contraharmonic Diophantine equation

We call contraharmonic Diophantine equation the equation

\\displaystyle u^{2}+v^{2}\\;=\\;(u+v)c

(1)

of the three unknowns $u$ , $v$ , $c$ required to get only positive integervalues. The equation expresses that $c$ is the contraharmonicmean of $u$ and $v$ . As proved in the article“contraharmonic means and Pythagoreanhypotenuses”, the supposition $u\eq v$ implies that thenumber $c$ must be the hypotenuse in a Pythagorean triple $(a,b,c)$ , and if particularly $u<v$ , then

\\displaystyle u\\;=\\;\\frac{c+b-a}{2},\\quad v\\;=\\;\\frac{c+b+a}{2}.

(2)

For getting the general solution of the quadratic Diophantineequation (1), one can utilise the general formulas forPythagorean triples

\\displaystyle a\\;=\\;l\\!\\cdot\\!(m^{2}-n^{2}),\\quad b\\;=\\;l\\!\\cdot\\!2mn,\\quad c%\\;=\\;l\\!\\cdot\\!(m^{2}+n^{2})

(3)

where the parameters $l$ , $m$ , $n$ are arbitrary positiveintegers with $m>n$ . Using (3) in (2) one obtains theresult

\\displaystyle\\begin{cases}u_{1}\\;=\\;l(m^{2}-mn),\\\\u_{2}\\;=\\;l(n^{2}+mn),\\\\v\\;=\\;l(m^{2}+mn),\\\\c\\;=\\;l(m^{2}+n^{2}),\\end{cases}

(4)

in which $u_{1}$ and $u_{2}$ mean the alternative values for $u$ gotten from (2) by swappingthe expressions of $a$ and $b$ in (3).

It’s clear that the contraharmonic Diophantine equation has aninfinite set of solutions (4). According to the Proposition6 of the article “integer contraharmonic means”, fixing e.g.the variable $u$ allows for the equation only a restrictednumber of pertinent values $v$ and $c$ . See also thealternative expressions (1) and (2) in the article “sums oftwo squares”.