Abstract
Let N* (m) be the minimal length of a polynomial with ±1 coefficients divisible by (x - 1)m. Byrnes noted that N* (m) ≤ 2m for each m, and asked whether in fact N*(m) = 2 m. Boyd showed that N*(m) = 2m for all m ≤ 5, but N* (6) = 48. He further showed that N* (7) = 96, and that N* (8) is one of the 5 numbers 96, 144, 160, 176, or 192. Here we prove that N* (8) = 144. Similarly, let m* (N) be the maximal power of (x - 1) dividing some polynomial of degree N - 1 with ±1 coefficients. Boyd was able to find m* (N) for W < 88. In this paper we determine m* (N) for N < 168.
| Original language | English |
|---|---|
| Pages (from-to) | 1541-1552 |
| Number of pages | 12 |
| Journal | Mathematics of Computation |
| Volume | 75 |
| Issue number | 255 |
| DOIs | |
| State | Published - 1 Jul 2006 |
Keywords
- Antenna array
- Littlewood polynomials
- Spectral-null code
ASJC Scopus subject areas
- Algebra and Number Theory
- Computational Mathematics
- Applied Mathematics