Pages that link to "Item:Q4300952"
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The following pages link to Some Particular Entries of the Two-Parameter Kostka Matrix (Q4300952):
Displaying 24 items.
- A combinatorial approach to the \(q,t\)-symmetry relation in Macdonald polynomials (Q289979) (← links)
- On a bijective proof of a factorization formula for Macdonald polynomials (Q427816) (← links)
- A new recursion in the theory of Macdonald polynomials (Q434227) (← links)
- Kostka functions associated to complex reflection groups (Q514192) (← links)
- An extension of MacMahon's equidistribution theorem to ordered multiset partitions (Q907252) (← links)
- A Macdonald vertex operator and standard tableaux statistics for the two-column \((q,t)\)-Kosta coefficients (Q1271414) (← links)
- \(q\)-hypergeometric series and Macdonald functions (Q1330170) (← links)
- Plethystic formulas for Macdonald \(q,t\)-Kostka coefficients (Q1352285) (← links)
- A combinatorial interpretation of the inverse \(t\)-Kostka matrix. (Q1584471) (← links)
- Factorizations of Pieri rules for Macdonald polynomials (Q1893988) (← links)
- The decomposition of a bigraded left regular representation of the diagonal action of \(S_ n\) (Q1894013) (← links)
- A combinatorial formula for the Schur coefficients of the integral form of the Macdonald polynomials in the two column and certain hook cases (Q1928583) (← links)
- Graded characters of modules supported in the closure of a nilpotent conjugacy class (Q1971807) (← links)
- Modified Macdonald polynomials and integrability (Q1984843) (← links)
- Symmetric functions and Springer representations (Q2076505) (← links)
- Some plethystic identities and Kostka-Foulkes polynomials. (Q2828849) (← links)
- On MacDonald's Symmetric Functions (Q4024879) (← links)
- (Q4502714) (← links)
- (Q4890827) (← links)
- The shuffle conjecture (Q5204996) (← links)
- A generalization of the Kostka-Foulkes polynomials (Q5960004) (← links)
- A proof of the \(\frac{n!}{2}\) conjecture for hook shapes (Q6062819) (← links)
- A multiparametric Murnaghan-Nakayama rule for Macdonald polynomials (Q6566001) (← links)
- Higher Specht polynomials under the diagonal action (Q6662815) (← links)
