The Gapped $k$-Deck Problem
Abstract
The -deck problem is concerned with finding the smallest positive integer such that there exist at least two strings of length that share the same -deck, i.e., the multiset of subsequences of length . We introduce the new problem of gapped -deck reconstruction: For a given gap parameter , we seek the smallest positive integer such that there exist at least two distinct strings of length that cannot be distinguished based on a "gapped" set of -subsequences. The gap constraint requires the elements in the subsequences to be at least positions apart within the original string. Our results are as follows. First, we show how to construct sequences sharing the same -gapped -deck using a nontrivial modification of the recursive Morse-Thue string construction procedure. This establishes the first known constructive upper bound on . Second, we further improve this bound using the approach by Dudik and Schulman.
Cite
@article{arxiv.2201.12671,
title = {The Gapped $k$-Deck Problem},
author = {Jonas Golm and Mina Nahvi and Ryan Gabrys and Olgica Milenkovic},
journal= {arXiv preprint arXiv:2201.12671},
year = {2025}
}