Sun's Conjectures on Fourth Powers in the Class Group of Binary Quadratic Forms Sun's Conjectures on Fourth Powers in the Class Group of Binary Quadratic Forms by
Robert W. Fitzgerald at Southern Illinois University
... Expander Graphs Based on GRH with an Application to Elliptic Curve Cryptography Expander Graphs Based on GRH with an Application to Elliptic Curve Cryptography by David Jao, University of Waterloo, Ontario and Stephen D. Miller, Rutgers University ... Generalizing Zeckendorf's Theorem to f-decompositions "Generalizing Zeckendorf's Theorem to f-decompositions " by Demontignt, Philippe; Do, Thao; Kulkarni, Archit; Miller, Steven J.*; Moon, David; Varma, Umang.
*Williams COLLEGE
Mathematics and... Newman's conjecture in various settings Newman's conjecture in various settings by Andrade, Julio, Chang, Alan, and Miller, Steven J. from Department of Mathematics and Statistics, Williams College... On the iterations of certain maps $X \mapsto K \cdot(X+X^{-1})$ over finite fields... "On the iterations of certain maps $X mapsto K cdot(X+X^{-1})$ over finite fields of odd characteristic" by Simone Ugolini.... 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
... On the Erdős-Turán conjecture On the Erdős-Turán conjecture - Tang, Min*
School of Mathematics and Computer Science
Anhui Normal University, China... Introduction to Video Abstracting by David Goss Editor-in-Chief David Goss explains his thoughts and inspiration for video abstracting and its benefits for the mathematics community.... Images of 2-adic representations associated to hyperelliptic Jacobians Images of 2-adic representations associated to hyperelliptic Jacobians - YouTube... 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... Transcendence and CM on Borcea-Voisin towers of Calabi-Yau manifolds Transcendence and CM on Borcea-Voisin towers of Calabi-Yau manifolds - Tretkoff, Paula - Department of Mathematics
Texas A&M University... Distinct Lengths Modular Zero-Sum Subsequences: A Proof of Graham's Conjecture Distinct Lengths Modular Zero-Sum Subsequences: A Proof of Graham's Conjecture by Weidong Gao, Ph.D.
from the Center for Combinatorics
at Nankai University... 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... Faster Computation of the Tate Pairing Faster Computation of the Tate Pairing by Christophe Arene, *Tanja Lange, Michael Naehrig, Christophe Ritzenthaler
*Department of Mathematics and Computer Science at Technische Universiteit Eindhoven... A Combinatorial Partition of Mersenne Numbers Arising from Spectroscopy A Combinatorial Partition of Mersenne Numbers Arising from Spectroscopy by Eakin, R.T. in the Department of Kinesiology and Health Education at the University of Texas at Austin... Vimeo Science Video Sebastian Deterding is a designer and researcher working on persuasive, gameful, and playful interactions.
Before designing independently for startups, game companies and large brands. As a PhD resear... π and the hypergeometric functions of complex argument Giovanni Mingari Scarpello and Daniele Ritelli
Dipartimento di Matematica per le scienze economiche e sociali
viale Filopanti, 5
40126 Bologna, Italy... On the shortest weakly prime-additive numbers On the shortest weakly prime-additive numbers. A positive integer n is called weakly prime-additive if n has at least two distinct prime divisors and there exist distinct prime divisors of n and posit... On the addition of squares of units and nonunits modulo $n$ On the addition of squares of units and nonunits modulo $n$. By Yang, Quan-Hui* and Tang, Min
*School of Mathematics and Statistics
Nanjing University of Information Science and Technology
Nanjing 2... On the Products $(1^\ell+1)(2^\ell+1)\cdots (n^\ell +1)$, II On the Products $(1^ell+1)(2^ell+1)cdots (n^ell +1)$, II by Chen, Yong-Gao* and Gong, Ming-Liang at the School of Mathematical SCIENCES and Institute of Mathematics, Nanjing Normal University... Created and maintained by Ryan Watkins (2013-present)
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