A. Pekin, "THE CLASS NUMBER of THE REAL QUADRATIC NUMBER FIELD ℚ(/sqrtp) and SOLVABILITY of THE PELL EQUATION 𝒙^𝟐−p𝒚^𝟐=∓𝒒 For THE PRIME 𝒑 = (𝟐q −𝟏)^𝟐−𝟐," International scientific conference "Contemporary problems of mathematics and mechanics", dedicated to the 80th anniversary of academician V.A. Sadovnichii (May 13–15, 2019, Lomonosov building of Moscow State University, Moscow) , Moscow, Russia, pp.1, 2019
Pekin, A. 2019. THE CLASS NUMBER of THE REAL QUADRATIC NUMBER FIELD ℚ(/sqrtp) and SOLVABILITY of THE PELL EQUATION 𝒙^𝟐−p𝒚^𝟐=∓𝒒 For THE PRIME 𝒑 = (𝟐q −𝟏)^𝟐−𝟐. International scientific conference "Contemporary problems of mathematics and mechanics", dedicated to the 80th anniversary of academician V.A. Sadovnichii (May 13–15, 2019, Lomonosov building of Moscow State University, Moscow) , (Moscow, Russia), 1.
Pekin, A., (2019). THE CLASS NUMBER of THE REAL QUADRATIC NUMBER FIELD ℚ(/sqrtp) and SOLVABILITY of THE PELL EQUATION 𝒙^𝟐−p𝒚^𝟐=∓𝒒 For THE PRIME 𝒑 = (𝟐q −𝟏)^𝟐−𝟐 . International scientific conference "Contemporary problems of mathematics and mechanics", dedicated to the 80th anniversary of academician V.A. Sadovnichii (May 13–15, 2019, Lomonosov building of Moscow State University, Moscow) (pp.1). Moscow, Russia
Pekin, Ayten. "THE CLASS NUMBER of THE REAL QUADRATIC NUMBER FIELD ℚ(/sqrtp) and SOLVABILITY of THE PELL EQUATION 𝒙^𝟐−p𝒚^𝟐=∓𝒒 For THE PRIME 𝒑 = (𝟐q −𝟏)^𝟐−𝟐," International scientific conference "Contemporary problems of mathematics and mechanics", dedicated to the 80th anniversary of academician V.A. Sadovnichii (May 13–15, 2019, Lomonosov building of Moscow State University, Moscow), Moscow, Russia, 2019
Pekin, Ayten. "THE CLASS NUMBER of THE REAL QUADRATIC NUMBER FIELD ℚ(/sqrtp) and SOLVABILITY of THE PELL EQUATION 𝒙^𝟐−p𝒚^𝟐=∓𝒒 For THE PRIME 𝒑 = (𝟐q −𝟏)^𝟐−𝟐." International scientific conference "Contemporary problems of mathematics and mechanics", dedicated to the 80th anniversary of academician V.A. Sadovnichii (May 13–15, 2019, Lomonosov building of Moscow State University, Moscow) , Moscow, Russia, pp.1, 2019
Pekin, A. (2019) . "THE CLASS NUMBER of THE REAL QUADRATIC NUMBER FIELD ℚ(/sqrtp) and SOLVABILITY of THE PELL EQUATION 𝒙^𝟐−p𝒚^𝟐=∓𝒒 For THE PRIME 𝒑 = (𝟐q −𝟏)^𝟐−𝟐." International scientific conference "Contemporary problems of mathematics and mechanics", dedicated to the 80th anniversary of academician V.A. Sadovnichii (May 13–15, 2019, Lomonosov building of Moscow State University, Moscow) , Moscow, Russia, p.1.
@conferencepaper{conferencepaper, author={Ayten PEKİN}, title={THE CLASS NUMBER of THE REAL QUADRATIC NUMBER FIELD ℚ(/sqrtp) and SOLVABILITY of THE PELL EQUATION 𝒙^𝟐−p𝒚^𝟐=∓𝒒 For THE PRIME 𝒑 = (𝟐q −𝟏)^𝟐−𝟐}, congress name={International scientific conference "Contemporary problems of mathematics and mechanics", dedicated to the 80th anniversary of academician V.A. Sadovnichii (May 13–15, 2019, Lomonosov building of Moscow State University, Moscow)}, city={Moscow}, country={Russia}, year={2019}, pages={1} }