Zbl.No: 727.11038
Autor: Erdös, Paul; Nicolas, J.L.; Sárközy, A.
Title: On the number of partitions of n without a given subsum. II. (In English)
Source: Analytic number theory, Proc. Conf. in Honor of Paul T. Bateman, Urbana/IL (USA) 1989, Prog. Math. 85, 205-234 (1990).
Review: [For the entire collection see Zbl 711.00008.]
Author's abstract: Let R(n,a) denote the number of unrestricted partitions of n whose subsums are all different of a, and Q(n,a) the number of unequal partitions (i.e. each part is allowed to occur at most once) with the same property. In a preceding paper [cf. Discrete Math. 75, 155-166 (1989; Zbl 673.05007)], we considered R(n,a) and Q(n,a) for a \leq \lambda1\sqrt{n}, where\lambda1 is a small constant. Here we study the case a \geq \lambda2\sqrt{n}. The behaviour of these quantities depends on the size of a, but also on the size of s(a), the smallest positive integer which does not divide a.
Reviewer: B.Garrison (San Diego)
Classif.: * 11P81 Elementary theory of partitions 05A17 Partitions of integres (combinatorics)
Keywords: unrestricted partitions; unequal partitions
Citations: Zbl 711.00008; Zbl 673.05007
