An elliptic curve test of the L-Functions Ratios Conjecture

An elliptic curve test of the L-Functions Ratios Conjecture by Duc Khiem Huynh, Steven J. Miller* and Ralph Morrison at *Williams College ...

Iwasawa theory for elliptic curves at supersingular primes: A pair of main conjectures

Iwasawa theory for elliptic curves at supersingular primes: A pair of main conjectures by Florian Sprung...

The sequence of middle divisors is unbounded

The sequence of middle divisors is unbounded - The sequence of middle divisors is shown to be unbounded. For a given number n, an,0 is the number of divisors of n in between n/2‾‾‾√ and 2n‾‾‾√. We exp...

On the Behaviour of p-adic L-functions

On the Behaviour of p-adic L-functions by Prof. Tauno Metsänkylä of the University of Turku's Department of Mathematics ...

Platonic Solids In Z^3

Platonic Solids In Z^3 by Eugen J. Ionascu and Andrei Markov at Columbus State University's Department of Mathematics ...

Critical numbers of intervals

Critical numbers of intervals - YouTube...

The optimal constants of the mixed $\left( \ell _{1},\ell _{2}\right)$-Littlewood inequality

The optimal constants of the mixed $left( ell _{1},ell _{2}right)$-Littlewood inequality - YouTube...

The multinorm principle for linearly disjoint Galois extensions

The multinorm principle for linearly disjoint Galois extensions by Pollio and Rapinchuk from the Department of Mathematics at the University of Virginia...

An Application of Fourier Transforms...

Fan Application of Fourier Transforms on Finite Abelian Groups to an Enumeration Arising from the Josephus Problem by Gregory L. Wilson, Ph.D. of BerrieHill Research Corporation and Christopher L. Mor...

Congruences for rs(n)

Congruences for rs(n) by Shi-Chao Chen at the School of Mathematics and Information Sciences at Henan University...

Small generators of quadratic fields and reduced elements

Small generators of quadratic fields and reduced elements by Kihel and Lizotte from Brock University's Department of Mathematics...

On the zeta function associated with module classes of a number field

On the zeta function associated with module classes of a number field by Xia Gao of the School of Mathematics at Peking University...

Congruences for central binomial sums and finite polylogarithms

Congruences for central binomial sums and finite polylogarithms by Mattarei and Tauraso* of the *Dipartimento di Matematica Universit`a di Roma Tor Vergata...

Sets characterized by missing sums and differences in dilating polytopes

Sets characterized by missing sums and differences in dilating polytopes - YouTube...

The Bowman-Bradley theorem for multiple zeta-star values

The Bowman-Bradley theorem for multiple zeta-star values by Kondo et al. from the Institute of Mathematics for Industry at Kyushu University...

On certain properties of harmonic numbers

On certain properties of harmonic numbers. Let Hn be the n -th harmonic number and let un be its numerator. For any prime p , let Jp be the set of positive integers n with p|un. In 1991, Eswaratha...

On Li's Criterion for the Riemann Hypothesis for the Selberg Class

On Li's Criterion for the Riemann Hypothesis for the Selberg Class by Lejla Smajlovic, Ph.D. of the Department of Mathematics at the University of Sarajevo...

Quadratic fields with cyclic 2-class groups

Quadratic fields with cyclic 2-class groups by Dominguez C. and Miller, S. from Williams College's Mathematics and Statistics Bronfman Science Center...

Generating weights for the Weil representation attached to an even order cyclic quadratic module

Generating weights for the Weil representation attached to an even order cyclic quadratic module ...

The Hyperelliptic Integrals and $\pi $

The Hyperelliptic Integrals and pi by Giovanni Mingari Scarpello of the Dipartimento di Matematica per le scienze economiche e socialiviale...