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Related papers: On generalized modular forms supported on cuspidal…

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We investigate when the categories of all rational $A$-modules and of finite dimensional rational modules are closed under extensions inside the category of $C^*$-modules, where $C^*$ is the cofinite topological completion of $A$. We give a…

Category Theory · Mathematics 2011-10-13 Miodrag C. Iovanov

We give upper bounds on the size of the gap between a non-zero constant term and the next non-zero Fourier coefficient of an entire level two modular form. We give upper bounds for the minimum positive integer represented by a level two…

Number Theory · Mathematics 2015-06-26 Barry Brent

Let $A$ be the one point extension of an algebra $B$ by a projective $B$-module. We prove that the extension of a given support $\tau$-tilting $B$-module is a support $\tau$-tilting $A$-module; and, conversely, the restriction of a given…

Representation Theory · Mathematics 2017-05-23 Pamela Suarez

Several authors have recently proved results which express cusp forms as $p$-adic limits of weakly holomorphic modular forms under repeated application of Atkin's $U$-operator. The proofs involve techniques from the theory of weak harmonic…

Number Theory · Mathematics 2016-02-03 Scott Ahlgren , Detchat Samart

In two previous papers we used the geometry of complete polyhedral fans to construct a subring $\TTT (l)$ of the modular forms on $\Gamma_{1} (l)$, and showed that for weight two the cuspidal part of $\TTT (l)$ coincides with the space of…

Number Theory · Mathematics 2007-05-23 Lev A. Borisov , Paul E. Gunnells

In this note, we prove that there exists a classical Hilbert modular cusp form over Q(\sqrt{5}) of partial weight one which does not arise from the induction of a Grossencharacter from a CM extension of Q(\sqrt{5}).

Number Theory · Mathematics 2015-04-21 Richard A. Moy , Joel Specter

We continue our investigations of bilinear sums with modular square roots and the large sieve for square moduli in our recent article "On bilinear sums with modular square roots and applications II", arXiv:2603.00768. In the present…

Number Theory · Mathematics 2026-04-07 Stephan Baier

The modularity theorem implies that for every elliptic curve $E /\mathbb{Q}$ there exist rational maps from the modular curve $X_0(N)$ to $E$, where $N$ is the conductor of $E$. These maps may be expressed in terms of pairs of modular…

Number Theory · Mathematics 2020-03-04 Michael Griffin , Jonathan Hales

We conjecture that, for a fixed prime $p$, rational elliptic curves with higher rank tend to have more points mod $p$. We show that there is an analogous bias for modular forms with respect to root numbers, and conjecture that the order of…

Number Theory · Mathematics 2023-01-25 Kimball Martin , Thomas Pharis

The well-known fact that all elliptic curves are modular, proven by Wiles, Taylor, Breuil, Conrad and Diamond, leaves open the question whether there exists a 'nice' representation of the modular form associated to each elliptic curve. Here…

Number Theory · Mathematics 2012-02-03 Eugene Yoong , David Pathakjee , Zef Rosnbrick

We survey the progress (or lack thereof!) that has been made on some questions about the p-adic slopes of modular forms that were raised by the first author in [Buz05], discuss strategies for making further progress, and examine other…

Number Theory · Mathematics 2016-04-12 Kevin Buzzard , Toby Gee

Generalising a seminal result of Epstein and Penner for cusped hyperbolic manifolds, Cooper and Long showed that each decorated strictly convex projective cusped manifold has a canonical cell decomposition. Penner used the former result to…

Geometric Topology · Mathematics 2019-11-12 Robert Haraway , Robert Löwe , Dominic Tate , Stephan Tillmann

We define local indices for projective umbilics and godrons (also called cusps of Gauss) on generic smooth surfaces in projective 3-space. By means of these indices, we provide formulas that relate the algebraic numbers of those…

Differential Geometry · Mathematics 2020-05-08 Maxim Kazarian , Ricardo Uribe-Vargas

We give a short and "soft" proof of the asymptotic orthogonality of Fourier coefficients of Poincar\'e series for classical modular forms as well as for Siegel cusp forms, in a qualitative form.

Number Theory · Mathematics 2014-01-14 Emmanuel Kowalski , Abhishek Saha , Jacob Tsimerman

We prove a non-minimal modularity lifting theorem for ordinary Galois representations over imaginary quadratic fields, conditional on a local-global compatibility conjecture for ordinary torsion classes.

Number Theory · Mathematics 2019-07-23 Frank Calegari

In this paper, we study the structure, deformations and the moduli spaces of complex projective surfaces admitting genus two fibrations over elliptic curves. We observe that, a surface admitting a smooth fibration as above is elliptic and…

Algebraic Geometry · Mathematics 2007-05-23 Gulay Kaya

Based on the theory of $L$-series associated with weakly holomorphic modular forms in \cite{DLRR}, we derive explicit formulas for central values of derivatives of $L$-series as integrals with limits inside the upper half-plane. This has…

Number Theory · Mathematics 2022-09-20 Nikolaos Diamantis , Fredrik Strömberg

We show that there are primitive holomorphic modular forms f of weight two and arbitrary large level N such that $|f(z)| \gg N^{1/4}$ for some point z. Thereby we disprove a folklore conjecture that the sup-norm of such forms would be as…

Number Theory · Mathematics 2013-09-23 Nicolas Templier

We show that if a universal quadratic form exists over an infinite degree, totally real extension of the field of rationals $\mathbb{Q}$, then the set of totally positive integers in the extension does not have the Northcott property. In…

Number Theory · Mathematics 2024-11-26 Nicolas Daans , Vítězslav Kala , Siu Hang Man

We give a new proof of a result due to Breuil and Emerton which relates the splitting behavior at p of the p-adic Galois representation attached to a p-ordinary modular form to the existence of an overconvergent p-adic companion form for f.

Number Theory · Mathematics 2016-06-28 John Bergdall