How to prove that models of indirect and direct RAM machines are equivalent?
1
$begingroup$
as in the title, I am looking for a formal proof how to show that models of indirect and direct RAM (random-access) machines are equivalent.
I would really appreciate your help.
formal-languages turing-machines formal-grammar
edited Jan 1 at 14:06
Bram28
63.2k44793
asked Dec 31 '18 at 18:43
TomasTomas
82
$endgroup$
add a comment |
1
$begingroup$
as in the title, I am looking for a formal proof how to show that models of indirect and direct RAM (random-access) machines are equivalent.
I would really appreciate your help.
formal-languages turing-machines formal-grammar
edited Jan 1 at 14:06
Bram28
63.2k44793
asked Dec 31 '18 at 18:43
TomasTomas
82
$endgroup$
2
$begingroup$
This is probably better suited for cs.stackexchange.com or even cstheory.stackexchange.com
$endgroup$
– Math1000
Dec 31 '18 at 21:07
add a comment |
1
1
1
$begingroup$
as in the title, I am looking for a formal proof how to show that models of indirect and direct RAM (random-access) machines are equivalent.
I would really appreciate your help.
formal-languages turing-machines formal-grammar
edited Jan 1 at 14:06
Bram28
63.2k44793
asked Dec 31 '18 at 18:43
TomasTomas
82
$endgroup$
as in the title, I am looking for a formal proof how to show that models of indirect and direct RAM (random-access) machines are equivalent.
I would really appreciate your help.
formal-languages turing-machines formal-grammar
formal-languages turing-machines formal-grammar
edited Jan 1 at 14:06
Bram28
63.2k44793
asked Dec 31 '18 at 18:43
TomasTomas
82
edited Jan 1 at 14:06
Bram28
63.2k44793
asked Dec 31 '18 at 18:43
TomasTomas
82
edited Jan 1 at 14:06
Bram28
63.2k44793
edited Jan 1 at 14:06
Bram28
63.2k44793
edited Jan 1 at 14:06
Bram28
63.2k44793
63.2k44793
asked Dec 31 '18 at 18:43
TomasTomas
82
asked Dec 31 '18 at 18:43
TomasTomas
82
asked Dec 31 '18 at 18:43
TomasTomas
82
82
2
$begingroup$
This is probably better suited for cs.stackexchange.com or even cstheory.stackexchange.com
$endgroup$
– Math1000
Dec 31 '18 at 21:07
add a comment |
2
$begingroup$
This is probably better suited for cs.stackexchange.com or even cstheory.stackexchange.com
$endgroup$
– Math1000
Dec 31 '18 at 21:07
2
2
$begingroup$
This is probably better suited for cs.stackexchange.com or even cstheory.stackexchange.com
$endgroup$
– Math1000
Dec 31 '18 at 21:07
$begingroup$
This is probably better suited for cs.stackexchange.com or even cstheory.stackexchange.com
$endgroup$
– Math1000
Dec 31 '18 at 21:07
add a comment |
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This is probably better suited for cs.stackexchange.com or even cstheory.stackexchange.com
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– Math1000
Dec 31 '18 at 21:07