Re: polynomials whose values are all perfect squares
- From: quasi <quasi@xxxxxxxx>
- Date: Fri, 21 Sep 2007 21:21:03 -0400
On Fri, 21 Sep 2007 20:06:10 -0500, Robert Israel
<israel@xxxxxxxxxxxxxxxxxxxxxxxxxxxxx> wrote:
quasi <quasi@xxxxxxxx> writes:
tommy1729 wrote:
quasi wrote:
Let f be an n-variate polynomial with integer coefficients,
regarded as a function from Z^n to Z. Suppose every element of
f(Z^n) is the square of an integer. Must f = g^2 for some n-variate
polynomial g with integer coefficients?
i asked a similar question about a month ago.
Actually, if I recall correctly, you asked if there was an integer
polynomial whose range was all non-squares. A good question and, as
of now, still unanswered.
Really? But that's too easy. Try x^2 + 2 or -1 - x^2.
No -- the range is required to be _all_ non-squares.
Clearly, a counterexample, if any, will need to be multivariate.
quasi
.
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