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dc.contributor Graduate Program in Mathematics.
dc.contributor.advisor Özman, Ekin.
dc.contributor.author Kır, Harun.
dc.date.accessioned 2023-03-16T11:21:47Z
dc.date.available 2023-03-16T11:21:47Z
dc.date.issued 2019.
dc.identifier.other MATH 2019 K57
dc.identifier.uri http://digitalarchive.boun.edu.tr/handle/123456789/15313
dc.description.abstract In 1801, Gauss conjectured that there are exactly nine imaginary quadratic number fields with class number one, namely: Q(√−1), Q(√−2), Q(√−3), Q(√−7), Q(√−11), Q(√−19), Q(√−43), Q(√−67) and Q(√−163). This conjecture is wellknown as class number one problem. In 1952, K. Heegner first solved the problem and he showed that Gauss was right about the assumption in Diophantische analysis und modulfunktionen. In this thesis, we will present a modern approach to the proof of Heegner as in D.A.Cox’s book, Primes of the Form x2 + ny2.
dc.format.extent 30 cm.
dc.publisher Thesis (M.S.) - Bogazici University. Institute for Graduate Studies in Science and Engineering, 2019.
dc.subject.lcsh Number theory.
dc.title Class number one problem
dc.format.pages xii, 100 leaves ;


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