Definitions from Wiktionary (shuffle algebra)
▸ noun: (mathematics) A Hopf algebra with a basis corresponding to words on some set, whose product is given by the shuffle product X ⧢ Y of two words X, Y: the sum of all ways of interlacing them. The interlacing is given by the riffle shuffle permutation.
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▸ noun: (mathematics) A Hopf algebra with a basis corresponding to words on some set, whose product is given by the shuffle product X ⧢ Y of two words X, Y: the sum of all ways of interlacing them. The interlacing is given by the riffle shuffle permutation.
Similar:
Hopf algebra,
permutation,
lexicographic order,
Lie algebra representation,
permutation group,
Cartesian product,
Cohomology ring,
Permutation graph,
matrix decomposition,
Generating set of a group,
more...
▸ Words similar to shuffle algebra
▸ Usage examples for shuffle algebra
▸ Idioms related to shuffle algebra
▸ Wikipedia articles (New!)
▸ Words that often appear near shuffle algebra
▸ Rhymes of shuffle algebra
▸ Invented words related to shuffle algebra