Add to ORKGGiven relatively prime positive integers a(1), ... , a(n), the Frobenius number is the largest integer that cannot be written as a nonnegative integer combination of the a(i). We examine the parametric version of this problem: given a(i) = a(i)(t) as functions of t, compute the Frobenius number as a function of t. A function f : Z(+) -\u3e Z is a quasi-polynomial if there exists a period m and polynomials f(0), ..., f(m-1) such that f(t) = f(t mod m)(t) for all t. We conjecture that, if the a(i)(t) are polynomials (or quasi-polynomials) in t, then the Frobenius number agrees with a quasi-polynomial, for sufficiently large t. We prove this in the case where the a(i)(t) are linear functions, and also prove it in the case where n (the number o...
AbstractWe consider the following problem, which was raised by Frobenius: Given n relatively prime p...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
Parametric Presburger arithmetic concerns families of sets S_t in Z^d, for t in N, that are defined ...
Given relatively prime positive integers a(1), ... , a(n), the Frobenius number is the largest integ...
Given relatively prime positive integers a(1), ... , a(n), the Frobenius number is the largest integ...
Let N \u3e 1 be an integer, and let 1 \u3c a_1 \u3c ... \u3c a_N be relatively prime integers. Frob...
Let N \u3e 1 be an integer, and let 1 \u3c a_1 \u3c ... \u3c a_N be relatively prime integers. Frob...
We introduce and review the Frobenius Problem, determining the greatest integer not expressible as a...
Let N ≥ 2 and let 1 \u3c a1 \u3c⋯\u3c aN be relatively prime integers. The Frobenius number of this ...
AbstractLet N≥2 and let 1<a1<⋯<aN be relatively prime integers. The Frobenius number of this N-tuple...
Given a positive integer n and a set of relatively prime positive integers a1 , ..., ak ,\ud we say ...
We extend the famous diophantine Frobenius problem to a ring of polynomials over a field~k. Similar ...
AbstractWe study the Frobenius problem: given relatively prime positive integers a1,…,ad, find the l...
Let N \u3e 1 be an integer, and let 1 \u3c a1 \u3c ... \u3c aN be relatively prime integers. Frobeni...
We extend the famous diophantine Frobenius problem to a ring of polynomials over a field~k. Similar ...
AbstractWe consider the following problem, which was raised by Frobenius: Given n relatively prime p...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
Parametric Presburger arithmetic concerns families of sets S_t in Z^d, for t in N, that are defined ...
Given relatively prime positive integers a(1), ... , a(n), the Frobenius number is the largest integ...
Given relatively prime positive integers a(1), ... , a(n), the Frobenius number is the largest integ...
Let N \u3e 1 be an integer, and let 1 \u3c a_1 \u3c ... \u3c a_N be relatively prime integers. Frob...
Let N \u3e 1 be an integer, and let 1 \u3c a_1 \u3c ... \u3c a_N be relatively prime integers. Frob...
We introduce and review the Frobenius Problem, determining the greatest integer not expressible as a...
Let N ≥ 2 and let 1 \u3c a1 \u3c⋯\u3c aN be relatively prime integers. The Frobenius number of this ...
AbstractLet N≥2 and let 1<a1<⋯<aN be relatively prime integers. The Frobenius number of this N-tuple...
Given a positive integer n and a set of relatively prime positive integers a1 , ..., ak ,\ud we say ...
We extend the famous diophantine Frobenius problem to a ring of polynomials over a field~k. Similar ...
AbstractWe study the Frobenius problem: given relatively prime positive integers a1,…,ad, find the l...
Let N \u3e 1 be an integer, and let 1 \u3c a1 \u3c ... \u3c aN be relatively prime integers. Frobeni...
We extend the famous diophantine Frobenius problem to a ring of polynomials over a field~k. Similar ...
AbstractWe consider the following problem, which was raised by Frobenius: Given n relatively prime p...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
Parametric Presburger arithmetic concerns families of sets S_t in Z^d, for t in N, that are defined ...