TY - JOUR TI - Maximum rooted connected expansion AU - Lamprou, I. AU - Martin, R. AU - Schewe, S. AU - Sigalas, I. AU - Zissimopoulos, V. JO - Theoretical Computer Science PY - 2021 VL - 873 TODO - null SP - 25-37 PB - Elsevier B.V. SN - 0304-3975 TODO - 10.1016/j.tcs.2021.04.022 TODO - Approximation algorithms; Budget control; Expansion; Graph theory; Graphic methods, Approximation; Domination; Graph G; Neighbourhood; Polynomial time approximation schemes; Prefetching; Ratio; Splits graphs; Web graphs; Web surfing, Polynomial approximation TODO - Prefetching constitutes a valuable tool toward the goal of efficient Web surfing. As a result, estimating the amount of resources that need to be preloaded during a surfer's browsing becomes an important task. In this regard, prefetching can be modeled as a two-player combinatorial game (Fomin et al. (2014) [6]), where a surfer and a marker alternately play on a given graph (representing the Web graph). During its turn, the marker chooses a set of k nodes to mark (prefetch), whereas the surfer, represented as a token resting on graph nodes, moves to a neighboring node (Web resource). The surfer's objective is to reach an unmarked node before all nodes become marked and the marker wins. Intuitively, since the surfer is step-by-step traversing a subset of nodes in the Web graph, a satisfactory prefetching procedure would load in cache (without any delay) all resources lying in the neighborhood of this growing subset. Motivated by the above, we consider the following maximization problem to which we refer to as the Maximum Rooted Connected Expansion (MRCE) problem. Given a graph G and a root node v0, we wish to find a subset of vertices S such that S is connected, S contains v0 and the ratio [Formula presented] is maximized, where N[S] denotes the closed neighborhood of S, that is, N[S] contains all nodes in S and all nodes with at least one neighbor in S. We prove that the problem is NP-hard even when the input graph G is restricted to be a split graph. On the positive side, we demonstrate a Polynomial Time Approximation Scheme (PTAS) for split graphs. Furthermore, we present a [Formula presented]-approximation algorithm for general graphs based on techniques for the Budgeted Connected Domination problem (Khuller et al. (2014) [20]). Finally, we provide a polynomial-time algorithm for the special case of interval graphs. Our algorithm returns an optimal solution for MRCE in O(n3) time, where n is the number of nodes in G, and in logarithmic space. © 2021 Elsevier B.V. ER -