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Bernoulli number
Accessing Bernoulli-Numbers by Matrix-Operations Gottfried Helms 3'2006 Version 2.3
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Sums of Powers and the Bernoulli Numbers Laura Elizabeth S
The Structure of Bernoulli Numbers
Tight Bounds on the Mutual Coherence of Sensing Matrices for Wigner D-Functions on Regular Grids
Higher Order Bernoulli and Euler Numbers
Approximation Properties of G-Bernoulli Polynomials
Euler-Maclaurin Summation Formula
Mathstudio Manual
Degenerate Bernoulli Polynomials, Generalized Factorial Sums, and Their Applications
CONGRUENCES and RECURRENCES for BERNOULLI NUMBERS of HIGHER ORDER F. T. Howard = Y # (
Prerequisities [Adam Marlewski 2014-03-03 Draft] 1/16
Compactness and Contradiction Terence
An Arithmetical Theory of the Bernoulli Numbers
Alternative Proofs of a Formula for Bernoulli Numbers in Terms of Stirling Numbers
Title Parametric Stokes Phenomena and Voros Coefficients of the Second Painleve Equation
Beautiful Mathematics
Figurate Numbers and Sums of Numerical Powers: Fermat, Pascal, Bernoulli
Top View
On Asymptotic Constants Related to Products of Bernoulli Numbers and Factorials
On Explicit Formulae for Bernoulli Numbers and Their Counterparts in Positive Characteristic
2.7 Fast Computation of Bernoulli Numbers
Euler-Maclaurin Formula and Stirling Approximation
Superior Mathematics from an Elementary Point of View ” Course Notes Jacopo D’Aurizio
Figurate Numbers and Sums of Numerical Powers: Fermat, Pascal, Bernoulli
Parametric Stokes Phenomena and Voros Coefficients of the Second Painlevé Equation
Euler-Maclaurin Summation Formula, Physics 2400
Bernoulli Numbers and Polynomials
Bernoulli Numbers: from Ada Lovelace to the Debye Functions Amelia Carolina Sparavigna
On Computational Applications of the Levi-Civita Field
CONGRUENCES and RECURRENCES for BERNOULLI NUMBERS of HIGHER ORDER F. T. Howard = Y # (
An Introduction to the Bernoulli Function
The Elementary Mathematical Works of Leonhard Euler (1707 – 1783) Paul Yiu Department of Mathematics Florida Atlantic University Summer 19991
Bernoulli Numbers*
Riemann-Hypothesis-No.1
Bernoulli Numbers and the Unity of Mathematics
A Reader's Guide to Euler's Introductio
Summability Calculus
Bernoulli Numbers, Hurwitz Numbers, P-Adic L-Functions and Kummer's Criterion
Bernoulli Numbers John C
TWO CLOSED FORMS for the BERNOULLI POLYNOMIALS 1. Introduction It Is Common Knowledge That the Bernoulli Numbers and Polynomials
Bernoulli Numbers and Various Consequences
Boundary Kernel Functions for Domains on Complex Manifolds
The Bernoulli Numbers
Integrable Systems and Topology of Isospectral Manifolds 3
Alternating Euler Sums at the Negative Integers
Bernoulli Numbers
Generalized Higher Order Bernoulli Number Pairs and Generalized Stirling Number Pairs
The Bernoulli Numbers: a Brief Primer
Appendix Curious and Exotic Identities for Bernoulli Numbers
Two Formulas for Successive Derivatives and Their Applications
A Comprehensive Treatment of Q-Calculus
Euler-Maclaurin Summation Formula, Physics 2400
Bernoulli Numbers and Their Applications
What Are the Bernoulli Numbers?
Fast Computation of Bernoulli, Tangent and Secant Numbers
Arxiv:1908.01571V5 [Math.HO] 3 May 2020 Contents
A Note on Bernoulli Numbers