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In mathematics, more specifically in group theory, the character of a group representation is a function on the group that associates to each group element the trace of the corresponding matrix. The character carries the essential information about the representation in a more condensed form.
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In mathematics, a character group is the group of representations of an abelian group by complex-valued functions. These functions can be thought of as one-dimensional matrix representations and so are special cases of the group characters that arise in the related context of character theory .
A multiplicative character (or linear character, or simply character) on a group G is a group homomorphism from G to the multiplicative group of a field , usually the field of complex numbers. If G is any group, then the set Ch( G ) of these morphisms forms an abelian group under pointwise multiplication.
Often, a distance (for comparison) is calculated by subtraction (in some metric space), but comparison can be based on arbitrary orderings that don't support subtraction or the notion of distance. Moreover, comparison circuitry doesn't belong in a purely mathematical or computing category.
An interesting class of examples arise from Riemann surfaces: if is a Riemann surface then the -character variety of, or Betti moduli space, is the character variety of the surface group = () M B ( X , G ) = R ( π 1 ( X ) , G ) {\displaystyle {\mathcal {M}}_{B}(X,G)={\mathfrak {R}}(\pi _{1}(X),G)} .
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In mathematics, and in particular the theory of group representations, the regular representation of a group G is the linear representation afforded by the group action of G on itself by translation. One distinguishes the left regular representation λ given by left translation and the right regular representation ρ given by the inverse of ...