If m is a positive integer, not a perfect square, there are two obvious kinds of Frobenius problems that can be posed in Z[ m]. One kin
AbstractLet N≥2 and let 1<a1<⋯<aN be relatively prime integers. The Frobenius number of this N-tuple...
AbstractThe Diophantine Problem of Frobenius is to find a formula for the least integer not represen...
Let N ≥ 2 and let 1 \u3c a1 \u3c⋯\u3c aN be relatively prime integers. The Frobenius number of this ...
It is widely known that if p and q are relatively prime positive integers then (a) the set of linear...
We introduce and review the Frobenius Problem, determining the greatest integer not expressible as a...
Let N \u3e 1 be an integer, and let 1 \u3c a_1 \u3c ... \u3c a_N be relatively prime integers. Frob...
AbstractIn the Frobenius problem with two variables, one is given two positive integers a and b that...
The Frobenius problem is about finding the largest integer that is not contained in the numerical se...
For the well known Frobenius problem, we present a new geometric approach, based on the use of the n...
AbstractLet a and b be positive and relatively prime integers. We show that the following are equiva...
Let N \u3e 1 be an integer, and let 1 \u3c a1 \u3c ... \u3c aN be relatively prime integers. Frobeni...
Let S be a map from a language Lto the integers satisfying S(vw) =S(v) +S(w)for all v, w ∈L. The cl...
Let n ≥ 2 and k ≥ 1 be integers and a = (a_1,...,a_n) be an integer vector with positive coprime e...
Let p = ( p 1 ,…, p n ) be a vector of positive integers whose greatest common divisor is unity. The...
AbstractDoes a given system of linear equations Ax=b have a non-negative integer solution? This is a...
AbstractLet N≥2 and let 1<a1<⋯<aN be relatively prime integers. The Frobenius number of this N-tuple...
AbstractThe Diophantine Problem of Frobenius is to find a formula for the least integer not represen...
Let N ≥ 2 and let 1 \u3c a1 \u3c⋯\u3c aN be relatively prime integers. The Frobenius number of this ...
It is widely known that if p and q are relatively prime positive integers then (a) the set of linear...
We introduce and review the Frobenius Problem, determining the greatest integer not expressible as a...
Let N \u3e 1 be an integer, and let 1 \u3c a_1 \u3c ... \u3c a_N be relatively prime integers. Frob...
AbstractIn the Frobenius problem with two variables, one is given two positive integers a and b that...
The Frobenius problem is about finding the largest integer that is not contained in the numerical se...
For the well known Frobenius problem, we present a new geometric approach, based on the use of the n...
AbstractLet a and b be positive and relatively prime integers. We show that the following are equiva...
Let N \u3e 1 be an integer, and let 1 \u3c a1 \u3c ... \u3c aN be relatively prime integers. Frobeni...
Let S be a map from a language Lto the integers satisfying S(vw) =S(v) +S(w)for all v, w ∈L. The cl...
Let n ≥ 2 and k ≥ 1 be integers and a = (a_1,...,a_n) be an integer vector with positive coprime e...
Let p = ( p 1 ,…, p n ) be a vector of positive integers whose greatest common divisor is unity. The...
AbstractDoes a given system of linear equations Ax=b have a non-negative integer solution? This is a...
AbstractLet N≥2 and let 1<a1<⋯<aN be relatively prime integers. The Frobenius number of this N-tuple...
AbstractThe Diophantine Problem of Frobenius is to find a formula for the least integer not represen...
Let N ≥ 2 and let 1 \u3c a1 \u3c⋯\u3c aN be relatively prime integers. The Frobenius number of this ...