‎"ZERMELO, ERNST FRIEDRICH FERDINAND.‎
‎Beweis, dass jede Menge wohlgeordnet werden kann. (Aus einem an Herrn Hilbert gerichteten Briefe). - [INTRODUCING BOTH ""THE AXIOM OF CHOICE"" AND ""THE WELL-ORDERING THEOREM""]‎

‎Leipzig, B.G. Teubner, 1904. 8vo. Bound in half cloth with five raised bands and gilt lettering to spine. In ""Mathematische Annalen. Begründet 1868 durch von A. Clebsch und C. Neumann. 59. Band."" Small bar-code pasted on to top left corner of front wrapper. Two library labels pasted on to pasted down front free end-paper and a small stamp to verso of title page. Pp. 514-16.‎

Reference : 44952


‎First appearence of this fundamental paper in metamathematics and mathematical logic in which he introduced both ""The Axiom of Choice"" and ""his sensational proof of the well-ordering theorem"" (DSB). By this paper Zermelo contributed decisively to the development of set-theory. Zermelo took up the problem, left over by Cantor, of what to do about the comparison of sets that are not well-ordered. ""In 1904 (the paper offered) he proved....that every set can be well-ordered. To make the proof he had to use what is now known as the axiom of choice (Zermelo's axiom), which states that given any collection of nonempty, disjoined sets, it is possible to choose one member from each set and so make up a new set. The axiom of choce, the well-ordering theorem, and the fact that any two sets may be compared as to size, are equivalent principles.""(Morris Kline). A controversy arose around ""The axiom of Choice"", from Bertrand Russell, Tarski, Frege, Hilbert, Brouwer and others, mainly, and of course importent, over how to interpret the words ""choose"" and ""exists"".The issue also contain the following papers of interest:David Hilbert. Über das dirichletsche prinzip. Pp. 161-186.Lie, Sophus. Drei Kapitel aus dem unvollendeten zweiten Bande der Geometrie der Berührungstransformationen. Pp. 193-313.Schoenflies, A. Beitrage zur Theorie der Punktmengen II, Pp. 129-160.‎

€603.55 (€603.55 )
Bookseller's contact details

Herman H. J. Lynge & Son
William Schneider
Silkegade 11
1113 Copenhagen
Denmark

herman@lynge.com

+45 33 155 335

Contact bookseller

Payment mode
Cheque
Transfer
Others
Sale conditions

All items may be returned for a full refund for any reason within 14 days of receipt.

Contact bookseller about this book

Enter these characters to validate your form.
*
Send

1 book(s) with the same title

‎"ZERMELO, ERNST FRIEDRICH FERDINAND.‎

Reference : 40591

(1904)

‎Beweis, dass jede Menge wohlgeordnet werden kann. (Aus einem an Herrn Hilbert gerichteten Briefe). - [INTRODUCING BOTH ""THE AXIOM OF CHOICE"" AND ""THE WELL-ORDERING THEOREM""]‎

‎Leipzig, B.G. Teubner, 1904. With orig. printed wrappers (no backstrip) to 4. Heft, 59. Bd. of ""Mathematische Annalen"". The issue: pp. 449-572. Zermelo's paper: pp. 514-516.‎


‎First appearence of this fundamental paper in metamathematics and mathematical logic. By this paper Zermelo contributed decisively to the development of set-theory. Zermelo took up the problem, left over by Cantor, of what to do about the comparison of sets that are not well-ordered. ""In 1904 (the paper offered) he proved....that every set can be well-ordered. To make the proof he had to use what is now known as the axiom of choice (Zermelo's axiom), which states that given any collection of nonempty, disjoined sets, it is possible to choose one member from each set and so make up a new set. The axiom of choce, the well-ordering theorem, and the fact that any two sets may be compared as to size, are equivalent principles.""(Morris Kline). A controversy arose around ""The axiom of Choice"", from Bertrand Russell, Tarski, Frege, Hilbert, Brouwer and others, mainly, and of course importent, over how to interpret the words ""choose"" and ""exists"".‎

Logo ILAB

Phone number : +45 33 155 335

DKK3,500.00 (€469.43 )
Get it on Google Play Get it on AppStore
The item was added to your cart
You have just added :

-

There are/is 0 item(s) in your cart.
Total : €0.00
(without shipping fees)
What can I do with a user account ?

What can I do with a user account ?

  • All your searches are memorised in your history which allows you to find and redo anterior searches.
  • You may manage a list of your favourite, regular searches.
  • Your preferences (language, search parameters, etc.) are memorised.
  • You may send your search results on your e-mail address without having to fill in each time you need it.
  • Get in touch with booksellers, order books and see previous orders.
  • Publish Events related to books.

And much more that you will discover browsing Livre Rare Book !