Abstract: Given a set of clients and a set of facilities with different priority levels in a metric space, the Budgeted Priority p-Median problem aims to open a subset of facilities and connect each client to an opened facility with the same or a higher priority level, such that the number of opened facilities associated with each priority level is no more than a given upper limit, and the sum of the client-connection costs is minimized.In this paper, we present a data reduction-based approach for limiting the solution search space of the Budgeted Priority $p$-Median problem, which yields a $(1+ \varepsilon$ )-approximation algorithm running in $O(n d \log n)+\left(p \varepsilon^{-1}\right)^{p \varepsilon^{-O(1)}} n^{O(1)}$ time in $d$ dimensional Euclidean space, where $n$ is the size of the input instance and $p$ is the maximal number of opened facilities. The previous best approximation ratio for this problem obtained in the same time is $(3+\varepsilon)$.

Key words: Approximation algorithms, Facility location, p-Median