Sparse Bounded Hop-Spanners for Geometric Intersection Graphs
Abstract
We present new results on 2- and 3-hop spanners for geometric intersection graphs. These include improved upper and lower bounds for 2- and 3-hop spanners for many geometric intersection graphs in Rd. For example, we show that the intersection graph of n balls in Rd admits a 2-hop spanner of size O*(n32-12(2 d/2 +1)) and the intersection graph of n fat axis-parallel boxes in Rd admits a 2-hop spanner of size O(n d+1n). Furthermore, we show that the intersection graph of general semi-algebraic objects in Rd admits a 3-hop spanner of size O*(n32-12(2D-1)), where D is a parameter associated with the description complexity of the objects. For such families (or more specifically, for tetrahedra in R3), we provide a lower bound of (n43). For 3-hop and axis-parallel boxes in Rd, we provide the upper bound O(n d-1n) and lower bound (n ( n n)d-2).
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