English

Two-count interval representation of a permutation

Combinatorics 2024-11-19 v1

Abstract

The interval count problem, a classical question in the study of interval orders, was introduced by Ronald Graham in the 1980s. This problem asks: given an interval order PP, what is the minimum number of distinct interval lengths required to construct an interval representation of PP? Interval orders that can be represented with just one interval length are known as semiorders, and their characterizations are well known. However, the characterization of interval orders that require at most kk interval lengths -- termed kk-count interval orders -- remains an open and challenging problem for k2k\geq 2. Our investigation into 22-count interval orders led us naturally to consider a related problem, interval representations of permutations, which we introduce in this paper. Specifically, we characterize permutations that have a 22-count interval representation. We prove that a permutation admits a 22-count interval representation if and only if its longest decreasing subsequences have length at most 22. For larger values of kk, however, a similar characterization does not hold. There are permutations that do not permit a 33-count interval representation despite having decreasing subsequences of length at most 33. Characterizing kk-count permutations remains open for k3k \geq 3. The kk-count permutation representation problem appears to capture essential aspects of the broader problem of characterizing kk-count interval orders. To support this connection, we apply our findings on interval representations of permutations to demonstrate that a height-33 interval order is 22-count if and only if it has depth at most 22, where the depth of an interval order refers to the length of the longest nested chain of intervals required in any interval representation of the order.

Keywords

Cite

@article{arxiv.2411.11133,
  title  = {Two-count interval representation of a permutation},
  author = {Csaba Biró and André E. Kézdy and Jenő Lehel},
  journal= {arXiv preprint arXiv:2411.11133},
  year   = {2024}
}
R2 v1 2026-06-28T20:02:50.857Z