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* Re: the Church-Howard Correspondence
@ 2011-05-04 15:27 Vasili I. Galchin
  2011-05-05 13:47 ` Philip Scott
  0 siblings, 1 reply; 3+ messages in thread
From: Vasili I. Galchin @ 2011-05-04 15:27 UTC (permalink / raw)
  To: Categories mailing list

After thinking about my English, please let me add to my previous posting. I
believe the author of the paper is proving an equivalence of an informal
notion (Curry-Howard "Isomorphism) with a formal mathematical notion (the
equivalence of categories).

Regards,

Vasili

On Tue, May 3, 2011 at 4:18 PM, Vasili I. Galchin <vigalchin@gmail.com> wrote:
> Hello,
>
>      I started reading a paper
> www.math.uchicago.edu/~may/VIGRE/VIGRE2010/REUPapers/Berger.pdf
> entitled "A Categorical Approach to Proofs-As-Programs" by Carson
> Berger. He seems to be giving a formal equivalence of the various
> sides of this famous Correspondence using equivalence of categories.
> Have any members of this forum read this paper and if so, what
> significance do you give this paper?
>
> Thank you,
>
> Vasili
>


[For admin and other information see: http://www.mta.ca/~cat-dist/ ]


^ permalink raw reply	[flat|nested] 3+ messages in thread
* Re: the Church-Howard Correspondence
  2011-05-04 15:27 the Church-Howard Correspondence Vasili I. Galchin
@ 2011-05-05 13:47 ` Philip Scott
  2011-05-06 16:57   ` soloviev
  0 siblings, 1 reply; 3+ messages in thread
From: Philip Scott @ 2011-05-05 13:47 UTC (permalink / raw)
  To: Vasili I. Galchin; +Cc: Categories mailing list

Dear Vasili:  The author doesn't refer to, nor even seem to know about, my book with J. Lambek,
Introduction to Higher-Order Categorical Logic, J. Lambek and P. J. Scott, 
Cambridge Univ. Press, 1986, where all this was done in  great detail. 

In fact, the three way correspondence between categories of deductive systems,  of
cartesian closed categories, and of typed lambda calculi (which the author wishes
to explain) was first done there, with many applications.


 							Best,
   							Phil Scott



On 2011-05-04, at 4:27 PM, Vasili I. Galchin wrote:

> After thinking about my English, please let me add to my previous posting. I
> believe the author of the paper is proving an equivalence of an informal
> notion (Curry-Howard "Isomorphism) with a formal mathematical notion (the
> equivalence of categories).
> 
> Regards,
> 
> Vasili
> 
> On Tue, May 3, 2011 at 4:18 PM, Vasili I. Galchin <vigalchin@gmail.com> wrote:
>> Hello,
>> 
>>      I started reading a paper
>> www.math.uchicago.edu/~may/VIGRE/VIGRE2010/REUPapers/Berger.pdf
>> entitled "A Categorical Approach to Proofs-As-Programs" by Carson
>> Berger. He seems to be giving a formal equivalence of the various
>> sides of this famous Correspondence using equivalence of categories.
>> Have any members of this forum read this paper and if so, what
>> significance do you give this paper?
>> 
>> Thank you,
>> 
>> Vasili
>> 
> 
> 
> [For admin and other information see: http://www.mta.ca/~cat-dist/ ]



[For admin and other information see: http://www.mta.ca/~cat-dist/ ]


^ permalink raw reply	[flat|nested] 3+ messages in thread
* Re: Re: the Church-Howard Correspondence
  2011-05-05 13:47 ` Philip Scott
@ 2011-05-06 16:57   ` soloviev
  0 siblings, 0 replies; 3+ messages in thread
From: soloviev @ 2011-05-06 16:57 UTC (permalink / raw)
  To: Philip Scott; +Cc: Vasili I. Galchin, Categories mailing list

Hi,

I would like to add, that in lesser detail (not like
in the handbook-style presentation in Lambek and Scott),
but sufficient for technical applications it was described
and systematically
used in the papers of Grigori Mints (who was then
my adviser) and my own:

G. Mints. Closed Categories and the Theory of Proofs.
J. of Soviet Mathematics, 15, 1, 45-62, 1982.
http://www.springerlink.com/content/l84428791771mx2u/

Gregorii E. Mints. Proof theory and category theory. In Selected Papers in
Proof Theory, chapter 10, pages 183-212. Bibliopolis/North-IIolland, 1992.
(Russian version - 1979.)

[Babaev and Soloviev, 1979] A.A. Babaev and S.V. Soloviev.
A coherence theorem for
canonical maps in cartesian closed categories. Zapisiki Nauchnykh
SeminaTvv LOMI, 88, 1979. Russian with English summary. English
translation appears in J. of Soviet
Math., 20, 1982.


S. V. Solov'ev. Journal of Mathematical Sciences
Volume 22, Number 3, 1387-1400, 1983. DOI: 10.1007/BF01084396
The category of finite sets and Cartesian closed categories

http://www.springerlink.com/content/rg33151k36414064/


All the best

Sergei Soloviev


> Dear Vasili:  The author doesn't refer to, nor even seem to know about,
my
> book with J. Lambek,
> Introduction to Higher-Order Categorical Logic, J. Lambek and P. J.
Scott,
> Cambridge Univ. Press, 1986, where all this was done in  great detail.
>
> In fact, the three way correspondence between categories of deductive
systems,  of
> cartesian closed categories, and of typed lambda calculi (which the
author
> wishes
> to explain) was first done there, with many applications.
>
>
>  							Best,
>    							Phil Scott
>

[For admin and other information see: http://www.mta.ca/~cat-dist/ ]


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