DirichletGroup(q), rendered as Gq, represents the set of Dirichlet characters modulo q, given q∈Z≥1.
Dirichlet characters can be defined axiomatically as functions from Z
to C
satisfying the properties in formulas 1c3957, 0851cf, and afd0c5.
In this definition, the modulus q
is not an attribute of the character; for example the character giving the sequence [0,1,0,1,…]
is an element of both G2
and G4.
A more explicit construction of the characters is possible using the Conrey numbering scheme, which is implemented by DirichletCharacter.
Definitions:
Fungrim symbol | Notation | Short description |
---|---|---|
DirichletGroup | Gq | Dirichlet characters with given modulus |
ZZGreaterEqual | Z≥n | Integers greater than or equal to n |
ZZ | Z | Integers |
CC | C | Complex numbers |
DirichletCharacter | χq.ℓ | Dirichlet character |
Source code for this entry:
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