Frobenius problem and the covering radius of a lattice

Abstract

Let N ≥2 and let 1 < a1 < ... < aN be relatively prime integers. Frobenius number of this N-tuple is defined to be the largest positive integer that cannot be expressed as Σi=1N ai xi where x1,...,xN are non-negative integers. The condition that gcd(a1,...,aN)=1 implies that such number exists. The general problem of determining the Frobenius number given N and a1,...,aN is NP-hard, but there has been a number of different bounds on the Frobenius number produced by various authors. We use techniques from the geometry of numbers to produce a new bound, relating Frobenius number to the covering radius of the null-lattice of this N-tuple. Our bound is particularly interesting in the case when this lattice has equal successive minima, which, as we prove, happens infinitely often.

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