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The problem of finding a maximum cut of an arbitrary graph is one of a list of 21 combinatorial problems (Karp–Cook list). It is unknown whether or not there exist algorithms operating in polynomial bounded time for any of these problems. It has been shown that existence for one implies existence for all. In this paper we deal with a special case of the maximum cut problem. By requiring the graph to be planar, it is shown the problem can be translated into a maximum weighted matching problem for which there exists a polynomial bounded algorithm.
Frank Hadlock (Mon,) studied this question.
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