Descents, quasi-symmetric functions, Robinson-Schensted for posets, and the chromatic symmetric function
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Publication:1961224
DOI10.1023/A:1018719315718zbMath0944.05095MaRDI QIDQ1961224
Publication date: 30 March 2000
Published in: Journal of Algebraic Combinatorics (Search for Journal in Brave)
Exact enumeration problems, generating functions (05A15) Symmetric functions and generalizations (05E05) Algebraic aspects of posets (06A11)
Related Items (11)
Chromatic quasisymmetric functions ⋮ Characters and chromatic symmetric functions ⋮ The drop polynomial of a weighted digraph ⋮ Modules of the 0-Hecke algebra and quasisymmetric Schur functions ⋮ Macdonald polynomials and chromatic quasisymmetric functions ⋮ Properties of the descent algebras of type \(D\). ⋮ A combinatorial formula for the Schur coefficients of chromatic symmetric functions ⋮ Robinson-Schensted correspondence for unit interval orders ⋮ The coloring ideal and coloring complex of a graph ⋮ Counting domino tilings of rectangles via resultants ⋮ Chromatic nonsymmetric polynomials of Dyck graphs are slide-positive
Cites Work
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- A Robinson-Schensted algorithm for a class of partial orders
- Graph colorings and related symmetric functions: ideas and applications: A description of results, interesting applications, and notable open problems.
- A symmetric function generalization of the chromatic polynomial of a graph
- On the cover polynomial of a digraph
- The path-cycle symmetric function of a digraph
- Incomparability graphs of \((3+1)\)-free posets are \(s\)-positive
- Acyclic orientations of graphs
- Expansions of Chromatic Polynomials and Log-Concavity
- On the Foundations of Combinatorial Theory. VII: Symmetric Functions through the Theory of Distribution and Occupancy
- TABLES OF SYMMETRIC FUNCTIONS—PART I
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