Re: Resolution; "abutting to"

Re: Resolution; "abutting to"

[Johannes Huebschmann]

Dear All

This "situation" reminds me of the following:

In 1976 Alexandrov was 80 years old.
A. Dold was invited to contribute to the Festschrift,
and so he did. Dold wrote his contribution
in English and it got translated thereafter into Russian.

A little while after the Festschrift had appeared Dold
received a letter from a professional translator who had translated
his paper from Russian into English.



Johannes

P. S. I have now found a reference for "spectral sequence abutting to":

P. 187 of:

J. C. Moore, Cartan's constructions,
Colloque analyse et topologie, en l'honneur de Henri
Cartan, Ast\'erisque  32--33 (1976),  173--221




On Tue, 26 Aug 2008, Fred E.J. Linton wrote:

> Greetings
>
> Let's just hope none of this creates another situation
> like the one Sammy reported facing in a North African
> fish restaurant, where his menu offered, among other
> local delicacies, "Fried Pimp", the author evidently
> having rendered the Arabic word for the fish in question,
> actually a mackerel, first into French as "maquereau",
> and thence into English as "pimp".
>
> Rhymes with "shrimp" -- easier to type than "mackerel" --
> so why not?
>
> Cheers, -- Fred
>
> ------ Original Message ------
> Received: Mon, 25 Aug 2008 04:13:56 PM EDT
> From: Michael Barr <barr@math.mcgill.ca>
> To: Categories list <categories@mta.ca>
> Subject: categories: Resolution
>
>> Thanks to Jonathan Chiche and Johannes Huebschman for the answer to my
>> question.  First off, according to the online Encyclopedia of Mathematics,
>> relatively compact means having compact closure (I had called that
>> conditionally compact; neither term is very evocative).
>>
>> Now to denombrable a l'infini, first Johannes wrote that it meant that the
>> one point compactification had a countable basis at the point at infinity.
>> Then Jonathan pointed to a '57 paper of M. Zisman that actually defined it
>> to mean \sigma-compact.  In the context of locally compact spaces, the two
>> definitions are easily seen to be equivalent!  Since \sigma-compact seems
>> to be widely used, I will go with that.
>>
>> And now let us break off this thread.
>>
>> Michael
>>
>>
>>
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