Better bounds for poset dimension and boxicity

Abstract

We prove that the dimension of every poset whose comparability graph has maximum degree is at most 1+o(1) . This result improves on a 30-year old bound of F\"uredi and Kahn, and is within a o(1) factor of optimal. We prove this result via the notion of boxicity. The "boxicity" of a graph G is the minimum integer d such that G is the intersection graph of d-dimensional axis-aligned boxes. We prove that every graph with maximum degree has boxicity at most 1+o(1) , which is also within a o(1) factor of optimal. We also show that the maximum boxicity of graphs with Euler genus g is (g g), which solves an open problem of Esperet and Joret and is tight up to a O(1) factor.