Unique polynomial solution of m/n=1/x+1/y+1/z for n b mod\, a if (a,m)=1

Abstract

Necessary and sufficient conditions for the existence of an integer solution of the diophantine equation m/n=1/x(λ)+1/y(λ)+1/z(λ) with n=b+aλ are explicitly given for a,b coprime and a not a multiple of m . The solution has the form x(λ)=kn(λ), y(λ)=n(λ)(s+rλ), z(λ)=(kl/r)(s+rλ) where parameters k,l,s,r∈ Z obey certain conditions depending on a,b. The conditions imply restrictions for some choices of a,b which differ from the ones known in the case m=4. E.g., the modulus must be of the form l(mk-1). One can also deduce that primes of the form 1+4K are excluded as modulus. Also if a=p m is prime and b=a+1, i.e., n 1 mod\, p, polynomial solutions are shown to be impossible. All results are valid for integers m 4.