3sum

In computational geometry a problem is called 3sum-hard if solving it in subquadratic time implies a subquadratic-time algorithm for the following problem:

Given a set S of n integers, are there elements a, b, c in S such that a + b + c = 0?

There is a simple algorithm to solve 3sum in O(n²) time. This is the fastest algorithm known, but matching lower bounds are only known in very specialized models of computation. The concept of 3sum-hardness was introduced by Gajentaan and Overmars GO95. By now there is a multitude of problems that falls into this category. (Add REFS)

References

DMO04: Erik D. Demaine, Joseph S. B. Mitchell, and Joseph O'Rourke. The open problems project, Problem 11.
GO95: Anka Gajentaan and Mark H. Overmars. On a class of O(n²) problems in computational geometry. Comput. Geom. Theory Appl., 5:165-185, 1995.

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