A. I. Generalov, “A combinatorial proof of Euler–Fermat's theorem on presentation of primes of the form $p=8k+3$ by the quadratic form $x^2+2y^2$”, Problems in the theory of representations of algebras and groups. Part 13, Zap. Nauchn. Sem. POMI, 330, POMI, St. Petersburg, 2006, 155–157; J. Math. Sci. (N. Y.), 140:5 (2007), 690

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Zapiski Nauchnykh Seminarov POMI, 2006, Volume 330, Pages 155–157 (Mi znsl283)

This article is cited in 2 scientific papers (total in 2 papers)

A combinatorial proof of Euler–Fermat's theorem on presentation of primes of the form $p=8k+3$ by the quadratic form $x^2+2y^2$

A. I. Generalov

Saint-Petersburg State University

Full-text PDF (110 kB) Citations (2)

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Abstract: An elementary and extremely short proof of the theorem on presentation of primes of the form $p=8k+3$ by the quadratic form $x^2+2y^2$ with integers $x,y$.

Received: 10.12.2005

English version:
Journal of Mathematical Sciences (New York), 2007, Volume 140, Issue 5, Pages 690–691
DOI: https://doi.org/10.1007/s10958-007-0008-6

Bibliographic databases:

UDC: 512.5

Language: Russian

Citation: A. I. Generalov, “A combinatorial proof of Euler–Fermat's theorem on presentation of primes of the form $p=8k+3$ by the quadratic form $x^2+2y^2$”, Problems in the theory of representations of algebras and groups. Part 13, Zap. Nauchn. Sem. POMI, 330, POMI, St. Petersburg, 2006, 155–157; J. Math. Sci. (N. Y.), 140:5 (2007), 690–691

Citation in format AMSBIB

\Bibitem{Gen06}

\by A.~I.~Generalov

\paper A combinatorial proof of Euler--Fermat's theorem on presentation of primes of the form $p=8k+3$ by the quadratic form $x^2+2y^2$

\inbook Problems in the theory of representations of algebras and groups. Part~13

\serial Zap. Nauchn. Sem. POMI

\yr 2006

\vol 330

\pages 155--157

\publ POMI

\publaddr St.~Petersburg

\mathnet{http://mi.mathnet.ru/znsl283}

\mathscinet{http://mathscinet.ams.org/mathscinet-getitem?mr=2253571}

\zmath{https://zbmath.org/?q=an:1136.11028}

\transl

\jour J. Math. Sci. (N. Y.)

\yr 2007

\vol 140

\issue 5

\pages 690--691

\crossref{https://doi.org/10.1007/s10958-007-0008-6}

\scopus{https://www.scopus.com/record/display.url?origin=inward&eid=2-s2.0-33846138955}

Linking options:

https://www.mathnet.ru/eng/znsl283

https://www.mathnet.ru/eng/znsl/v330/p155

This publication is cited in the following 2 articles:

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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Abstract page:	537
Full-text PDF :	206
References:	52

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