Re: Is x^n + (x+2)^n irreducible over Q if n is a power of 2?
- From: "Peter L. Montgomery" <Peter-Lawrence.Montgomery@xxxxxx>
- Date: Sun, 10 Sep 2006 19:01:42 GMT
In article <1157911324.533652.64880@xxxxxxxxxxxxxxxxxxxxxxxxxxxx>
"Edwin Clark" <eclark@xxxxxxxxxxxx> writes:
Is the polynomial x^n + (x+2)^n irreducible over Q if n is a power ofLet f(x) be an irreducible factor (over Q) of x^n + (x + 2)^n.
2?
It is true at least for n = 2^k, k=1..10.
Suppose f(alpha) = 0. If beta = (alpha + 2)/alpha,
then degree(Q(beta)) <= degree(Q(alpha)).
Also beta^n + 1 = 0. Take it from there.
--
Expel the plutarchs from Washington, DC this November.
Put us on a sensible orbit amongst the solar powers.
pmontgom@xxxxxx Microsoft Research and CWI Home: Bellevue, WA
.
- Follow-Ups:
- Re: Is x^n + (x+2)^n irreducible over Q if n is a power of 2?
- From: Edwin Clark
- Re: Is x^n + (x+2)^n irreducible over Q if n is a power of 2?
- References:
- Is x^n + (x+2)^n irreducible over Q if n is a power of 2?
- From: Edwin Clark
- Is x^n + (x+2)^n irreducible over Q if n is a power of 2?
- Prev by Date: complex financial maths problem
- Next by Date: Matrix rank code
- Previous by thread: Is x^n + (x+2)^n irreducible over Q if n is a power of 2?
- Next by thread: Re: Is x^n + (x+2)^n irreducible over Q if n is a power of 2?
- Index(es):
