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Directory:Jon Awbrey/Papers/Differential Analytic Turing Automata (view source)

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==Note 22==

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~~<pre>~~

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To see how each finite approximation to a given turing machine can be given a purely propositional description, one fixes the parameter <math>k\!</math> and limits the rest of the discussion to describing <math>\operatorname{Stilt}(k),</math> which is not really a full-fledged TM anymore but just a finite automaton in disguise.

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To see how each finite approximation to a given turing machine

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can be given a purely propositional description, one fixes the

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parameter k and limits the rest of the discussion to describing

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Stilt(k), which is not really a full-fledged TM anymore but just

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a finite automaton in disguise.

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In this example, for the sake of a minimal illustration,

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In this example, for the sake of a minimal illustration, we choose <math>k = 2,\!</math> and discuss <math>\operatorname{Stunt}(2).</math> Since the zeroth tape cell and last tape cell are both occupied by the character <math>^{\backprime\backprime}\texttt{\#}^{\prime\prime}</math> that is used for both the ''beginning of file'' <math>(\operatorname{bof})</math> and ''end of file'' <math>(\operatorname{eof})</math> markers, this allows for only one digit of significant computation.

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we choose k = 2, and discuss Stunt(2). Since the zeroth

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tape cell and ~~the~~ last tape cell are occupied ~~with~~ the

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bof and eof ~~marks "#"~~, this ~~amounts to~~ only one digit

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of significant computation.

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<pre>

To translate Stunt(2) into propositional form we

use the following collection of basic propositions,

Jon Awbrey

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