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Mathematical Developments Arising from Hilbert Problems, Part 1
About this Title
Felix E. Browder, Rutgers University, New Brunswick, NJ, Editor
Publication: Proceedings of Symposia in Pure Mathematics
Publication Year:
1976; Volume 28.1
ISBNs: 978-0-8218-9421-7 (print); 978-0-8218-9425-5 (online)
DOI: https://doi.org/10.1090/pspum/028.1
Table of Contents
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Front/Back Matter
Articles
- David Hilbert – Hilbert’s original article
- Felix E. Browder – Problems of present day mathematics
- Donald A. Martin – Hilbert’s first problem: the continuum hypothesis [MR 0434826]
- G. Kreisel – What have we learnt from Hilbert’s second problem? [MR 0434781]
- Herbert Busemann – Problem IV: Desarguesian spaces [MR 0430935]
- C. T. Yang – Hilbert’s fifth problem and related problems on transformation groups [MR 0425999]
- A. S. Wightman – Hilbert’s sixth problem: mathematical treatment of the axioms of physics [MR 0436800]
- R. Tijdeman – Hilbert’s seventh problem: on the Gel′fond-Baker method and its applications [MR 0434974]
- E. Bombieri – Hilbert’s 8th problem: an analogue [MR 0429904]
- Nicholas M. Katz – An overview of Deligne’s proof of the Riemann hypothesis for varieties over finite fields (Hilbert’s problem 8)
- Hugh L. Montgomery – Problems concerning prime numbers (Hilbert’s problem 8) [MR 0427249]