Jove
Visualize
Contact Us
JoVE
x logofacebook logolinkedin logoyoutube logo
ABOUT JoVE
OverviewLeadershipBlogJoVE Help Center
AUTHORS
Publishing ProcessEditorial BoardScope & PoliciesPeer ReviewFAQSubmit
LIBRARIANS
TestimonialsSubscriptionsAccessResourcesLibrary Advisory BoardFAQ
RESEARCH
JoVE JournalMethods CollectionsJoVE Encyclopedia of ExperimentsArchive
EDUCATION
JoVE CoreJoVE BusinessJoVE Science EducationJoVE Lab ManualFaculty Resource CenterFaculty Site
Terms & Conditions of Use
Privacy Policy
Policies

Related Concept Videos

Types of Responses of Series RLC Circuits01:11

Types of Responses of Series RLC Circuits

849
A second-order differential equation characterizes a source-free series RLC circuit, marking its distinct mathematical representation. The complete solution of this equation is a blend of two unique solutions, each linked to the circuit's roots expressed in terms of the damping factor and resonant frequency.
849
Euler's Formula for Pin-Ended Columns01:21

Euler's Formula for Pin-Ended Columns

291
In structural engineering, the stability of columns under compressive axial loads is a critical consideration, described as buckling. A typical example involves a column PQ, which is pin-connected at both ends and subjected to a centric axial load F applied at one end, with a reaction force of F' = -F at the other end. Here, it is crucial to understand that when an applied load exceeds the critical load, buckling occurs as the system becomes unstable.
To calculate the critical load,...
291
Exponential Fourier series01:24

Exponential Fourier series

179
In audio signal processing, the exponential Fourier series plays a crucial role in sound synthesis, allowing complex sounds to be broken down into simpler sinusoidal components. This decomposition process is fundamental in analyzing and reconstructing musical notes and other audio signals. The exponential Fourier series expresses periodic signals as the sum of complex exponentials at both positive and negative harmonic frequencies, providing a powerful tool for signal analysis.
Euler's identity...
179
Routh-Hurwitz Criterion II01:19

Routh-Hurwitz Criterion II

192
In the application of the Routh-Hurwitz criterion, two specific scenarios can arise that complicate stability analysis.
The first scenario occurs when a singular zero appears in the first column of the Routh table. This situation creates a division by zero issues. To resolve this, a small positive or negative number, denoted as epsilon (∈), is substituted for the zero. The stability analysis proceeds by assuming a sign for ∈. If ∈ is positive, any sign change in the first...
192
Linear Approximation in Time Domain01:21

Linear Approximation in Time Domain

64
Nonlinear systems often require sophisticated approaches for accurate modeling and analysis, with state-space representation being particularly effective. This method is especially useful for systems where variables and parameters vary with time or operating conditions, such as in a simple pendulum or a translational mechanical system with nonlinear springs.
For a simple pendulum with a mass evenly distributed along its length and the center of mass located at half the pendulum's length,...
64
Inverse z-Transform by Partial Fraction Expansion01:20

Inverse z-Transform by Partial Fraction Expansion

290
The inverse z-transform is a crucial technique for converting a function from its z-domain representation back to the time domain. One effective method for finding the inverse z-transform is the Partial Fraction Method, which involves decomposing a function into simpler fractions with distinct coefficients. These fractions correspond to known z-transform pairs, facilitating the inverse transformation process.
To begin the process, the poles of the function are identified and the function is...
290

You might also read

Related Articles

Articles linked to this work by shared authors, journal, and citation graph.

Sort by
Same author

A constitutive interferon-high immunophenotype defines response to immunotherapy in colorectal cancer.

Cancer cell·2025
Same author

Predicting cardiovascular events with fluoropyrimidine chemotherapy using a standard cardiovascular risk calculator.

ESC heart failure·2024
Same author

A Randomized, Controlled Comparison of NCX 470, a Nitric Oxide-Donating Bimatoprost, and Latanoprost in Subjects with Open-Angle Glaucoma or Ocular Hypertension: The MONT BLANC Study.

American journal of ophthalmology·2024
Same author

Previous immune checkpoint inhibitor therapy is associated with decreased COVID-19-related hospitalizations and complications in patients with cancer: Results of a propensity-matched analysis of the OnCovid registry.

International journal of infectious diseases : IJID : official publication of the International Society for Infectious Diseases·2023
Same author

Combination Systemic Therapies in Advanced Well-Differentiated Gastroenteropancreatic Neuroendocrine Tumors (GEP-NETs): A Comprehensive Review of Clinical Trials and Prospective Studies.

Biology·2023
Same author

SARS-CoV-2 omicron (B.1.1.529)-related COVID-19 sequelae in vaccinated and unvaccinated patients with cancer: results from the OnCovid registry.

The Lancet. Oncology·2023

Related Experiment Video

Updated: Jun 7, 2025

The Generation of Higher-order Laguerre-Gauss Optical Beams for High-precision Interferometry
12:14

The Generation of Higher-order Laguerre-Gauss Optical Beams for High-precision Interferometry

Published on: August 12, 2013

21.7K

Period-like polynomials for L-series associated with half-integral weight cusp forms.

James Branch1, Nikolaos Diamantis1, Wissam Raji2

  • 1University of Nottingham, Nottingham, UK.

Research in the Mathematical Sciences
|November 20, 2024
PubMed
Summary

Researchers constructed polynomials from L-series of half-integral weight cusp forms, similar to classical period polynomials. They also developed a compatible lift from half-integral to integral weight cusp forms.

More Related Videos

A Millimeter Scale Flexural Testing System for Measuring the Mechanical Properties of Marine Sponge Spicules
11:25

A Millimeter Scale Flexural Testing System for Measuring the Mechanical Properties of Marine Sponge Spicules

Published on: October 11, 2017

9.3K
Stretching Short Sequences of DNA with Constant Force Axial Optical Tweezers
08:48

Stretching Short Sequences of DNA with Constant Force Axial Optical Tweezers

Published on: October 13, 2011

13.0K

Related Experiment Videos

Last Updated: Jun 7, 2025

The Generation of Higher-order Laguerre-Gauss Optical Beams for High-precision Interferometry
12:14

The Generation of Higher-order Laguerre-Gauss Optical Beams for High-precision Interferometry

Published on: August 12, 2013

21.7K
A Millimeter Scale Flexural Testing System for Measuring the Mechanical Properties of Marine Sponge Spicules
11:25

A Millimeter Scale Flexural Testing System for Measuring the Mechanical Properties of Marine Sponge Spicules

Published on: October 11, 2017

9.3K
Stretching Short Sequences of DNA with Constant Force Axial Optical Tweezers
08:48

Stretching Short Sequences of DNA with Constant Force Axial Optical Tweezers

Published on: October 13, 2011

13.0K

Area of Science:

  • Number Theory
  • Automorphic Forms
  • Complex Analysis

Background:

  • Cusp forms are fundamental objects in number theory, particularly in the study of modular forms.
  • L-series encode arithmetic information about number theoretic objects.
  • Integral and half-integral weight cusp forms have distinct properties and applications.

Purpose of the Study:

  • To generalize the concept of period polynomials to half-integral weight cusp forms.
  • To establish a method for lifting half-integral weight cusp forms to integral weight cusp forms.
  • To ensure the compatibility of L-series between the lifted and original forms.

Main Methods:

  • Construction of polynomials derived from the L-series of half-integral weight cusp forms.
  • Development of a novel lifting procedure from half-integral to integral weight cusp forms.
  • Verification of L-series compatibility using established properties of automorphic forms.

Main Results:

  • Successfully constructed polynomials analogous to classical period polynomials for half-integral weight cusp forms.
  • Defined a lift that maps half-integral weight cusp forms to integral weight cusp forms.
  • Demonstrated that the L-series of the lifted integral weight form are compatible with the L-series of the original half-integral weight form.

Conclusions:

  • The study extends the theory of period polynomials to a broader class of cusp forms.
  • The developed lift provides a valuable tool for relating half-integral and integral weight automorphic forms.
  • This work deepens the understanding of the interplay between L-series and the structure of cusp forms.