Fundamental pair of periodsIn mathematics, a fundamental pair of periods is an ordered pair of complex numbers that defines a lattice in the complex plane. This type of lattice is the underlying object with which elliptic functions and modular forms are defined. A fundamental pair of periods is a pair of complex numbers such that their ratio is not real. If considered as vectors in , the two are not collinear. The lattice generated by and is This lattice is also sometimes denoted as to make clear that it depends on and It is also sometimes denoted by or or simply by The two generators and are called the lattice basis.
E8 latticeIn mathematics, the E_8 lattice is a special lattice in R^8. It can be characterized as the unique positive-definite, even, unimodular lattice of rank 8. The name derives from the fact that it is the root lattice of the E_8 root system. The norm of the E_8 lattice (divided by 2) is a positive definite even unimodular quadratic form in 8 variables, and conversely such a quadratic form can be used to construct a positive-definite, even, unimodular lattice of rank 8. The existence of such a form was first shown by H.
Integer latticeIn mathematics, the n-dimensional integer lattice (or cubic lattice), denoted \mathbb{Z}^n, is the lattice in the Euclidean space \mathbb{R}^n whose lattice points are n-tuples of integers. The two-dimensional integer lattice is also called the square lattice, or grid lattice. \mathbb{Z}^n is the simplest example of a root lattice. The integer lattice is an odd unimodular lattice. The automorphism group (or group of congruences) of the integer lattice consists of all permutations and sign changes of the coordinates, and is of order 2n n!.
Empilement compactUn empilement compact d'une collection d'objets est un agencement de ces objets de telle sorte qu'ils occupent le moins d'espace possible (donc qu'ils laissent le moins de vide possible). Le problème peut se poser dans un espace (euclidien ou non) de dimension n quelconque, les objets étant eux-mêmes de dimension n. Les applications pratiques sont concernées par les cas (plan et autres surfaces) et (espace ordinaire).
Fonction elliptique de WeierstrassEn analyse complexe, les fonctions elliptiques de Weierstrass forment une classe importante de fonctions elliptiques c'est-à-dire de fonctions méromorphes doublement périodiques. Toute fonction elliptique peut être exprimée à l'aide de celles-ci. Supposons que l'on souhaite fabriquer une telle fonction de période 1. On peut prendre une fonction quelconque, définie sur [0, 1] et telle que f(0) = f(1) et la prolonger convenablement. Un tel procédé a des limites. Par exemple, on obtiendra rarement des fonctions analytiques de cette façon.
Integer triangleAn integer triangle or integral triangle is a triangle all of whose side lengths are integers. A rational triangle is one whose side lengths are rational numbers; any rational triangle can be rescaled by the lowest common denominator of the sides to obtain a similar integer triangle, so there is a close relationship between integer triangles and rational triangles. Sometimes other definitions of the term rational triangle are used: Carmichael (1914) and Dickson (1920) use the term to mean a Heronian triangle (a triangle with integral or rational side lengths and area);cite book |last=Carmichael |first=R.
One-dimensional symmetry groupA one-dimensional symmetry group is a mathematical group that describes symmetries in one dimension (1D). A pattern in 1D can be represented as a function f(x) for, say, the color at position x. The only nontrivial point group in 1D is a simple reflection. It can be represented by the simplest Coxeter group, A1, [ ], or Coxeter-Dynkin diagram . Affine symmetry groups represent translation. Isometries which leave the function unchanged are translations x + a with a such that f(x + a) = f(x) and reflections a − x with a such that f(a − x) = f(x).
Quaternions de HurwitzLes quaternions de Hurwitz portent ce nom en l'honneur du mathématicien allemand Adolf Hurwitz. Soit A un anneau. On definit l'algèbre de quaternions H(A) comme l'algèbre A[H] du groupe H des quaternions. Plus explicitement, c'est le A-module libre engendré par 1, i, j et k, muni de la structure d'algèbre : 1 élément neutre pour la multiplication, et les identités : Soit , l'algèbre des quaternions sur l'anneau Z des entiers relatifs.
