Pages that link to "Item:Q1352285"

The following pages link to Plethystic formulas for Macdonald \(q,t\)-Kostka coefficients (Q1352285):

Displaying 45 items.

• Whittaker vector of deformed Virasoro algebra and Macdonald symmetric functions (Q260008) (← links)
• Some remarkable new plethystic operators in the theory of Macdonald polynomials (Q344452) (← links)
• Transition matrices for symmetric and quasisymmetric Hall-Littlewood polynomials (Q388723) (← links)
• A plethysm formula on the characteristic map of induced linear characters from \(U_n(\mathbb F_q)\) to \(GL(\mathbb F_q)\). (Q396810) (← links)
• Kostka functions associated to complex reflection groups (Q514192) (← links)
• A polynomial expression for the Hilbert series of the quotient ring of diagonal coinvariants (Q549220) (← links)
• A computational and combinatorial exposé of plethystic calculus (Q626434) (← links)
• From quasisymmetric expansions to Schur expansions via a modified inverse Kostka matrix (Q710723) (← links)
• Degrees of stretched Kostka coefficients (Q925303) (← links)
• A new proof of a theorem of Littlewood (Q1003592) (← links)
• A formula for two-row Macdonald functions (Q1196412) (← links)
• A random \(q,t\)-hook walk and a sum of Pieri coefficients (Q1268629) (← links)
• A Macdonald vertex operator and standard tableaux statistics for the two-column \((q,t)\)-Kosta coefficients (Q1271414) (← links)
• Canonical basis and Macdonald polynomials (Q1275430) (← links)
• Lattice diagram polynomials and extended Pieri rules (Q1283430) (← links)
• Explicit plethystic formulas for Macdonald \((q,t)\)-Kostka coefficients (Q1290723) (← links)
• A statistical study of the Kostka-Foulkes polynomials (Q1312837) (← links)
• Rodrigues formulas for the Macdonald polynomials (Q1369256) (← links)
• Multiple left regular representations generated by alternants (Q1584649) (← links)
• Macdonald-positive specializations of the algebra of symmetric functions: proof of the Kerov conjecture (Q1711494) (← links)
• Recursion and explicit formulas for particular \(N\)-variable Knop-Sahi and Macdonald polynomials (Q1806210) (← links)
• Positivity for special cases of \((q,t)\)-Kostka coefficients and standard tableaux statistics (Q1806356) (← links)
• Tableau atoms and a new Macdonald positivity conjecture (Q1872788) (← links)
• The elliptic Hall algebra and the \(K\)-theory of the Hilbert scheme of \(\mathbb{A}^{2}\) (Q1939195) (← links)
• A short proof of the integrality of the Macdonald \((q,t)\)-Kostka coefficients (Q1974769) (← links)
• Affine Hecke algebras and raising operators for Macdonald polynomials (Q1974812) (← links)
• Multi-Macdonald polynomials (Q2005697) (← links)
• Strong factorization property of Macdonald polynomials and higher-order Macdonald's positivity conjecture (Q2014257) (← links)
• LLT cumulants and graph coloring (Q2094870) (← links)
• An iterative formula for the Kostka-Foulkes polynomials (Q2240738) (← links)
• Combinatorics of the \(q\)-basis of symmetric functions (Q2563713) (← links)
• \(Q\)-Kostka polynomials and spin Green polynomials (Q2699870) (← links)
• Haglund's conjecture for multi-\(t\) Macdonald polynomials (Q2699928) (← links)
• Combinatorics of the immaculate inverse Kostka matrix (Q2700321) (← links)
• Hilbert schemes, polygraphs and the Macdonald positivity conjecture (Q2723517) (← links)
• Some plethystic identities and Kostka-Foulkes polynomials. (Q2828849) (← links)
• Tableaux formulas for Macdonald polynomials (Q2842023) (← links)
• Quantum walled Brauer algebra: commuting families, Baxterization, and representations (Q2965761) (← links)
• On MacDonald's Symmetric Functions (Q4024879) (← links)
• A combinatorial formula for Macdonald polynomials (Q4679404) (← links)
• The product of a nonsymmetric Jack polynomial with a linear function (Q4794582) (← links)
• Jack polynomials and some identities for partitions (Q4813814) (← links)
• Breakthroughs in the theory of Macdonald polynomials (Q5293353) (← links)
• Interpolation, integrality, and a generalization of Macdonald's polynomials (Q5691611) (← links)
• Wreath Macdonald polynomials, a survey (Q6607662) (← links)