Online class cover problem

In this paper, we study the online class cover problem where a (finite or infinite) family $F$ of geometric objects and a set $P_r$ of red points in $R^d$ are given a prior, and blue points from $R^d$ arrives one after another. Upon the arrival of a blue point, the online algorithm must make an irreversible decision to cover it with objects from $F$ that do not cover any points of $P_r$. The objective of the problem is to place a minimum number of objects. When $F$ consists of axis-parallel unit squares in $R^2$, we prove that the competitive ratio of any deterministic online algorithm is $\Omega (\log |P_r\left|\right)$, and also propose an $O(\log |P_r\left|\right)$-competitive deterministic algorithm for the problem.