Hi Craig Weinberg
According to Kant, the fundamentals or primitives of spacetime objects
are the two fundamental (inextended) intuitions:

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1) a sliver of time alone (showing when something happens)
and 2) a frame of space alone (showuing what happens).
If you join these primitives, then you get an extended object in
spacetime.
Roger Clough, rclo...@verizon.net
11/7/2012
"Forever is a long time, especially near the end." -Woody Allen
----- Receiving the following content -----
From: Craig Weinberg
Receiver: everything-list
Time: 2012-11-07, 10:24:23
Subject: Re: Arithmetic doesn't even suggest geometry, let alone awareness.
On Wednesday, November 7, 2012 8:19:03 AM UTC-5, Stephen Paul King wrote:
On 11/7/2012 7:42 AM, Craig Weinberg wrote:
> Can anyone explain why geometry/topology would exist in a comp universe?
> --
Hi Craig,
So far it seems that there is only a singular set of countable
recursive functions (or equivalent) and thus a single Boolean algebra
for the Universal Machine. If the BA (of the Universal number or
Machine) has an infinite number of propositions, how could it be divided
up into finite Boolean subalgebras BA_i, where each of them has a
mutually consistent set of propositions?
Additionally, how is 'time' defined by comp such that
transformations of topologies can be considered.
It occurs to me that computation can only occur where topological position is
borrowed from the physical, spacetime presence of persistent bodies. Sense and
static realism must exist a priori to computation.
Craig
--
Onward!
Stephen
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