Minimum Number of Monotone Subsequences of Length 4 in Permutations
نویسندگان
چکیده
We show that for every sufficiently large n, the number of monotone subsequences of length four in a permutation on n points is at least (bn/3c 4 ) + (b(n+1)/3c 4 ) + (b(n+2)/3c 4 ) . Furthermore, we characterize all permutations on [n] that attain this lower bound. The proof uses the flag algebras framework together with some additional stability arguments. This problem is equivalent to some specific type of edge colorings of complete graphs with two colors, where the number of monochromatic K4’s is minimized. We show that all the extremal colorings must contain monochromatic K4’s only in one of the two colors. This translates back to permutations, where all the monotone subsequences of length four are all either increasing, or decreasing only.
منابع مشابه
The Minimum Number of Monotone Subsequences
Erdős and Szekeres showed that any permutation of length n ≥ k2 + 1 contains a monotone subsequence of length k + 1. A simple example shows that there need be no more than (n mod k) (dn/ke k+1 ) + (k − (n mod k))(bn/kc k+1 ) such subsequences; we conjecture that this is the minimum number of such subsequences. We prove this for k = 2, with a complete characterisation of the extremal permutation...
متن کاملLongest Monotone Subsequences and Rare Regions of Pattern-Avoiding Permutations
We consider the distributions of the lengths of the longest monotone and alternating subsequences in classes of permutations of size n that avoid a specific pattern or set of patterns, with respect to the uniform distribution on each such class. We obtain exact results for any class that avoids two patterns of length 3, as well as results for some classes that avoid one pattern of length 4 or m...
متن کاملOn Minimum k-Modal Partitions of Permutations
Partitioning a permutation into a minimum number of monotone subsequences is NP-hard. We extend this complexity result to minimum partitioning into k-modal subsequences; here unimodal is the special case k = 1. Based on a network flow interpretation we formulate both, the monotone and the k-modal version, as mixed integer programs. This is the first proposal to obtain provably optimal partition...
متن کاملMonotone Subsequences in High-Dimensional Permutations
This paper is part of the ongoing effort to study high-dimensional permutations. We prove the analogue to the Erdős–Szekeres Theorem: For every k ≥ 1, every order-n k-dimensional permutation contains a monotone subsequence of length Ωk (√ n ) , and this is tight. On the other hand, and unlike the classical case, the longest monotone subsequence in a random kdimensional permutation of order n is...
متن کاملPermutations with short monotone subsequences
We consider permutations of 1, 2, ..., n whose longest monotone subsequence is of length n and are therefore extremal for the Erdős-Szekeres theorem. Such permutations correspond via the Robinson-Schensted correspondence to pairs of square n × n Young tableaux. We show that all the bumping sequences are constant and therefore these permutations have a simple description in terms of the pair of ...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
عنوان ژورنال:
- Combinatorics, Probability & Computing
دوره 24 شماره
صفحات -
تاریخ انتشار 2015