English

Boundary optimization for rough sets

Combinatorics 2019-06-21 v1

Abstract

Let n>m2n > m\ge 2 be integers and let A={A1,,Am}\mathcal{A}=\{A_1,\dots,A_m\} be a partition of [n]={1,,n}[n]=\{1,\dots,n\}. For X[n]X \subseteq [n], its A\mathcal{A}-boundary region A(X)\mathcal{A}(X) is defined to be the union of those blocks AiA_i of A\mathcal{A} for which AiXA_i\cap X\neq \emptyset and Ai([n]X)A_i\cap ([n] \setminus X)\neq \emptyset. For three different probability distributions on the power set of [n][n], partitions A\mathcal{A} of [n][n] are determined such that the expected cardinality of the A\mathcal{A}-boundary region of a randomly chosen subset of [n][n] is minimal and maximal, respectively. The problem can be reduced to an optimization problem for integer partitions of nn. In the most difficult case, the concave-convex shape of the corresponding weight function as well as several other inequalities are proved using an integral representation of the weight function. In one case, there is an interesting analogon to the AZ-identity. The study is motivated by the rough set theory.

Keywords

Cite

@article{arxiv.1709.05109,
  title  = {Boundary optimization for rough sets},
  author = {Konrad Engel and Tran Dan Thu},
  journal= {arXiv preprint arXiv:1709.05109},
  year   = {2019}
}
R2 v1 2026-06-22T21:44:05.417Z