Sequences of irreducible polynomials over odd prime fields via elliptic curve endomorphisms

Sequences of irreducible polynomials over odd prime fields via elliptic curve endomorphisms - Ugolini, S. - Dipartimento di Matematica, Università degli studi di Trento, Povo (Trento), ITALY...

A Construction of v-adic Modular Forms

"A Construction of v-adic Modular Forms " by Goss, David @ Department of Mathematics, The Ohio State University...

Explicit computation of Gross-Stark units over real quadratic fields

Explicit computation of Gross-Stark units over real quadratic fields by Tangedal and Young from the Department of Mathematics at the College of Charleston...

On p-adic multiple zeta and log gamma functions

On p-adic multiple zeta and log gamma functions by Brett A. Tangedal and Paul T. Young form the Department of Mathematics at the College of Charleston ...

The Difference Basis and Bi-basis of Zm ∗

The Difference Basis and Bi-basis of Zm ∗ by Yong-Gao Chen & Tang Sun of the Department of Mathematics at Nanjing Normal University...

Waring's Number Mod M

Waring's Number Mod M by Ala Alnaser PhD, Todd Cochrane PhD from the Department of Mathematics at Kansas State University...

Arithmetic progressions in the least positive reduced residue systems

Arithmetic progressions in the least positive reduced residue systems ...

Bounds for the Maximal Height of Divisors of $x^n-1$

Bounds for the Maximal Height of Divisors of $x^n-1$ by Nathan Kaplan from Harvard University's Department of Mathematics...

Symmetries of Bernoulli polynomial series and Arakawa-Kaneko zeta functions

Symmetries of Bernoulli polynomial series and Arakawa-Kaneko zeta functions JournalNumberTheory Subscribe 598 189 views Add to Share More Published on May 11, 2014 Young, Paul Thomas* *Departme...

YouTube Science Video

Mathematics MPhil/PhD student Stuart George explains his area of research in the mathematical modelling of the electro chemical processes that occur in nerve cells when they transmit signals....

On shifted Mascheroni series and hyperharmonic numbers

On shifted Mascheroni series and hyperharmonic numbers - YouTube...

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 ...

Sums and differences of correlated random sets

Sums and differences of correlated random sets by Do, Thao, Kulkarni, Archit, Miller, Steven J.*, Moon, David, and Wellens, Jake *Department of Mathematics and Statistics Williams College...

The least k-th power non-residue

The least k-th power non-residue - Treviño, Enrique* *Department of Mathematics and Computer Science Lake Forest College...

YouTube Science Video

Coleman Maps for Modular Forms at Supersingular Primes over Lubin-Tate Extensions by Mr. Antonio Lei in the Department of Pure Mathematics and Mathematical Statistics at the University of Cambridge ...

A-expansions of Drinfeld modular forms

A-expansions of Drinfeld modular forms by Petrov, Aleksandar V. from Texas A & M ...

Rational series for multiple zeta and log gamma functions

Rational series for multiple zeta and log gamma functions by Young, Paul Thomas in the Department of Mathematics at the College of Charleston...

Effective equidistribution and the Sato-Tate law for families of elliptic curves

Steven J Miller and M. Ram Murty Williams College Department of Mathematics and Statistics...

Galois uniformity in quadratic dynamics over k(t)

Galois uniformity in quadratic dynamics over k(t) - Hindes, Wade* *Department of Mathematics Brown University...

A Golod-Shafarevich Equality and p-Tower Groups

A Golod-Shafarevich Equality and p-Tower Groups by Cameron McLeman, Ph.D. from Willamette University...