Abstract
AbstractLet
$g \geq 2$
be an integer. A natural number is said to be a base-g Niven number if it is divisible by the sum of its base-g digits. Assuming Hooley’s Riemann hypothesis, we prove that the set of base-g Niven numbers is an additive basis, that is, there exists a positive integer
$C_g$
such that every natural number is the sum of at most
$C_g$
base-g Niven numbers.
Publisher
Cambridge University Press (CUP)