Hecke operators at primes over p over general base rings. [ABSTRACT FROM AUTHOR]

Published

2024

10. Modular forms for the Weil representation induced from isotropic subgroups.

Author

Müller, Manuel K.-H.

Subjects

*MODULAR forms

Abstract

For an isotropic subgroup H of a discriminant form D there exists a lift from modular forms for the Weil representation of the discriminant form H ⊥ / H to modular forms for the Weil representation of D. We determine a set of discriminant forms such that all modular forms for any discriminant form are induced from the discriminant forms in this set. Furthermore for any discriminant form in this set there exist modular forms that are not induced from smaller discriminant forms. [ABSTRACT FROM AUTHOR]

Published

2024

11. The values of the Dedekind--Rademacher cocycle at real multiplication points.

Author

Darmon, Henri, Pozzi, Alice, and Vonk, Jan

Subjects

*MODULAR forms, *COMPLEX multiplication, *MEROMORPHIC functions, *HILBERT modular surfaces, *DEFORMATION of surfaces

Abstract

The values of the Dedekind--Rademacher cocycle at certain real quadratic arguments are shown to be global p-units in the narrow Hilbert class field of the associated real quadratic field, as predicted by the conjectures of Darmon--Dasgupta (2006) and Darmon--Vonk (2021). The strategy for proving this result combines the approach of prior work of the authors (2021) with one crucial extra ingredient: the study of infinitesimal deformations of irregular Hilbert Eisenstein series of weight 1 in the anti-parallel direction. [ABSTRACT FROM AUTHOR]

Published

2024

12. Concyclicity of the zeros of polynomials associated to derivatives of the L-functions of Eisenstein series.

Author

Hwang, Jihyun and Lee, Yoonjin

Abstract

In this paper, we study the zeros of polynomials obtained from the L-functions and their derivatives associated to non-cuspidal modular forms in Eisenstein spaces of prime levels as a generalization of work by Diamantis and Rolen. [ABSTRACT FROM AUTHOR]

Published

2024

13. Critical points of modular forms.

Author

van Ittersum, Jan-Willem and Ringeling, Berend

Subjects

*MODULAR forms

Abstract

We count the number of critical points of a modular form with real Fourier coefficients in a γ-translate of the standard fundamental domain ℱ (with γ ∈SL2(ℤ)). Whereas by the valence formula the (weighted) number of zeros of this modular form in γℱ is a constant only depending on its weight, we give a closed formula for this number of critical points in terms of those zeros of the modular form lying on the boundary of ℱ, the value of γ−1(∞) and the weight. More generally, we indicate what can be said about the number of zeros of a quasimodular form. [ABSTRACT FROM AUTHOR]

Published

2024

14. On Derivative of Eta Quotients of Levels 12 and 16.

Author

Vasuki, K. R., Nagendra, P., and Divyananda, P.

Subjects

*EISENSTEIN series, *MODULAR forms

Abstract

Z. S. Aygin and P. C. Toh have deduced a technique using the theory of modular forms to determine all eta quotients whose derivative is also an eta quotient up to level 36. This paper aims to find a technique without using the theory of modular forms to deduce all the identities of Aygin and Toh of levels 12 and 16. [ABSTRACT FROM AUTHOR]

Published

2024

15. Modular Forms and Fourier Expansion.

Author

Shuji Horinaga

Subjects

*MODULAR forms, *FOURIER analysis, *REPRESENTATION theory, *ABSTRACT algebra, *MATHEMATICAL analysis

Abstract

Fourier analysis is an indispensable technology, but so is mathematics. In this article, we review the history of modular forms and give an overview of the relationship among representation theory, Fourier analysis, and modular forms. The explanation of difficult terms is confined to footnotes, and we focus on the relationship between the concepts. Finally, we discuss the remaining difficulties in the modern theory of modular forms, challenges, and the author's research. [ABSTRACT FROM AUTHOR]

Published

2024

16. Rademacher Expansion of a Siegel Modular Form for N=4 Counting.

Author

Cardoso, Gabriel Lopes, Nampuri, Suresh, and Rosselló, Martí

Subjects

*MODULAR forms, *CUSP forms (Mathematics), *CONTINUED fractions, *STRING theory, *TORSION, *COUNTING, *TORUS

Abstract

The degeneracies of 1/4 BPS states with unit torsion in heterotic string theory compactified on a six torus are given in terms of the Fourier coefficients of the reciprocal of the Igusa cusp Siegel modular form Φ 10 of weight 10. We use the symplectic symmetries of the latter to construct a fine-grained Rademacher-type expansion which expresses these BPS degeneracies as a regularized sum over residues of the poles of 1 / Φ 10 . The construction uses two distinct SL (2 , Z) subgroups of Sp (2 , Z) which encode multiplier systems, Kloosterman sums and Eichler integrals appearing therein. Additionally, it shows how the polar data are explicitly built from the Fourier coefficients of 1 / η 24 by means of a continued fraction structure. [ABSTRACT FROM AUTHOR]

Published

2024

17. On the modulo p zeros of modular forms congruent to theta series.

Author

Ringeling, Berend

Subjects

*JACOBI forms, *EISENSTEIN series, *HYPERGEOMETRIC functions, *MODULAR groups, *ALGEBRAIC numbers, *MODULAR forms, *QUADRATIC fields

Abstract

For a prime p larger than 7, the Eisenstein series of weight p − 1 has some remarkable congruence properties modulo p. Those imply, for example, that the j -invariants of its zeros (which are known to be real algebraic numbers in the interval [ 0 , 1728 ]), are at most quadratic over the field with p elements and are congruent modulo p to the zeros of a certain truncated hypergeometric series. In this paper we introduce "theta modular forms" of weight k ≥ 4 for the full modular group as the modular forms for which the first dim ⁡ (M k) Fourier coefficients are identical to certain theta series. We consider these theta modular forms for both the Jacobi theta series and the theta series of the hexagonal lattice. We show that the j -invariant of the zeros of the theta modular forms for the Jacobi theta series are modulo p all in the ground field with p elements. For the theta modular form of the hexagonal lattice we show that its zeros are at most quadratic over the ground field with p elements. Furthermore, we show that these zeros in both cases are congruent to the zeros of certain truncated hypergeometric functions. [ABSTRACT FROM AUTHOR]

Published

2024

18. Comparison of integral structures on the space of modular forms of full level N.

Author

Kling, Anthony

Subjects

*MODULAR construction, *MODULAR forms, *INTEGRALS, *ARITHMETIC, *GEOMETRY

Abstract

Let N ≥ 3 and r ≥ 1 be integers and p ≥ 2 be a prime such that p ∤ N. One can consider two different integral structures on the space of modular forms over Q , one coming from arithmetic via q -expansions, the other coming from geometry via integral models of modular curves. Both structures are stable under the Hecke operators; furthermore, their quotient is finite torsion. Our goal is to investigate the exponent of the annihilator of the quotient. We will apply methods due to Brian Conrad to the situation of modular forms of even weight and level Γ (N p r) over Q p (ζ N p r ) to obtain an upper bound for the exponent. We also use Klein forms to construct explicit modular forms of level p r whenever p r > 3 , allowing us to compute a lower bound which agrees with the upper bound. Hence we compute the exponent precisely. [ABSTRACT FROM AUTHOR]

Published

2024

19. Sequence of families of lattice polarized K3 surfaces, modular forms and degrees of complex reflection groups.

Author

Nagano, Atsuhira

Abstract

We introduce a sequence of families of lattice polarized K3 surfaces. This sequence is closely related to complex reflection groups of exceptional type. Namely, we obtain modular forms coming from the inverse correspondences of the period mappings attached to our sequence. We study a non-trivial relation between our modular forms and invariants of complex reflection groups. Especially, we consider a family concerned with the Shephard-Todd group No.34 based on arithmetic properties of lattices and algebro-geometric properties of the period mappings. [ABSTRACT FROM AUTHOR]

Published

2024

20. AIRSPEED HORSA GLIDER.

Author

HADAWAY, STUART

Subjects

BRITISH prime ministers, LAMINATED wood, GLIDERS (Aeronautics), DEUTERIUM oxide, MODULAR forms

Abstract

The article provides a historical overview of the Airspeed Horsa glider, which was used as a one-way transport for airborne operations during World War II. The glider was designed to move fully equipped troops, artillery, and vehicles behind enemy lines. It could carry up to 25-28 troops, along with weapons and equipment. The Horsa glider was made of laminated wood and had large flaps for controlled dives. It relied on engines from the towing aircraft and had a modular design that allowed for easy disembarkation of personnel and vehicles. The gliders played a crucial role in various operations, including the invasion of Sicily, the Normandy beachheads, and Operation Market Garden. [Extracted from the article]

Published

2024

21. On [formula omitted] and [formula omitted] number fields ramified at a single prime.

Author

Ogasawara, Takeshi and Schaeffer, George J.

Subjects

*MODULAR forms, *POLYNOMIALS

Abstract

We present new examples of PGL 2 (F 7) and PSL 2 (F 7) number fields ramified at a single prime. To find these number fields we employ the following methods: (i) Specializing a modification of Malle's PGL 2 (F 7) polynomial, (ii) Modular method: computation of Katz modular forms of weight one over F ‾ 7 with prime level, and (iii) Searching for polynomials with prescribed ramification. Method (i) quickly generates many PGL 2 (F 7) number fields unramified at 7 including those fields ramified at only a single prime. Method (ii) can be used to show the existence of PGL 2 (F 7) or PSL 2 (F 7) number fields ramified only at primes that divide the level; we can then use method (iii) to find polynomials for those fields in many cases. [ABSTRACT FROM AUTHOR]

Published

2025

22. A classification of polyharmonic Maaß forms via quiver representations.

Author

Alfes, Claudia, Burban, Igor, and Raum, Martin

Subjects

*MODULAR forms, *CLASSIFICATION, *COMPUTERS

Abstract

We give a classification of the Harish-Chandra modules generated by the pullback to SL 2 (R) of poly harmonic Maaß forms for congruence subgroups of SL 2 (Z) with exponential growth allowed at the cusps. This extends results of Bringmann–Kudla in the harmonic case. While in the harmonic setting there are nine cases, our classification comprises ten; A new case arises in weights k > 1. To obtain the classification we introduce quiver representations into the topic and show that those associated with polyharmonic Maaß forms are cyclic, indecomposable representations of the two-cyclic or the Gelfand quiver. A classification of these transfers to a classification of polyharmonic weak Maaß forms. To realize all possible cases of Harish-Chandra modules we develop a theory of weight shifts for Taylor coefficients of vector-valued spectral families. We provide a comprehensive computer implementation of this theory, which allows us to provide explicit examples. [ABSTRACT FROM AUTHOR]

Published

2025

23. Kurokawa-Mizumoto congruence and differential operators on automorphic forms.

Author

Takeda, Nobuki

Subjects

*DIFFERENTIAL operators, *AUTOMORPHIC forms, *MODULAR forms

Abstract

We give sufficient conditions for the vector-valued Kurokawa-Mizumoto congruence related to the Klingen-Eisenstein series to hold. We also give a reinterpretation for differential operators on automorphic forms by the representation theory. [ABSTRACT FROM AUTHOR]

Published

2025

24. Orbits in lattices.

Author

Dawes, Matthew

Subjects

*COMPUTER arithmetic, *MODULAR forms, *COMPUTER performance, *MODULAR arithmetic, *ORBITS (Astronomy)

Abstract

Let L be a lattice. We exhibit algorithms for calculating Tits buildings and orbits of vectors in L for certain subgroups of the orthogonal group O (L). We discuss how these algorithms can be applied to determine the configuration of boundary components in the Baily-Borel compactification of orthogonal modular varieties and to improve the performance of computer arithmetic of orthogonal modular forms. [ABSTRACT FROM AUTHOR]

Published

2024

25. Analysis of Hasse–Weil L-function and associated entire functions applied in mathematical physics.

Author

Yang, Xiao-Jun

Subjects

*INTEGRAL functions, *RIEMANN hypothesis, *HEAT equation, *MODULAR forms, *MATHEMATICAL physics, *COSINE function

Abstract

In this paper, we study the analytic ranks of the Hasse–Weil L-function. We consider the products for the completed Hasse–Weil L-function in the framework of the theory of modular forms. We propose the new conjectures for the deformed Fourier sine and cosine integral formulas related to the completed Hasse–Weil L-functions and Mittag-Leffler function. We show the entire-function solutions for the fractional diffusion equations in mathematical physics. We also discuss the trivial zeros of the Hasse–Weil L-function. [ABSTRACT FROM AUTHOR]

Published

2024

26. Generalized L-functions related to the Riemann zeta function.

Author

Bringmann, Kathrin, Kane, Ben, and Varadharajan, Srimathi

Subjects

*MELLIN transform, *MODULAR functions, *L-functions

Abstract

In this paper, we construct generalized L-functions associated to meromorphic modular forms of weight 1 2 for the theta group with a single simple pole in the fundamental domain. We then consider their behavior toward i∞ and relate this to the Riemann zeta function. [ABSTRACT FROM AUTHOR]

Published

2024

27. Eigenspaces of newforms with nontrivial character.

Author

Karameris, Markos

Subjects

*AUTOMORPHIC forms, *HECKE algebras, *MODULAR forms

Abstract

Let 풮k(Γ0(N),χ) denote the space of holomorphic cuspforms with Dirichlet character χ and modular subgroup Γ0(N). We will characterize the space of newforms 풮knew(Γ 0(N),χ) as the intersection of eigenspaces of a particular family of Hecke operators, generalizing previous work of Baruch–Purkait to forms with nontrivial character. We achieve this by obtaining representation theoretic results in the p-adic case which we then de-adelize into relations of classical Hecke operators. [ABSTRACT FROM AUTHOR]

Published

2024

28. Splitting hypergeometric functions over roots of unity.

Author

McCarthy, Dermot and Tripathi, Mohit

Subjects

HYPERGEOMETRIC functions, MODULAR forms, SPECIAL functions, ARGUMENT

Abstract

We examine hypergeometric functions in the finite field, p-adic and classical settings. In each setting, we prove a formula which splits the hypergeometric function into a sum of lower order functions whose arguments differ by roots of unity. We provide multiple applications of these results, including new reduction and summation formulas for finite field hypergeometric functions, along with classical analogues; evaluations of special values of these functions which apply in both the finite field and p-adic settings; and new relations to Fourier coefficients of modular forms. [ABSTRACT FROM AUTHOR]

Published

2024

29. Congruences for Siegel modular forms of nonquadratic nebentypus mod p.

Author

Böcherer, Siegfried and Kikuta, Toshiyuki

Subjects

*EISENSTEIN series, *CONGRUENCE lattices, *INTEGERS, *MODULAR forms

Abstract

We prove that weights of two Siegel modular forms of nonquadratic nebentypus should satisfy some congruence relations if these modular forms are congruent to each other. Applying this result, we prove that there are no mod p singular forms of nonquadratic nebentypus. Here we consider the case where the Fourier coefficients of the modular forms are algebraic integers, and we emphasize that p is a rational prime. Moreover, we construct some examples of mod p singular forms of nonquadratic nebentypus using the Eisenstein series studied by Takemori. [ABSTRACT FROM AUTHOR]

Published

2024

30. On the Derivatives of Eta Quotients of Level Eighteen.

Author

Nagendra, P., Bhuvan, E. N., and Divyananda, P.

Subjects

*EISENSTEIN series, *MODULAR forms

Abstract

Z. S. Aygin and P. C. Toh have developed a technique using the theory of modular forms to determine all the eta quotients whose derivative is also an eta quotient up to level 36. The aim of the present paper is to develop a theory for level 18 eta quotient identities and derive all the identities of Aygin and Toh of level 18 by using this theory. [ABSTRACT FROM AUTHOR]

Published

2024

31. The cuspidal cohomology of GL3/ℚ and cubic fields.

Author

Ash, Avner and Yasaki, Dan

Subjects

*MODULAR forms, *FINITE fields

Abstract

We investigate the subspace of the homology of a congruence subgroup Γ of SL 3 (ℤ) with coefficients in the Steinberg module St (ℚ 3) which is spanned by certain modular symbols formed using the units of a totally real cubic field E. By Borel–Serre duality, H 0 (Γ , St (ℚ 3)) is isomorphic to H 3 (Γ , ℚ). The Borel–Serre duals of the modular symbols in question necessarily lie in the cuspidal cohomology H cusp 3 (Γ , ℚ). Their span is a naturally defined subspace C (Γ , E) of H cusp 3 (Γ , ℚ). Using a computer, we study where C (Γ , E) sits between 0 and H cusp 3 (Γ , ℚ). On the basis of our computations, we conjecture that ∑ E C (Γ , E) = H cusp 3 (Γ , ℚ) , and we raise the question as to whether for each E individually it might always be true that C (Γ , E) = H cusp 3 (Γ , ℚ). [ABSTRACT FROM AUTHOR]

Published

2024

32. LARGE FOURIER COEFFICIENTS OF HALF-INTEGER WEIGHT MODULAR FORMS.

Author

GUN, S., KOHNEN, W., and SOUNDARARAJAN, K.

Subjects

*MODULAR forms, *CUSP forms (Mathematics), *RESONANCE

Abstract

This article is concerned with the Fourier coefficients of cusp forms (not necessarily eigen-forms) of half-integer weight lying in the plus space. We give a soft proof that there are infinitely many fundamental discriminants D such that the Fourier coefficients evaluated at |D| are non-zero. By adapting the resonance method, we also demonstrate that such Fourier coefficients must take quite large values. [ABSTRACT FROM AUTHOR]

Published

2024

33. Topological twists of massive SQCD, Part II.

Author

Aspman, Johannes, Furrer, Elias, and Manschot, Jan

Abstract

This is the second and final part of ‘Topological twists of massive SQCD’. Part I is available at Lett. Math. Phys. 114 (2024) 3, 62. In this second part, we evaluate the contribution of the Coulomb branch to topological path integrals for N = 2 supersymmetric QCD with N f ≤ 3 massive hypermultiplets on compact four-manifolds. Our analysis includes the decoupling of hypermultiplets, the massless limit and the merging of mutually non-local singularities at the Argyres–Douglas points. We give explicit mass expansions for the four-manifolds P 2 and K3. For P 2 , we find that the correlation functions are polynomial as function of the masses, while infinite series and (potential) singularities occur for K3. The mass dependence corresponds mathematically to the integration of the equivariant Chern class of the matter bundle over the moduli space of Q-fixed equations. We demonstrate that the physical partition functions agree with mathematical results on Segre numbers of instanton moduli spaces. [ABSTRACT FROM AUTHOR]

Published

2024

34. Figurate numbers, forms of mixed type, and their representation numbers.

Author

Ramakrishnan, B. and Vaishya, Lalit

Abstract

In this article, we consider the problem of determining formulas for the number of representations of a natural number n by a sum of figurate numbers with certain positive integer coefficients. To achieve this, we prove that the associated generating function gives rise to a modular form of integral weight under certain conditions on the coefficients when even number of higher figurate numbers are considered. In particular, we obtain the modular property of the generating function corresponding to a sum of even number of triangular numbers with coefficients. We also obtain the modularity property of the generating function of mixed forms involving figurate numbers (including the squares and triangular numbers) with coefficients and forms of the type m 2 + m n + n 2 with coefficients. In particular, we show the modularity of the generating function of odd number of squares and odd number of triangular numbers (with coefficients). As a consequence, explicit formulas for the number of representations of these mixed forms are obtained using a basis of the corresponding space of modular forms of integral weight. We also obtain several applications concerning the triangular numbers with coefficients similar to the ones obtained in Ono et al. (Aequat Math 50:73–94, 1995). In 2016, Xia et al. (Int J Number Theory 12:945–954) considered some special cases of mixed forms and obtained the number of representations of these 21 mixed forms using the (p, k) parametrization method. We also derive these 21 formulas using our method and further obtain as a consequence, the (p, k) parametrization of the Eisenstein series E 4 (τ) and its duplications. It is to be noted that the (p, k) parametrization of E 4 and its duplications were derived by a different method in [3, 8]. We illustrate our method with several examples. [ABSTRACT FROM AUTHOR]

Published

2024

35. Multilayer diffusion networks as a tool to assess the structure and functioning of fine grain sub‐specific plant–pollinator networks.

Author

Allen‐Perkins, Alfonso, Hurtado, María, García‐Callejas, David, Godoy, Oscar, and Bartomeus, Ignasi

Subjects

*BIOTIC communities, *POLLEN, *PLANT species, *MODULAR construction, *MODULAR forms

Abstract

Interaction networks are a widely used tool to understand the dynamics of plant–pollinator ecological communities. However, while most mutualistic networks have been defined at the species level, ecological processes such as pollination take place at different scales, including the individual or patch levels. Yet, current approaches studying fine‐grain sub‐specific plant–pollinator networks only account for interactions among nodes belonging to a single plant species due to the conceptual and mathematical limitations of modeling simultaneously several plant species each composed of several nodes. Here, we introduce a multilayer diffusion network framework that allows modeling simple diffusion processes between nodes pertaining to the same or different layers (i.e. species). It is designed to depict from the network structure the potential conspecific and heterospecific pollen flows among plant individuals or patches. This potential pollen flow is modeled as a transport‐like system, in which pollen grain movements are represented as random‐walkers that diffuse on an ensemble of bipartite layers of conspecific plants and their shared pollinators. We exemplify this physical conceptualization using a dataset of nine fine‐grain sub‐specific plant–pollinator networks from a Mediterranean grassland of annual plants, where plant nodes represent groups of conspecifics within patches of 1 m2. The diffusion networks show pollinators effectively connecting sets of patches of the same and different plant species, forming a modular structure. Interestingly, different properties of the network structure, such as the conspecific pollen arrival probability and the number of conspecific subgraphs in which plants are embedded, are critical for the seed production of different plant species. We provide a simple but robust set of metrics to calculate potential pollen flow and scale down network ecology to functioning properties at the individual or patch level, where most ecological processes take place, hence moving forward the description and interpretation of species‐rich communities across scales. [ABSTRACT FROM AUTHOR]

Published

2024

36. Congruence classes for modular forms over small sets.

Author

Bhakta, Subham, Krishnamoorthy, Srilakshmi, and Muneeswaran, R.

Subjects

*PRIME factors (Mathematics), *MODULAR forms, *EXPONENTIAL sums, *GEOMETRIC congruences, *INTEGERS

Abstract

Serre showed that for any integer m , a (n) ≡ 0 (mod m) for almost all n , where a (n) is the n th Fourier coefficient of any modular form with rational coefficients. In this paper, we consider a certain class of cuspforms and study # { a (n) (mod m) } n ≤ x over the set of integers with O (1) many prime factors. Moreover, we show that any residue class a ∈ ℤ / m ℤ can be written as the sum of at most 13 Fourier coefficients, which are polynomially bounded as a function of m. [ABSTRACT FROM AUTHOR]

Published

2024

37. On the non-vanishing of Fourier coefficients of half-integral weight cuspforms.

Author

Min, Jun-Hwi

Subjects

*MODULAR forms

Abstract

We prove the best possible upper bounds of the gaps between non-vanishing Fourier coefficients of half-integral weight cuspforms. This improves the works of Balog–Ono and Thorner. We also show an asymptotic formula of central modular L -values for short intervals. [ABSTRACT FROM AUTHOR]

Published

2024

38. The distribution of Manin's iterated integrals of modular forms.

Author

Matthes, Nils and Risager, Morten S.

Subjects

*ITERATED integrals, *ASYMPTOTIC distribution, *MODULAR forms

Abstract

We determine the asymptotic distribution of Manin's iterated integrals of length at most 2. For all lengths, we compute all the asymptotic moments. We show that if the length is at least 3, these moments do in general not determine a unique distribution. [ABSTRACT FROM AUTHOR]

Published

2024

39. Six-dimensional sphere packing and linear programming.

Author

de Courcy-Ireland, Matthew, Dostert, Maria, and Viazovska, Maryna

Subjects

*LINEAR programming, *SPHERE packings, *MODULAR forms, *MATHEMATICS

Abstract

We prove that the Cohn–Elkies linear programming bound for sphere packing is not sharp in dimension 6. The proof uses duality and optimization over a space of modular forms, generalizing a construction of Cohn–Triantafillou [Math. Comp. 91 (2021), pp. 491–508] to the case of odd weight and non-trivial character. [ABSTRACT FROM AUTHOR]

Published

2024

40. Quinary forms and paramodular forms.

Author

Dummigan, N., Pacetti, A., Rama, G., and Tornaría, G.

Subjects

*MODULAR forms, *BANACH lattices, *ALGEBRA, *QUATERNIONS, *EIGENVALUES, *BUZZARDS, *LOGICAL prediction

Abstract

We work out the exact relationship between algebraic modular forms for a two-by-two general unitary group over a definite quaternion algebra, and those arising from genera of positive-definite quinary lattices, relating stabilisers of local lattices with specific open compact subgroups, paramodular at split places, and with Atkin-Lehner operators. Combining this with the recent work of Rösner and Weissauer, proving conjectures of Ibukiyama on Jacquet-Langlands type correspondences (mildly generalised here), provides an effective tool for computing Hecke eigenvalues for Siegel modular forms of degree two and paramodular level. It also enables us to prove examples of congruences of Hecke eigenvalues connecting Siegel modular forms of degrees two and one. These include some of a type conjectured by Harder at level one, supported by computations of Fretwell at higher levels, and a subtly different congruence discovered experimentally by Buzzard and Golyshev. [ABSTRACT FROM AUTHOR]

Published

2024

41. A note on odd partition numbers.

Author

Griffin, Michael and Ono, Ken

Abstract

Ramanujan's partition congruences modulo ℓ ∈ { 5 , 7 , 11 } assert that p (ℓ n + δ ℓ) ≡ 0 (mod ℓ) , where 0 < δ ℓ < ℓ satisfies 24 δ ℓ ≡ 1 (mod ℓ). By proving Subbarao's conjecture, Radu showed that there are no such congruences when it comes to parity. There are infinitely many odd (resp. even) partition numbers in every arithmetic progression. For primes ℓ ≥ 5 , we give a new proof of the conclusion that there are infinitely many m for which p (ℓ m + δ ℓ) is odd. This proof uses a generalization, due to the second author and Ramsey, of a result of Mazur in his classic paper on the Eisenstein ideal. We also refine a classical criterion of Sturm for modular form congruences, which allows us to show that the smallest such m satisfies m < (ℓ 2 - 1) / 24 , representing a significant improvement to the previous bound. [ABSTRACT FROM AUTHOR]

Published

2024

42. Ericksen-Landau Modular Strain Energies for Reconstructive Phase Transformations in 2D Crystals.

Author

Arbib, Edoardo, Biscari, Paolo, Patriarca, Clara, and Zanzotto, Giovanni

Subjects

PHASE transitions, STRAIN energy, MODULAR functions, CRYSTALS, SYMMETRY groups

Abstract

By using modular functions on the upper complex half-plane, we study a class of strain energies for crystalline materials whose global invariance originates from the full symmetry group of the underlying lattice. This follows Ericksen's suggestion which aimed at extending the Landau-type theories to encompass the behavior of crystals undergoing structural phase transformation, with twinning, microstructure formation, and possibly associated plasticity effects. Here we investigate such Ericksen-Landau strain energies for the modelling of reconstructive transformations, focusing on the prototypical case of the square-hexagonal phase change in 2D crystals. We study the bifurcation and valley-floor network of these potentials, and use one in the simulation of a quasi-static shearing test. We observe typical effects associated with the micro-mechanics of phase transformation in crystals, in particular, the bursty progress of the structural phase change, characterized by intermittent stress-relaxation through microstructure formation, mediated, in this reconstructive case, by defect nucleation and movement in the lattice. [ABSTRACT FROM AUTHOR]

Published

2024

43. Lambda-invariants of Mazur–Tate elements attached to Ramanujan's tau function and congruences with Eisenstein series.

Author

Doyon, Anthony and Lei, Antonio

Subjects

*MODULAR forms, *EISENSTEIN series, *GEOMETRIC congruences

Abstract

Let p ∈ { 3 , 5 , 7 } and let Δ denote the weight twelve modular form arising from Ramanujan's tau function. We show that Δ is congruent to an Eisenstein series E k , χ , ψ modulo p for explicit choices of k and Dirichlet characters χ and ψ . We then prove formulae describing the Iwasawa invariants of the Mazur–Tate elements attached to Δ , confirming numerical data gathered by the authors in a previous work. [ABSTRACT FROM AUTHOR]

Published

2024

44. D-brane Masses at Special Fibres of Hypergeometric Families of Calabi–Yau Threefolds, Modular Forms, and Periods.

Author

Bönisch, Kilian, Klemm, Albrecht, Scheidegger, Emanuel, and Zagier, Don

Subjects

*MODULAR forms, *QUINTIC equations, *ZETA functions, *FINITE fields, *MIRROR symmetry, *D-branes, *EIGENVALUES

Abstract

We consider the fourteen families W of Calabi–Yau threefolds with one complex structure parameter and Picard–Fuchs equation of hypergeometric type, like the mirror of the quintic in P 4 . Mirror symmetry identifies the masses of even-dimensional D-branes of the mirror Calabi–Yau M with four periods of the holomorphic (3, 0)-form over a symplectic basis of H 3 (W , Z) . It was discovered by Chad Schoen that the singular fiber at the conifold of the quintic gives rise to a Hecke eigenform of weight four under Γ 0 (25) , whose Hecke eigenvalues are determined by the Hasse–Weil zeta function which can be obtained by counting points of that fiber over finite fields. Similar features are known for the thirteen other cases. In two cases we further find special regular points, so called rank two attractor points, where the Hasse–Weil zeta function gives rise to modular forms of weight four and two. We numerically identify entries of the period matrix at these special fibers as periods and quasiperiods of the associated modular forms. In one case we prove this by constructing a correspondence between the conifold fiber and a Kuga–Sato variety. We also comment on simpler applications to local Calabi–Yau threefolds. [ABSTRACT FROM AUTHOR]

Published

2024

45. Multiplier systems for Siegel modular groups.

Author

Freitag, Eberhard and Hauffe-Waschbüsch, Adrian

Subjects

*AUTOMORPHIC forms, *COMPLEX numbers, *MODULAR forms, *ABSOLUTE value, *MODULAR groups, *MATHEMATICS

Abstract

Deligne proved in [Extensions centrales non résiduellement finies de groupes arithmetiques, C. R. Acad. Sci. Paris 287 (1978) 203–208] (see also 7.1 in [R. Hill, Fractional weights and non-congruence subgroups, in Automorphic Forms and Representations of Algebraic Groups Over Local Fields, eds. H. Saito and T. Takahashi, Surikenkoukyuroku Series, Vol. 1338 (2003), pp. 71–80]) that the weights of Siegel modular forms on any congruence subgroup of the Siegel modular group of genus g > 1 must be integral or half integral. Actually he proved that for a system v (M) of complex numbers of absolute value 1 v (M) det (C Z + D) r (r ∈ ℝ) (0. 1) can be an automorphy factor only if 2 r is integral. We give a different proof for this. It uses Mennicke's result [Zur Theorie der Siegelschen Modulgruppe, Math. Ann. 159 (1965) 115–129] that subgroups of finite index of the Siegel modular group are congruence subgroups and some techniques from [Solution of the congruence subgroup problem for SL n (n ≥ 3) and Sp 2 n (n ≥ 2) , Publ. Math. Inst. Hautes Études Sci. 33 (1967) 59–137] of Bass–Milnor–Serre. [ABSTRACT FROM AUTHOR]

Published

2024

46. Reflective obstructions of unitary modular varieties.

Author

Maeda, Yota

Subjects

*MODULAR forms, *CUSP forms (Mathematics), *MODULAR construction, *HERMITIAN forms

Abstract

To prove that a modular variety is of general type, there are three types of obstructions: reflective, cusp and elliptic obstructions. In this paper, we give a quantitative estimate of the reflective obstructions for the unitary case. This shows in particular that the reflective obstructions are small enough in higher dimension, say greater than 138. Our result reduces the study of the Kodaira dimension of unitary modular varieties to the construction of a cusp form of small weight in a quantitative manner. As a byproduct, we formulate and partially prove the finiteness of Hermitian lattices admitting reflective modular forms, which is a unitary analog of the conjecture by Gritsenko-Nikulin in the orthogonal case. Our estimate of the reflective obstructions uses Prasad's volume formula. [ABSTRACT FROM AUTHOR]

Published

2024

47. On universality in short intervals for zeta-functions of certain cusp forms.

Author

Laurinčikas, Antanas and Šiaučiūnas, Darius

Subjects

*LIMIT theorems, *ZETA functions, *MODULAR groups, *ANALYTIC functions, *ANALYTIC spaces, *MODULAR forms, *CUSP forms (Mathematics)

Abstract

In this paper, we consider universality in short intervals for the zeta-function attached to a normalized Hecke-eigen cusp form with respect to the modular group. For this, we apply a conjecture for the mean square in short interval on the critical strip for that zeta-function. The proof of the obtained universality theorem is based on a probabilistic limit theorem in the space of analytic functions. [ABSTRACT FROM AUTHOR]

Published

2024

48. Lie invariant Frobenius lifts.

Author

Buium, Alexandru

Subjects

*ELLIPTIC curves, *DIFFERENTIAL forms, *LINEAR algebraic groups, *MODULAR forms

Abstract

We begin with the observation that the p -adic completion of any affine elliptic curve with ordinary reduction possesses Frobenius lifts ϕ that are "Lie invariant mod p " in the sense that the "normalized" action of ϕ on 1-forms preserves mod p the space of invariant 1-forms. Our main result is that, after removing the 2-torsion sections, the above situation can be "infinitesimally deformed" in the sense that the above mod p result has a mod p 2 analogue. We end by showing that, in contrast with the case of elliptic curves, the following holds: if G is a linear algebraic group over a number field and if G is not a torus then for all but finitely many primes p the p -adic completion of G does not possess a Frobenius lift that is Lie invariant mod p. [ABSTRACT FROM AUTHOR]

Published

2024

49. Universal sums of triangular numbers and squares.

Author

Yang, Zichen

Subjects

*POLYGONAL numbers, *MODULAR forms

Abstract

In this paper, we study universal sums of triangular numbers and squares. Specifically, we prove that a sum of triangular numbers and squares is universal if and only if it represents 1 , 2 , 3 , 4 , 5 , 6 , 7 , 8 , 10 , 13 , 14 , 15 , 18 , 19 , 20 , 23 , 27 , 28 , 34 , 41 , 47 , and 48. [ABSTRACT FROM AUTHOR]

Published

2024

50. Computations on overconvergence rates related to the Eisenstein family.

Author

Advocaat, Bryan

Subjects

*EISENSTEIN series, *MODULAR forms, *FAMILIES

Abstract

We provide for primes p ≥ 5 a method to compute valuations appearing in the "formal" Katz expansion of the family E κ ⁎ V (E κ ⁎) derived from the family of Eisenstein series E κ ⁎. We will describe two algorithms: the first one to compute the Katz expansion of an overconvergent modular form and the second one, which uses the first algorithm, to compute valuations appearing in the "formal" Katz expansion. Based on data obtained using these algorithms we make a precise conjecture about a constant appearing in the overconvergence rates related to the classical Eisenstein series at level p. The study of these overconvergence rates of the members of this family goes back to a conjecture of Coleman. [ABSTRACT FROM AUTHOR]

Published

2024