Re: Question about zero divisors in finite rings
- From: "G.E. Ivey" <george.ivey@xxxxxxxxxxxxx>
- Date: Wed, 12 Sep 2007 07:06:21 EDT
In articleThe field with 4 elements? I was under the impression that a finite field had to have a prime number of elements for exactly the reasons expressed before.
<kuiee39s3pni8ah478mk7fcqv0tt9rejdb@xxxxxxx>,
Brian VanPelt <brvanpelt@xxxxxxxxxxxxx> wrote:
On Tue, 11 Sep 2007 18:07:54 -0700, Rotwang<sg552@xxxxxxxxxxxxx>
wrote:article in which a
While reading an old thread the other day I saw an
necessarily containsposter asserted that any ring with 6 elements
is true I think Izero divisors. Having thought a bit about why this
zero divisors providedcan show that a ring with n elements must have
n with exponent
i) n is composite, and
ii) no prime appears in the prime factorisation of
special case of a moregreater than one.
My question is: is this correct, and is it a
need. If n = km,general fact?
If n is composite with unity, then i) is all you
then the k*1 times m*1 is the ring zero.
I don't know what it means for a number to be
"composite with unity,"
but the field of 4 elements is a ring with a
composite number of
elements and no zero divisors.
--
Gerry Myerson (gerry@xxxxxxxxxxxxxxx) (i -> u for
email)
(I think he meant the number was composite and the ring had "unity", a multiplicative identity.)
.
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