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The authors define the class of k-vertex leafage chordal graphs, denoted Gk, which consists of all chordal graphs with vertex leafage at most k and unbounded leafage.
They prove a lower bound of ((k-1)n log n - kn log k - O(log n)) bits on the size of any data structure that encodes a graph in Gk, for k > 0 in o(n/ log n).
For every k-vertex leafage chordal graph G such that k > 1 in o(nc), c > 0, the authors present a ((k-1)n log n + o(kn log n))-bit succinct data structure.
The succinct data structure is constructed by decomposing the sub-trees of the chordal graph's clique tree into paths and using the succinct data structure for path graphs as a black box.
The data structure supports adjacency queries in O(k log n) time and neighborhood queries in O(k^2 d_v log n + log^2 n) time, where d_v is the degree of the vertex v.
The key ideas behind this work are: (1) an improved information theoretic lower bound for chordal graphs with bounded vertex leafage, and (2) a careful decomposition of the sub-trees into paths to leverage the succinct data structure for path graphs.
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arxiv.org
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