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The Fourier series is a powerful mathematical tool for representing periodic signals as an infinite sum of complex exponentials. In practice, this infinite series is truncated to a finite number of terms, yielding a partial sum. This truncation makes the approximation of the signal feasible but introduces certain challenges, particularly near discontinuities, known as the Gibbs phenomenon.
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The structure of a crystalline solid, whether a metal or not, is best described by considering its simplest repeating unit, which is referred to as its unit cell. The unit cell consists of lattice points that represent the locations of atoms or ions. The entire structure then consists of this unit cell repeating in three dimensions. The three different types of unit cells present in the cubic lattice are illustrated in Figure 1.
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Updated: Jul 14, 2025

Construction and Systematical Symmetric Studies of a Series of Supramolecular Clusters with Binary or Ternary Ammonium Triphenylacetates
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Construction and Systematical Symmetric Studies of a Series of Supramolecular Clusters with Binary or Ternary Ammonium Triphenylacetates

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Supercongruences involving Domb numbers and binary quadratic forms.

Guo-Shuai Mao1, Michael J Schlosser2

  • 1Department of Mathematics, Nanjing University of Information Science and Technology, Nanjing, 210044 People's Republic of China.

Revista De La Real Academia De Ciencias Exactas, Fisicas Y Naturales. Serie A, Matematicas
|October 6, 2023
PubMed
Summary

This study proves two supercongruences related to Domb numbers. The findings advance number theory by confirming conjectures on truncated sums involving these mathematical objects.

Keywords:
Binary quadratic formsBinomial coefficientsCongruencesDomb numbers

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Area of Science:

  • Number Theory
  • Combinatorics
  • Algebraic Number Theory

Background:

  • Supercongruences are a class of congruences that hold in a stronger sense than usual.
  • Domb numbers and their associated truncated sums are objects of interest in number theory and combinatorics.
  • Zhi-Hong Sun recently proposed several conjectures regarding these sums.

Purpose of the Study:

  • To rigorously prove two specific supercongruence conjectures posed by Zhi-Hong Sun.
  • To establish new results concerning truncated sums involving Domb numbers modulo prime powers.

Main Methods:

  • Utilizing congruences involving specialized Bernoulli polynomials.
  • Applying properties of harmonic numbers and binomial coefficients.
  • Employing techniques from hypergeometric summation and transformation identities.

Main Results:

  • Successfully proved two conjectured supercongruences for truncated Domb number sums.
  • Demonstrated the validity of these congruences modulo primes p > 3.

Conclusions:

  • The paper confirms significant conjectures in the area of number theory.
  • The methods provide a framework for analyzing similar congruences in the future.