English

Asymmetric Separation Problem for Bichromatic Point Set

Computational Geometry 2025-06-18 v2

Abstract

We study the Generalized Red-Blue Annulus Cover problem for two sets of points, red (RR) and blue (BB), where each point pRBp \in R\cup B is associated with a positive penalty P(p){\cal P}(p). The red points have non-covering penalties, and the blue points have covering penalties. The objective is to compute an annulus (either a rectangular or a circular) A\cal A such that the value of the function P(Rout)+P(Bin){\cal P}({R}^{out}) + {\cal P}({ B}^{in}) is minimum, where RoutR{R}^{out} \subseteq {R} is the set of red points not covered by A{\cal A}, and BinB{B}^{in} \subseteq {B} is the set of blue points covered by A\cal A. We study the problem for various types of axis-parallel rectangular annulus and circular annulus in one and two dimensions. We also study a restricted version of the rectangular annulus cover problem, where the center of the annulus is constrained to lie on a given horizontal line LL. We design a polynomial-time algorithm for each type of annulus.

Keywords

Cite

@article{arxiv.2402.13767,
  title  = {Asymmetric Separation Problem for Bichromatic Point Set},
  author = {Sukanya Maji and Supantha Pandit and Sanjib Sadhu},
  journal= {arXiv preprint arXiv:2402.13767},
  year   = {2025}
}

Comments

35 pages, 13 figures

R2 v1 2026-06-28T14:55:42.314Z