A computational and combinatorial exposé of plethystic calculus

Wreath Macdonald polynomials at 𝑞=𝑡 as characters of rational Cherednik algebras, Loop-augmented forests and a variant of Foulkes's conjecture, The Equivariant Inverse Kazhdan--Lusztig Polynomials of Uniform Matroids, Plethystic Exponential Calculus and Characteristic Polynomials of Permutations, Decorated Dyck paths and the delta conjecture, A parking function interpretation for \(\nabla m_{n,1^k}\), Delta operators at \(q=1\) and polyominoes, The combinatorics of Jeff Remmel, Plethysms of chromatic and Tutte symmetric functions, Plethysms of symmetric functions and representations of \(\mathrm{SL}_2(\mathbf{C})\), Decorated Dyck Paths, Polyominoes, and the Delta Conjecture, Free fermions and canonical Grothendieck polynomials, Macdonald polynomials and chromatic quasisymmetric functions, Kronecker powers of harmonics, polynomial rings, and generalized principal evaluations, Counting permutations by peaks, descents, and cycle type, Adjoint representations of symmetric groups, Highest weight vectors in plethysms, A symmetric function lift of torus link homology, Jacobi-Trudi formulas for flagged refined dual stable Grothendieck polynomials, A generalized SXP rule proved by bijections and involutions, A representation on the labeled rooted forests, Plethystic formulas for permutation enumeration, Plethysm and cohomology representations of external and symmetric products, Quasisymmetric expansions of Schur-function plethysms, Plethysms of symmetric functions and highest weight representations, Plethysm and lattice point counting, Abacus-histories and the combinatorics of creation operators, Effective constructions in plethysms and Weintraub's conjecture, From quasisymmetric expansions to Schur expansions via a modified inverse Kostka matrix, Branching from the general linear group to the symmetric group and the principal embedding, \(P\)-partitions and \(p\)-positivity, Polynomial induction and the restriction problem, The valley version of the extended delta conjecture, A combinatorial model for the decomposition of multivariate polynomial rings as \(S_n\)-modules, Quiver Hall-Littlewood functions and Kostka-Shoji polynomials, Plethysm and the algebra of uniform block permutations, Howe duality of the symmetric group and a multiset partition algebra

• \(\lambda\)-rings and the representation theory of the symmetric group
• Outer plethysms and \(\lambda\)-rings
• \(\tau\)-rings and wreath product representations
• Lattice diagram polynomials and extended Pieri rules
• Explicit plethystic formulas for Macdonald \((q,t)\)-Kostka coefficients
• Plethystic formulas for Macdonald \(q,t\)-Kostka coefficients
• An algorithm for computing plethysm coefficients
• Identities and positivity conjectures for some remarkable operators in the theory of symmetric functions
• A combinatorial formula for the character of the diagonal coinvariants
• A proof of the \(q,t\)-Catalan positivity conjecture
• A remarkable \(q,t\)-Catalan sequence and \(q\)-Lagrange inversion
• The combinatorics of Macdonald's \(D_{n}^{1}\) operator
• A positivity result in the theory of Macdonald polynomials
• Plethysms of Schur functions and the shell model
• On D. E. Littlewood's Algebra of S-Function
• La théorie des classes de Chern
• Ribbon tableaux, Hall–Littlewood functions, quantum affine algebras, and unipotent varieties
• A combinatorial formula for Macdonald polynomials
• POWER OPERATIONS IN K-THEORY
• Concomitants of the Quintic and Sextic Up To Degree Four in the Coefficients of the Ground Form
• On D. E. Littlewood's Algebra of S-Functions
• ON THE ANALYSES OF { m } [unk { 1 ^k } AND { m } [unk] { k }]
• Invariant theory, tensors and group characters
• A new class of symmetric functions
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