Title of article
Intervals in Catalan lattices and realizers of triangulations
Author/Authors
Bernardi، نويسنده , , Olivier and Bonichon، نويسنده , , Nicolas، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
21
From page
55
To page
75
Abstract
The Stanley lattice, Tamari lattice and Kreweras lattice are three remarkable orders defined on the set of Catalan objects of a given size. These lattices are ordered by inclusion: the Stanley lattice is an extension of the Tamari lattice which is an extension of the Kreweras lattice. The Stanley order can be defined on the set of Dyck paths of size n as the relation of being above. Hence, intervals in the Stanley lattice are pairs of non-crossing Dyck paths. In a previous article, the second author defined a bijection Φ between pairs of non-crossing Dyck paths and the realizers of triangulations (or Schnyder woods). We give a simpler description of the bijection Φ. Then, we study the restriction of Φ to Tamari and Kreweras intervals. We prove that Φ induces a bijection between Tamari intervals and minimal realizers. This gives a bijection between Tamari intervals and triangulations. We also prove that Φ induces a bijection between Kreweras intervals and the (unique) realizers of stack triangulations. Thus, Φ induces a bijection between Kreweras intervals and stack triangulations which are known to be in bijection with ternary trees.
Keywords
Tamari lattice , Kreweras lattice , Stanley lattice , triangulations , Schnyder woods , bijection
Journal title
Journal of Combinatorial Theory Series A
Serial Year
2009
Journal title
Journal of Combinatorial Theory Series A
Record number
1531360
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