AbstractWinkler has proved that, if n and m are positive integers with n ≤ m ≤ n25 and m ≡ n (mod 2), then there exist positive integers {xi} such that Σxi = n and Σx12 = m. Extending work of Erdős, Purdy, and Hensley, we show that the best upper limit for m is n2 − 23/2n3/2 + O(n5/4). For k ≥ 2, we show that {Σ(kxi): xi ∈ N, Σxi = n} contains {0, 1, …, ap,k(n)}, where ap,k(n) = (kn){1 − k1 + 1/kn−1/k + O(n−2/k + 1/k2)}
AbstractErdős estimated the maximal number of integers selected from {1,2,…,N}, so that none of them...
AbstractFor a > 0 let ψa(x, y) = ΣaΩ(n), the sum taken over all n, 1 ≤ n ≤ x such that if p is prime...
AbstractWe prove that the density of integers ≡2 (mod24), which can be represented as the sum of two...
Submitted to Journal of Number Theory.This paper focuses on the number of partitions of a positive i...
AbstractAsymptotic expansions, similar to those of Roth and Szekeres, are obtained for the number of...
AbstractAsymptotic results, similar to those of Roth and Szekeres, are obtained for certain partitio...
AbstractAsymptotic results are obtained for pA(k)(n), the kth difference of the function pA(n) which...
AbstractWe consider two dimensional arrays p(n,k) which count a family of partitions of n by a secon...
AbstractLet K be a positive integer. A partition {Ak,1⩽k⩽K} of the sequence of squares being given, ...
We prove that the density of integers ≡2 (mod 24), which can be represented as the sum of two square...
AbstractWe prove a lemma that is useful for obtaining upper bounds for the number of partitions with...
Given two relatively prime positive integers m < n we consider the smallest positive solution (x0, y...
AbstractErdős and Sárkőzy proposed the problem of determining the maximal density attainable by a se...
AbstractSuppose ε > 0 and k > 1. We show that if n > n0(k, ε) and A ⊆ Zn satisfies |A| > ((1k) + ε)n...
AbstractThe following two facts are shown: 1.(i) There is a computable constant γ > 0 such that, giv...
AbstractErdős estimated the maximal number of integers selected from {1,2,…,N}, so that none of them...
AbstractFor a > 0 let ψa(x, y) = ΣaΩ(n), the sum taken over all n, 1 ≤ n ≤ x such that if p is prime...
AbstractWe prove that the density of integers ≡2 (mod24), which can be represented as the sum of two...
Submitted to Journal of Number Theory.This paper focuses on the number of partitions of a positive i...
AbstractAsymptotic expansions, similar to those of Roth and Szekeres, are obtained for the number of...
AbstractAsymptotic results, similar to those of Roth and Szekeres, are obtained for certain partitio...
AbstractAsymptotic results are obtained for pA(k)(n), the kth difference of the function pA(n) which...
AbstractWe consider two dimensional arrays p(n,k) which count a family of partitions of n by a secon...
AbstractLet K be a positive integer. A partition {Ak,1⩽k⩽K} of the sequence of squares being given, ...
We prove that the density of integers ≡2 (mod 24), which can be represented as the sum of two square...
AbstractWe prove a lemma that is useful for obtaining upper bounds for the number of partitions with...
Given two relatively prime positive integers m < n we consider the smallest positive solution (x0, y...
AbstractErdős and Sárkőzy proposed the problem of determining the maximal density attainable by a se...
AbstractSuppose ε > 0 and k > 1. We show that if n > n0(k, ε) and A ⊆ Zn satisfies |A| > ((1k) + ε)n...
AbstractThe following two facts are shown: 1.(i) There is a computable constant γ > 0 such that, giv...
AbstractErdős estimated the maximal number of integers selected from {1,2,…,N}, so that none of them...
AbstractFor a > 0 let ψa(x, y) = ΣaΩ(n), the sum taken over all n, 1 ≤ n ≤ x such that if p is prime...
AbstractWe prove that the density of integers ≡2 (mod24), which can be represented as the sum of two...