MMN-1123
Two divisors of $(n^2+1)/2$ summing up to $\delta*n+\epsilon$, for $\delta$ and $\epsilon$ even
Sanda Bujačić;Abstract
In this paper we are dealing with the problem of the existence of two divisors of $(n^2+1)/2$ which sum is equal to $\delta n+\varepsilon$, in the case when $\delta$ and $\varepsilon$ are even, or more precisely in the case in which $\delta\equiv\varepsilon+2\equiv0$ or $2 \pmod{4}$. We will completely solve the cases $\delta=2, \delta=4$ and $\varepsilon=0$.
Vol. 15 (2014), No. 2, pp. 333-344
DOI: 10.18514/MMN.2014.1123