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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