Representation of m as
- 1 June 1968
- journal article
- Published by Canadian Mathematical Society in Canadian Mathematical Bulletin
- Vol. 11 (2) , 289-293
- https://doi.org/10.4153/cmb-1968-036-3
Abstract
J.H. van Lint has recently shown [1] that if A(n, m) denotes the n number of representations of m in the form , where εk = 0 or 1 for -n ≤ k ≤ n then (1) Using this result, the fact that A(n, m) is a non-increasing function of |m|, and a simple recurrence relation for A(n, m) we derive the following extension of (1): (2) where [0 (n)] is any integral valued function m(n) = 0(n).Keywords
This publication has 1 reference indexed in Scilit:
- Representation of $0$ as $\sum \sp{N}\sb{K=-N}\,\varepsilon \sb{k}k$Proceedings of the American Mathematical Society, 1967