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
... 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... 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
... 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... A Covering System Whose Smallest Modulus is 40 A Covering System Whose Smallest Modulus is 40 by Pace Peterson Nielsen, Ph.D. at the University of Iowa... On multi-dimensional pseudorandom subsets On multi-dimensional pseudorandom subsets. We introduce measure for multi-dimensional pseudorandom subsets, and study the connection between measures of different orders. Large families of multi-dimen... 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... Tame Galois Realizations of GL2(Fℓ) over Q⋆ Tame Galois Realizations of GL2(Fℓ) over Q⋆ by Sara Arias-de-Reyna y N´uria Vila
Dept. d`Algebra i Geometria, Universitat de Barcelona... Strictly regular quaternary quadratic forms and lattices Strictly regular quaternary quadratic forms and lattices by Earnest, A.G.*, Kim, Ji Young, and Meyer, N.D.
*Department of Mathematics
Southern Illinois University... On P-adic Annihilators of Real Ideal Classes On P-adic Annihilators of Real Ideal Classes by All, Timothy from Ohio State University
... Algebraic Points of Small Height Missing a Union of Varieties Algebraic Points of Small Height Missing a Union of Varieties by Lenny Fukshansky
from the Department of Mathematics
at Claremont McKenna College... The Analogue of Erdős-Turán Conjecture in Zm* The Analogue of Erdős-Turán Conjecture in Zm* by Yong Gao Chen, PhD of Nanjing Normal University... The Third Order Variations On The Fibonacci Universal Code The Third Order Variations On The Fibonacci Universal Code by Nalli, Ayse and Özyılmaz, Çağla of the *Department of Mathematics at
Karabuk University... 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... Towards an 'average' version of the Birch and Swinnerton-Dyer Conjecture Towards an 'average' version of the Birch and Swinnerton-Dyer Conjecture by Dr. Steven J. Miller of the Department of Mathematics and Statistics
at Williams College... Two-variable p-adic L-functions of modular forms for non-ordinary primes Two-variable p-adic L-functions of modular forms for non-ordinary primes by Kim, Byoung Du (B. D.) at the School of Mathematics, Victoria UNIVERSITY of Wellington... On the distribution of a-values of Selberg zeta-function assoc. to finite volume Riemann surfaces On the distribution of a-values of Selberg zeta-function assoc. to finite volume Riemann surfaces - W. Luo has investigated the distribution of zeros of the derivative of the Selberg zeta function ass... 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... Created and maintained by Ryan Watkins (2013-present)
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