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- Youngs_lattice abstract "In mathematics, Young's lattice is a partially ordered set and a lattice that is formed by all integer partitions. It is named after Alfred Young, who in a series of papers On quantitative substitutional analysis developed representation theory of the symmetric group. In Young's theory, the objects now called Young diagrams and the partial order on them played a key, even decisive, role. Young's lattice prominently figures in algebraic combinatorics, forming the simplest example of a differential poset in the sense of Stanley (1988). It is also closely connected with the crystal bases for affine Lie algebras.".
- Youngs_lattice thumbnail Youngs_lattice.svgwidth=300.
- Youngs_lattice wikiPageID "14836297".
- Youngs_lattice wikiPageLength "7848".
- Youngs_lattice wikiPageOutDegree "33".
- Youngs_lattice wikiPageRevisionID "679418272".
- Youngs_lattice wikiPageWikiLink Affine_Lie_algebra.
- Youngs_lattice wikiPageWikiLink Alfred_Young.
- Youngs_lattice wikiPageWikiLink Algebraic_combinatorics.
- Youngs_lattice wikiPageWikiLink Category:Lattice_theory.
- Youngs_lattice wikiPageWikiLink Category:Representation_theory.
- Youngs_lattice wikiPageWikiLink Category:Symmetric_functions.
- Youngs_lattice wikiPageWikiLink Communications_in_Mathematical_Physics.
- Youngs_lattice wikiPageWikiLink Covering_relation.
- Youngs_lattice wikiPageWikiLink Crystal_base.
- Youngs_lattice wikiPageWikiLink Differential_poset.
- Youngs_lattice wikiPageWikiLink Dihedral_group.
- Youngs_lattice wikiPageWikiLink Distributive_lattice.
- Youngs_lattice wikiPageWikiLink European_Journal_of_Combinatorics.
- Youngs_lattice wikiPageWikiLink Ferrers_diagram.
- Youngs_lattice wikiPageWikiLink File:Suter.rotational.symmetry.svg.
- Youngs_lattice wikiPageWikiLink Graded_poset.
- Youngs_lattice wikiPageWikiLink Group_action.
- Youngs_lattice wikiPageWikiLink Hasse_diagram.
- Youngs_lattice wikiPageWikiLink Incidence_algebra.
- Youngs_lattice wikiPageWikiLink Journal_of_the_American_Mathematical_Society.
- Youngs_lattice wikiPageWikiLink Lattice_(order).
- Youngs_lattice wikiPageWikiLink Mathematics.
- Youngs_lattice wikiPageWikiLink Partially_ordered_set.
- Youngs_lattice wikiPageWikiLink Partition_(number_theory).
- Youngs_lattice wikiPageWikiLink Representation_theory_of_the_symmetric_group.
- Youngs_lattice wikiPageWikiLink Triangular_number.
- Youngs_lattice wikiPageWikiLink Young_diagram.
- Youngs_lattice wikiPageWikiLink Young_tableau.
- Youngs_lattice wikiPageWikiLink Young_tableaux.
- Youngs_lattice wikiPageWikiLink Young–Fibonacci_lattice.
- Youngs_lattice wikiPageWikiLink File:Young5.svg.
- Youngs_lattice wikiPageWikiLink File:Youngs_lattice.svg.
- Youngs_lattice wikiPageWikiLinkText "Young's lattice".
- Youngs_lattice hasPhotoCollection Youngs_lattice.
- Youngs_lattice wikiPageUsesTemplate Template:Cite_book.
- Youngs_lattice wikiPageUsesTemplate Template:Cite_journal.
- Youngs_lattice wikiPageUsesTemplate Template:Harvtxt.
- Youngs_lattice subject Category:Lattice_theory.
- Youngs_lattice subject Category:Representation_theory.
- Youngs_lattice subject Category:Symmetric_functions.
- Youngs_lattice comment "In mathematics, Young's lattice is a partially ordered set and a lattice that is formed by all integer partitions. It is named after Alfred Young, who in a series of papers On quantitative substitutional analysis developed representation theory of the symmetric group. In Young's theory, the objects now called Young diagrams and the partial order on them played a key, even decisive, role.".
- Youngs_lattice label "Young's lattice".
- Youngs_lattice sameAs Retículo_de_Young.
- Youngs_lattice sameAs Treillis_de_Young.
- Youngs_lattice sameAs m.03gzmgf.
- Youngs_lattice sameAs Q932141.
- Youngs_lattice sameAs Q932141.
- Youngs_lattice wasDerivedFrom Youngs_latticeoldid=679418272.
- Youngs_lattice depiction Youngs_lattice.svg.
- Youngs_lattice isPrimaryTopicOf Youngs_lattice.