Joseph Pappe, Digjoy Paul, Anne Schilling
Published 2022-04-14Version 1
The Burge correspondence yields a bijection between simple labelled graphs and semistandard Young tableaux of threshold shape. We characterize the simple graphs of hook shape by peak and valley conditions on Burge arrays. This is the first step towards an analogue of Schensted's result for the RSK insertion which states that the length of the longest increasing subword of a word is the length of the largest row of the tableau under the RSK correspondence. Furthermore, we give a crystal structure on simple graphs of hook shape. The extremal vectors in this crystal are precisely the simple graphs whose degree sequence are threshold and hook-shaped.
A proof of the $\frac{n!}{2}$ conjecture for hook shapes
On Magic Distinct Labellings of Simple Graphs
Perforated Tableaux in Type $A_{n-1}$ Crystal Graphs and the RSK Correspondence
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