Kernighan–Lin algorithm
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The Kernighan–Lin algorithm is a heuristic algorithm for finding partitions of graphs. The algorithm has important practical application in the layout of digital circuits and components in electronic design automation of VLSI.
Description
The input to the algorithm is an undirected graph G = (V, E) with vertex set V, edge set E, and (optionally) numerical weights on the edges in E. The goal of the algorithm is to partition V into two disjoint subsets A and B of equal (or nearly equal) size, in a way that minimizes the sum T of the weights of the subset of edges that cross from A to B. If the graph is unweighted, then instead the goal is to minimize the number of crossing edges; this is equivalent to assigning weight one to each edge. The algorithm maintains and improves a partition, in each pass using a greedy algorithm to pair up vertices of A with vertices of B, so that moving the paired vertices from one side of the partition to the other will improve the partition. After matching the vertices, it then performs a subset of the pairs chosen to have the best overall effect on the solution quality T. Given a graph with n vertices, each pass of the algorithm runs in time O(n2 log n).
In more detail, for each a ∈ A {\displaystyle a\in A}, let I a {\displaystyle I_{a}} be the internal cost of a, that is, the sum of the costs of edges between a and other nodes in A, and let E a {\displaystyle E_{a}} be the external cost of a, that is, the sum of the costs of edges between a and nodes in B. Similarly, define I b {\displaystyle I_{b}}, E b {\displaystyle E_{b}} for each b ∈ B {\displaystyle b\in B}. Furthermore, let
D s = E s − I s {\displaystyle D_{s}=E_{s}-I_{s}}
be the difference between the external and internal costs of s. If a and b are interchanged, then the reduction in cost is
T o l d − T n e w = D a + D b − 2 c a , b {\displaystyle T_{old}-T_{new}=D_{a}+D_{b}-2c_{a,b}}
where c a , b {\displaystyle c_{a,b}} is the cost of the possible edge between a and b.
The algorithm attempts to find an optimal series of interchange operations between elements of A {\displaystyle A} and B {\displaystyle B} which maximizes T o l d − T n e w {\displaystyle T_{old}-T_{new}} and then executes the operations, producing a partition of the graph to A and B.
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