Blair D. Sullivan
Published 2012-10-31Version 1
Let S(n) be the integer sequence which is the coefficient of x^{n(n+1)/4} in the expansion of (1+x)(1+x^2), ..., (1+x^n) for positive integers n congruent to 0 or 3 mod 4. We prove a conjecture of Andrica and Tomescu that S(n) is asymptotic to \sqrt{6/\pi} 2^n n^{-3/2} as n approaches infinity.
Proof of a conjecture of Hadwiger
A new result on the problem of Buratti, Horak and Rosa
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