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See Nagell, Introduction to number theory, Theorem 107. Originally it was proved by Legendre, see Dickson, L. E. History of the theory of numbers. Vol. II, p. 365. There are more examples due to Dirichlet, see Dirichlet's Werke, Bd. 1 (1889), pp. 219-236.

An extended bibliography on negative Pell’s equation can be found in Gerasim, I.-Kh.I. On the genesis of Redei’s theory of the equation x 2 -Dy 2 =-1.On the genesis of Redei’s theory of the equation $x^2 -Dy^2 =-1$. (Russian) Zbl 0731.01014 Istor.-Mat. Issled. 32/33, 199-211 (1990) (available in electronic form).

See Nagell, Introduction to number theory, Theorem 107. Originally it was proved by Legendre, see Dickson, L. E. History of the theory of numbers. Vol. II, p. 365. There are more examples due to Dirichlet, see Dirichlet's Werke, Bd. 1 (1889), pp. 219-236.

An extended bibliography on negative Pell’s equation can be found in Gerasim, I.-Kh.I. On the genesis of Redei’s theory of the equation x 2 -Dy 2 =-1. (Russian) Zbl 0731.01014 Istor.-Mat. Issled. 32/33, 199-211 (1990) (available in electronic form).

See Nagell, Introduction to number theory, Theorem 107. Originally it was proved by Legendre, see Dickson, L. E. History of the theory of numbers. Vol. II, p. 365. There are more examples due to Dirichlet, see Dirichlet's Werke, Bd. 1 (1889), pp. 219-236.

An extended bibliography on negative Pell’s equation can be found in Gerasim, I.-Kh.I. On the genesis of Redei’s theory of the equation $x^2 -Dy^2 =-1$. (Russian) Zbl 0731.01014 Istor.-Mat. Issled. 32/33, 199-211 (1990).

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Source Link
Alexey Ustinov
  • 12.3k
  • 7
  • 87
  • 119

See Nagell, Introduction to number theory, Theorem 107. Originally it was proved by Legendre, see Dickson, L. E. History of the theory of numbers. Vol. II, p. 365. There are more examples due to Dirichlet, see Dirichlet's Werke, Bd. 1 (1889), pp. 219-236.

An extended bibliography on negative Pell’s equation can be found in Gerasim, I.-Kh.I. On the genesis of Redei’s theory of the equation x 2 -Dy 2 =-1. (Russian) Zbl 0731.01014 Istor.-Mat. Issled. 32/33, 199-211 (1990) (available in electronic form).

See Nagell, Introduction to number theory, Theorem 107. Originally it was proved by Dirichlet.

An extended bibliography on negative Pell’s equation can be found in Gerasim, I.-Kh.I. On the genesis of Redei’s theory of the equation x 2 -Dy 2 =-1. (Russian) Zbl 0731.01014 Istor.-Mat. Issled. 32/33, 199-211 (1990) (available in electronic form).

See Nagell, Introduction to number theory, Theorem 107. Originally it was proved by Legendre, see Dickson, L. E. History of the theory of numbers. Vol. II, p. 365. There are more examples due to Dirichlet, see Dirichlet's Werke, Bd. 1 (1889), pp. 219-236.

An extended bibliography on negative Pell’s equation can be found in Gerasim, I.-Kh.I. On the genesis of Redei’s theory of the equation x 2 -Dy 2 =-1. (Russian) Zbl 0731.01014 Istor.-Mat. Issled. 32/33, 199-211 (1990) (available in electronic form).

Source Link
Alexey Ustinov
  • 12.3k
  • 7
  • 87
  • 119

See Nagell, Introduction to number theory, Theorem 107. Originally it was proved by Dirichlet.

An extended bibliography on negative Pell’s equation can be found in Gerasim, I.-Kh.I. On the genesis of Redei’s theory of the equation x 2 -Dy 2 =-1. (Russian) Zbl 0731.01014 Istor.-Mat. Issled. 32/33, 199-211 (1990) (available in electronic form).