Doubly Balanced Connected Graph Partitioning

Abstract

We introduce and study the doubly balanced connected graph partitioning problem: Let G =( V , E ) be a connected graph with a weight (supply/demand) function p : V → {−1, +1} satisfying p ( V )=∑ j &isin V p ( j ) = 0. The objective is to partition G into ( V 1 , V 2 ) such that G [ V 1 ] and G [ V 2 ] are connected, ∣ p ( V 1 )∣,∣ p ( V 2 )∣≤ c p , and max{ ∣ V 1 / V 2 ∣,∣ V 2 / V 1 ∣} ≤ c s , for some constants c p and c s . When G is 2-connected, we show that a solution with c p =1 and c s =2 always exists and can be found in randomized polynomial time. Moreover, when G is 3-connected, we show that there is always a “perfect” solution (a partition with p ( V 1 )= p ( V 2 )=0 and ∣ V 1 ∣=∣ V 2 ∣, if ∣ V ∣≡ 0 (mod 4)), and it can be found in randomized polynomial time. Our techniques can be extended, with similar results, to the case in which the weights are arbitrary (not necessarily ±1), and to the case that p ( V )≠ 0 and the excess supply/demand should be split evenly. They also apply to the problem of partitioning a graph with two types of nodes into two large connected subgraphs that preserve approximately the proportion of the two types.

Document Details

Document Type

Pub Defense Publication

Publication Date

Mar 09, 2020

Source ID

10.1145/3381419

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