The following pages link to (Q3836512):
Displaying 40 items.
- Playing jeu de taquin on \(d\)-complete posets (Q341339) (← links)
- Quantum cohomology of Hilb\(_n(\mathbb C^2)\) and the weighted hook walk on Young diagrams (Q420688) (← links)
- Polynomiality of some hook-length statistics (Q427273) (← links)
- A complexity theorem for the Novelli-Pak-Stoyanovskii algorithm (Q491961) (← links)
- The weighted hook length formula (Q543902) (← links)
- The algebra of binary search trees (Q557924) (← links)
- On an identity of Glass and Ng concerning the hook length formula (Q708402) (← links)
- A short Hook-lengths bijection inspired by the Greene-Nijenhuis-Wilf proof (Q801062) (← links)
- The Nekrasov-Okounkov hook length formula: refinement, elementary proof, extension and applications (Q968254) (← links)
- An elementary proof of the hook formula (Q1010756) (← links)
- A \(q\)-analog of the hook walk algorithm and random Young tableaux (Q1324671) (← links)
- A bijective proof of the hook-length formula and its analogs (Q1324681) (← links)
- A probabilistic method for the number of standard immaculate tableaux (Q1627612) (← links)
- Hook formulas for skew shapes. I: \(q\)-analogues and bijections (Q1679334) (← links)
- Building reverse plane partitions with rim-hook-shaped bricks (Q1745164) (← links)
- Performance evaluation of demodulation with diversity -- a combinatorial approach. II: Bijective methods (Q1765519) (← links)
- Another involution principle-free bijective proof of Stanley's hook-content formula (Q1806214) (← links)
- A symmetry theorem on a modified jeu de taquin (Q1864606) (← links)
- Bijective proofs of the hook formulas for the number of standard Young tableaux, ordinary and shifted (Q1894658) (← links)
- A bijective proof of the hook-content formula for super Schur functions and a modified jeu de taquin (Q1918889) (← links)
- Hook and content bijections (Q1928456) (← links)
- Hook, line and sinker: a bijective proof of the skew shifted hook-length formula (Q1987073) (← links)
- Polynomiality of certain average weights for oscillating tableaux (Q1991413) (← links)
- Applying Young diagrams to 2-symmetric fuzzy measures with an application to general fuzzy measures (Q2036791) (← links)
- Skew shape asymptotics, a case-based introduction (Q2145989) (← links)
- Hook formulas for skew shapes. IV: Increasing tableaux and factorial Grothendieck polynomials (Q2146174) (← links)
- Enumeration of bounded lecture hall tableaux (Q2186835) (← links)
- A bijective proof of Loehr-Warrington's formulas for the statistics \({\mathrm{ctot}_\frac{q}{p}}\) and \({\mathrm{mid}_\frac{q}{p}}\) (Q2256979) (← links)
- Hook formulas for skew shapes. III: Multivariate and product formulas (Q2328136) (← links)
- Trapezoidal diagrams, upward triangulations, and prime Catalan numbers (Q2411817) (← links)
- Asymptotic and exact results on the complexity of the Novelli-Pak-Stoyanovskii algorithm (Q2628258) (← links)
- Plactic key agreement (insecure?) (Q2689206) (← links)
- A bijective proof of the hook-length formula for standard immaculate tableaux (Q2790175) (← links)
- Bijective proofs of the hook formula for rooted trees. (Q2846665) (← links)
- On the Okounkov-Olshanski formula for standard tableaux of skew shapes (Q5052176) (← links)
- The hook-length formula and generalised Catalan numbers (Q5277862) (← links)
- Hook Formulas for Skew Shapes II. Combinatorial Proofs and Enumerative Applications (Q5357958) (← links)
- A bijective proof of the hook-length formula for skew shapes (Q5915826) (← links)
- On random shifted standard Young tableaux and 132-avoiding sorting networks (Q5919058) (← links)
- A bijective proof of the hook-length formula for skew shapes (Q5925178) (← links)
