A model of Non-Euclidean geometry in three dimensions, II Public Deposited

http://ir.library.oregonstate.edu/concern/graduate_thesis_or_dissertations/bv73c344s

Descriptions

Attribute NameValues
Creator
Abstract or Summary
  • This paper is a continuation of William Zell's thesis, A Model of Non-Euclidean Geometry in Three Dimensions. The purpose of that thesis was to show that the axioms of non-Euclidèan geometry are consistent if Euclidean geometry an& hence arithrnetic is consistent. Mr. Zell. discussed the axioms of connection and order arid the axiom of parallels, and we continue here with the topic of congruence and the axiom of Archimedes. Thus only consideration of the axiom of completeness remains to complete the model.
Resource Type
Date Available
Date Issued
Degree Level
Degree Name
Degree Field
Degree Grantor
Commencement Year
Advisor
Academic Affiliation
Non-Academic Affiliation
Subject
Rights Statement
Language
Digitization Specifications
  • Master files scanned at 600 ppi (256 Grayscale) using Capture Perfect 3.0 on a Canon DR-9080C in TIF format. PDF derivative scanned at 300 ppi (256 B+W), using Capture Perfect 3.0, on a Canon DR-9080C. CVista PdfCompressor 4.0 was used for pdf compression and textual OCR.
Replaces
Additional Information
  • description.provenance : Made available in DSpace on 2009-03-24T17:15:50Z (GMT). No. of bitstreams: 1 Eschrich_Robert_W_1968.pdf: 236582 bytes, checksum: eb2b9aeccc802882c58458737a83404a (MD5)
  • description.provenance : Approved for entry into archive by Linda Kathman(linda.kathman@oregonstate.edu) on 2009-03-24T17:13:45Z (GMT) No. of bitstreams: 1 Eschrich_Robert_W_1968.pdf: 236582 bytes, checksum: eb2b9aeccc802882c58458737a83404a (MD5)
  • description.provenance : Submitted by Eric Hepler (ehscanner@gmail.com) on 2009-03-18T21:40:58Z No. of bitstreams: 1 Eschrich_Robert_W_1968.pdf: 236582 bytes, checksum: eb2b9aeccc802882c58458737a83404a (MD5)
  • description.provenance : Approved for entry into archive by Linda Kathman(linda.kathman@oregonstate.edu) on 2009-03-24T17:15:50Z (GMT) No. of bitstreams: 1 Eschrich_Robert_W_1968.pdf: 236582 bytes, checksum: eb2b9aeccc802882c58458737a83404a (MD5)

Relationships

In Administrative Set:
Last modified: 08/14/2017

Downloadable Content

Download PDF
Citations:

EndNote | Zotero | Mendeley

Items