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- Schur_polynomial abstract "In mathematics, Schur polynomials, named after Issai Schur, are certain symmetric polynomials in n variables, indexed by partitions, that generalize the elementary symmetric polynomials and the complete homogeneous symmetric polynomials. In representation theory they are the characters of irreducible representations of the general linear groups. The Schur polynomials form a linear basis for the space of all symmetric polynomials. Any product of Schur functions can be written as a linear combination of Schur polynomials with non-negative integral coefficients; the values of these coefficients is given combinatorially by the Littlewood–Richardson rule. More generally, skew Schur polynomials are associated with pairs of partitions and have similar properties to Schur polynomials.".
- Schur_polynomial wikiPageExternalLink ?ci=9780198504504.
- Schur_polynomial wikiPageID "3147062".
- Schur_polynomial wikiPageRevisionID "604768359".
- Schur_polynomial authorlink "Bruce Sagan".
- Schur_polynomial b "ρ".
- Schur_polynomial first "Bruce E.".
- Schur_polynomial hasPhotoCollection Schur_polynomial.
- Schur_polynomial id "s/s120040".
- Schur_polynomial last "Sagan".
- Schur_polynomial p "λ".
- Schur_polynomial title "Schur functions in algebraic combinatorics".
- Schur_polynomial subject Category:Homogeneous_polynomials.
- Schur_polynomial subject Category:Invariant_theory.
- Schur_polynomial subject Category:Orthogonal_polynomials.
- Schur_polynomial subject Category:Representation_theory_of_finite_groups.
- Schur_polynomial subject Category:Symmetric_functions.
- Schur_polynomial type Abstraction100002137.
- Schur_polynomial type Function113783816.
- Schur_polynomial type HomogeneousPolynomial105862268.
- Schur_polynomial type HomogeneousPolynomials.
- Schur_polynomial type MathematicalRelation113783581.
- Schur_polynomial type OrthogonalPolynomials.
- Schur_polynomial type Polynomial105861855.
- Schur_polynomial type Relation100031921.
- Schur_polynomial type SymmetricFunctions.
- Schur_polynomial comment "In mathematics, Schur polynomials, named after Issai Schur, are certain symmetric polynomials in n variables, indexed by partitions, that generalize the elementary symmetric polynomials and the complete homogeneous symmetric polynomials. In representation theory they are the characters of irreducible representations of the general linear groups. The Schur polynomials form a linear basis for the space of all symmetric polynomials.".
- Schur_polynomial label "Polynôme de Schur".
- Schur_polynomial label "Schur polynomial".
- Schur_polynomial label "Многочлены Шура".
- Schur_polynomial label "シューア多項式".
- Schur_polynomial sameAs Polynôme_de_Schur.
- Schur_polynomial sameAs シューア多項式.
- Schur_polynomial sameAs m.08vg76.
- Schur_polynomial sameAs Q4298935.
- Schur_polynomial sameAs Q4298935.
- Schur_polynomial sameAs Schur_polynomial.
- Schur_polynomial wasDerivedFrom Schur_polynomial?oldid=604768359.
- Schur_polynomial isPrimaryTopicOf Schur_polynomial.