In article <EMWXj.19289$4B6.12429@[EMAIL PROTECTED]
>, Jack <jj@[EMAIL PROTECTED]
>
wrote:
> <<How about an example; say m = 3 with [2,7] and [5,10]?>>
>
> If the members of P(m) are 2 and 3, and if x = 2, y=7, x'=5 and y'=10,
then
> N(x,y,m)=N(x',y',m), c(x,y,m)=c(x',y',m) and o(x,y,m)=o(x',y',m). This
does
> not tell us a great deal. In intervals in which o(x,y,m) is not equal to
> o(x',y',m), then one will not necessarily find -- indeed one might be
very
> hard pushed to find -- that N(x,y,m)=N(x',y',m) and
c(x,y,m)=c(x',y',m),
> which is why I constructed arrays in which there is no prescribed
> determinant of the distribution of occupied ('black') cells. With these
> arrays, one can simply state that N(x,y,m)=N(x',y',m) and
> c(x,y,m)=c(x',y',m) for a given [x,y] and [x',y'].
I don't recall a requirement that N(x,y,m)=N(x',y',m) and
c(x,y,m)=c(x',y',m) and I thought P(3) was {2, 3, 5}.
Anyway, pick your own m and intervals and then, tedious though it may
be show all you calculations, matrices, arrays and at least the
R(n,n')'s. That would really help.
--
Paul Sperry
Columbia, SC (USA)
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