Erdős–Graham problem
In combinatorial number theory, the Erdős–Graham problem is the problem of proving that, if the set {2, 3, 4, ...} of integers greater than one is partitioned into finitely many subsets, then one of the subsets can be used to form an Egyptian fraction representation of unity. That is, for every r > 0, and every r-coloring of the integers greater than one, there is a finite monochromatic subset S of these integers such that
In more detail, Paul Erdős and Ronald Graham conjectured that, for sufficiently large r, the largest member of S could be bounded by br for some constant b independent of r. It was known that, for this to be true, b must be at least e.
Ernie Croot proved the conjecture as part of his Ph.D thesis, and later (while a post-doctoral student at UC Berkeley) published the proof in the Annals of Mathematics. The value Croot gives for b is very large: it is at most e167000. Croot's result follows as a corollary of a more general theorem stating the existence of Egyptian fraction representations of unity for sets C of smooth numbers in intervals of the form [X, X1+δ], where C contains sufficiently many numbers so that the sum of their reciprocals is at least six. The Erdős–Graham conjecture follows from this result by showing that one can find an interval of this form in which the sum of the reciprocals of all smooth numbers is at least 6r; therefore, if the integers are r-colored there must be a monochromatic subset C satisfying the conditions of Croot's theorem.
See also
References
- Croot, Ernest S., III (2000). "Unit Fractions". Ph.D. thesis. University of Georgia, Athens.
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(help)CS1 maint: multiple names: authors list (link) - Croot, Ernest S., III (2003). "On a coloring conjecture about unit fractions". Annals of Mathematics. 157 (2): 545–556. arXiv:math.NT/0311421. doi:10.4007/annals.2003.157.545.
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: CS1 maint: multiple names: authors list (link) - Erdős, Paul and Graham, Ronald L. (1980). "Old and new problems and results in combinatorial number theory". L'Enseignement Mathématique. 28: 30–44.
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