Minimum overlap problem

In number theory, the minimum overlap problem is a problem proposed by Hungarian mathematician Paul Erdös in 1955.^[1][2]

Let A={a_i} and B={b_j} be two complementary subsets, a splitting of the set of natural numbers {1,2,…,2n}, such that both have the same cardinality, namely n. Denote by M_k the number of solutions of the equation a_i - b_j = k, where k is an integer varying between -2n and 2n. M(n) is defined as:

${\displaystyle M(n)=\min _{A,B}\max _{k}M_{k}\,\!}$

The problem is to estimate M(n) when n is sufficiently large.^[2]

This problem can be found amongst the problems proposed by Paul Erdös in combinatorial number theory, known by English speakers as the Minimum overlap problem. It was first formulated in 1955 in the article Some remark on number theory of Riveon Lematematica, and has become one of the classical problems described by Richard Guy in his book Unsolved problems in number theory.^[1]

Since it was first formulated, there has been continuous ​​progress made in the calculation of lower bounds and upper bounds of M(n), with the following results:^[1][2]

Limit inferior	Author(s)	Year
${\displaystyle M(n)>n/4}$	P.Erdös	1955
${\displaystyle M(n)>(1-2^{-1/2})n}$	P.Erdös, Scherk	1955
${\displaystyle M(n)>(4-6^{-1/2})n/5}$	S. Swierczkowski	1958
${\displaystyle M(n)>(4-15^{1/2})^{1/2}(n-1)}$	L. Moser	1966
${\displaystyle M(n)>(4-15^{1/2})^{1/2}n}$	J. K. Haugland	1996

Limit superior	Author(s)	Year
${\displaystyle M(n)/n=1/2}$	P.Erdös	1955
${\displaystyle M(n)/n<2/5}$	T. S. Motzkin, K. E. Ralston and J. L. Selfridge,	1956
${\displaystyle M(n)/n<0.38201}$	J. K. Haugland	1996

J. K. Haugland showed that the limit of M(n)/n < 0.38569401 unconditionally. For his research, he was awarded a prize in the competition for young scientists in 1993.^[3] In 1996 he showed that the superior and inferior limits of M(n)/n are same, thus proving that the limit of M(n)/n exists.^[2][4]

The values of M(n) for the first 15 positive integers are the following:^[1]