Let phi be the Euler's totient function and sigma k(n) = Sigma(d vertical bar n) d(k) that is, the sum of the kth powers of the divisors of n. B. Sury showed that Sigma gcd(t(1) - 1, t(2), . . . , t(r), n) = phi(n)sigma r-1(n) t(1) is an element of U(Z(n)), t(2), ... t(r) is an element of Z(n) where U(Z(n)) is the group of units in the ring of residual classes modulo n. Here, this identity is extended to residually finite Dedekind domains.

• 出版日期2016-7