Brocard's problem


Brocard's problem is a problem in mathematics that asks to find integer values of n and m for which
where n! is the factorial. It was posed by Henri Brocard in a pair of articles in 1876 and 1885, and independently in 1913 by Srinivasa Ramanujan.

Brown numbers

Pairs of the numbers that solve Brocard's problem are called Brown numbers. As of 2019, there are only three known pairs of Brown numbers:
Paul Erdős conjectured that no other solutions exist. showed that there are only finitely many solutions provided that the abc conjecture is true. performed calculations for n up to 109 and found no further solutions. has extended this by three orders of magnitude to one trillion. have recently extended this by three more orders of magnitude to one quadrillion.

Variants of the problem

generalized Overholt's result by showing that it would follow from the abc conjecture that
has only finitely many solutions, for any given integer A. This result was further generalized by, who showed that the equation
has only finitely many integer solutions for a given polynomial P of degree at least 2 with integer coefficients.