Definitions from Wikipedia (Trivial representation)
▸ noun: In the mathematical field of representation theory, a trivial representation is a representation of a group G on which all elements of G act as the identity mapping of V. A trivial representation of an associative or Lie algebra is a (Lie) algebra representation for which all elements of the algebra act as the zero linear map (endomorphism) which sends every element of V to the zero vector.
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▸ noun: In the mathematical field of representation theory, a trivial representation is a representation of a group G on which all elements of G act as the identity mapping of V. A trivial representation of an associative or Lie algebra is a (Lie) algebra representation for which all elements of the algebra act as the zero linear map (endomorphism) which sends every element of V to the zero vector.
▸ Words similar to trivial representation
▸ Usage examples for trivial representation
▸ Idioms related to trivial representation
▸ Wikipedia articles (New!)
▸ Words that often appear near trivial representation
▸ Rhymes of trivial representation
▸ Invented words related to trivial representation