Results 91 to 100 of about 2,228 (208)

Recensioni

Didattica della Matematica, 2018
1. D’Amore, B., & Sbaragli, S. (2017). La matematica e la sua storia. Dalle origini al miracolo greco. Bari: Dedalo. 2. Duval, R. (2017). Understanding the Mathematical Way of Thinking. The Registers of Semiotic Representations.
Benedetto Di Paola (1), Giorgio Santi (2), Silvia Demartini (3), Gianfranco Arrigo (4), Michele Canducci (5)   +4 more
doaj  

Quantum permutation pad for quantum secure symmetric and asymmetric cryptography

Academia Quantum
This review delves into the latest advancements in quantum-secure cryptography, focusing on the quantum permutation pad (QPP), a pivotal innovation proposed by Kuang et al.
Randy Kuang
doaj   +1 more source

PROCESSOR-ORIENTED NONLINEAR TRANSFORM BASED ON THE FULL CLASSES OF ISOMORPHIC AND AUTOMORPHIC REPRESENTATIONS OF GALOIS FIELDS GF(512) AND GF(1024)

Системный анализ и прикладная информатика, 2016
The full sets of multilevel linear recurring sequences over all isomorphic and automorphic representations of Galois fields GF(512) and GF(1024) are built. Constructions of cryptographically high quality S-box of processor-oriented lengths N = {512, 1024}
A. V. Sokolov
doaj  

Extensions of tautological rings and motivic structures in the cohomology of ${\overline {\mathcal {M}}}_{g,n}$

Forum of Mathematics, Pi
We study collections of subrings of $H^*({\overline {\mathcal {M}}}_{g,n})$ that are closed under the tautological operations that map cohomology classes on moduli spaces of smaller dimension to those on moduli spaces of larger dimension and ...
Samir Canning, Hannah Larson, Sam Payne
doaj   +1 more source

On the representation theory of Galois and atomic topoi

Journal of Pure and Applied Algebra, 2004
This is a revised version of arXiv.org/math.CT/02008222 to appear in ...
openaire   +3 more sources

Studying Galois Representations Using Elliptic Curves

, 2020
honors thesisCollege of ScienceMathematicsGil MossDiophantine equations and their solution sets are prominent subjects of study in number theory. These equations are often studied modulo prime numbers or prime ideals in field extensions. Galois Theory is
Bull, August John
core  

Zig-zag for Galois Representations

, 2023
The zig-zag conjecture says that the reductions of two-dimensional crystalline representations of the Galois group of ${\mathbb {Q}}_p$ of large exceptional weights and half-integral slopes up to $\frac{p-1}{2}$ vary through an alternating sequence of ...
Ghate, Eknath
core  

Notes on Number Theory

Mathematics
This paper presents a set of survey-style notes linking core themes of pure algebra with central topics in algebraic and analytic number theory. We begin with finite extensions of Q and describe algebraic number fields through their realization as finite-
Miroslav Stoenchev, Slavi Georgiev, Venelin Todorov   +2 more
doaj   +1 more source

BIG IMAGE OF GALOIS REPRESENTATIONS AND CONGRUENCE IDEALS [PDF]

, 2014
2. Galois representations associated to Siegel modular forms 2 3. Fullness of the image for Galois representations in GSp(4) 3 3.1. Irreducibility and open image
Jacques Tilouine, Haruzo Hida
core  

LIFTING TORSION GALOIS REPRESENTATIONS – CORRIGENDUM

Forum of Mathematics, Sigma, 2016
CHANDRASHEKHAR KHARE, RAVI RAMAKRISHNA
doaj   +1 more source