The Diophantine Frobenius Problem revisited
Abstract
Let k 2 and a1, a2, ·s, ak be positive integers with \[ (a1, a2, ·s, ak)=1. \] It is proved that there exists a positive integer Ga1, a2, ·s, ak such that every integer n strictly greater than it can be represented as the form \[ n=a1x1+a2x2+·s+akxk, (x1, x2, ·s, xk∈Z 0,~(x1, x2, ·s, xk)=1). \] We then investigate the size of Ga1, a2 explicitly. Our result strengthens the primality requirement of x's in the classical Diophantine Frobenius Problem.
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