Let k, t, d be arbitrary integers with k ≥ 2, t ≥ 0 and
d = k2 - k. In the first section we give some preliminaries from
Pell equations x2 - dy2 = 1 and x2 - dy2 = N, where N be any
fixed positive integer. In the second section, we consider the integer
solutions of Pell equations x2 - dy2 = 1 and x2 - dy2 = 2t. We
give a method for the solutions of these equations. Further we derive
recurrence relations on the solutions of these equations
[1] Arya S.P. On the Brahmagupta-Bhaskara Equation. Math. Ed. 8(1)
(1991), 23-27.
[2] Baltus C. Continued Fractions and the Pell Equations:The work of Euler
and Lagrange. Comm. Anal. Theory Contin. Fractions 3(1994), 4-31.
[3] Barbeau E. Pell-s Equation. Springer Verlag, 2003.
[4] Edwards, H.M. Fermat-s Last Theorem. A Genetic Introduction to Algebraic
Number Theory. Corrected reprint of the 1977 original. Graduate
Texts in Mathematics, 50. Springer-Verlag, New York, 1996.
[5] Kaplan P. and Williams K.S. Pell-s Equations x2 −my2 = −1,−4 and
Continued Fractions. Journal of Number Theory. 23(1986), 169-182.
[6] Koblitz N. A Course in Number Theory and Cryptography. Graduate Texts
in Mathematics, Second Edition, Springer, 1994.
[7] Lenstra H.W. Solving The Pell Equation. Notices of the AMS. 49(2)
(2002), 182-192.
[8] Matthews, K. The Diophantine Equation x2 − Dy2 = N, D > 0.
Expositiones Math.18 (2000), 323-331.
[9] Mollin R.A., Poorten A.J. and Williams H.C. Halfway to a Solution of
x2 − Dy2 = −3. Journal de Theorie des Nombres Bordeaux, 6(1994),
421-457.
[10] Niven I., Zuckerman H.S. and Montgomery H.L. An Introduction to the
Theory of Numbers. Fifth Edition, John Wiley&Sons, Inc., New York,
1991.
[11] Stevenhagen P. A Density Conjecture for the Negative Pell Equation.
Computational Algebra and Number Theory, Math. Appl. 325 (1992),
187-200.
[12] Tekcan A. Pell Equation x2 − Dy2 = 2, II. Bulletin of the Irish
Mathematical Society 54 (2004), 73-89.
[13] Tekcan A., Bizim O. and Bayraktar M. Solving the Pell Equation Using
the Fundamental Element of the Field Q(ÔêÜΔ). South East Asian Bull.
of Maths. 30(2006), 355-366.
[14] Tekcan A. The Pell Equation x2 − Dy2 = ┬▒4. Applied Mathematical
Sciences, 1(8)(2007), 363-369.
[1] Arya S.P. On the Brahmagupta-Bhaskara Equation. Math. Ed. 8(1)
(1991), 23-27.
[2] Baltus C. Continued Fractions and the Pell Equations:The work of Euler
and Lagrange. Comm. Anal. Theory Contin. Fractions 3(1994), 4-31.
[3] Barbeau E. Pell-s Equation. Springer Verlag, 2003.
[4] Edwards, H.M. Fermat-s Last Theorem. A Genetic Introduction to Algebraic
Number Theory. Corrected reprint of the 1977 original. Graduate
Texts in Mathematics, 50. Springer-Verlag, New York, 1996.
[5] Kaplan P. and Williams K.S. Pell-s Equations x2 −my2 = −1,−4 and
Continued Fractions. Journal of Number Theory. 23(1986), 169-182.
[6] Koblitz N. A Course in Number Theory and Cryptography. Graduate Texts
in Mathematics, Second Edition, Springer, 1994.
[7] Lenstra H.W. Solving The Pell Equation. Notices of the AMS. 49(2)
(2002), 182-192.
[8] Matthews, K. The Diophantine Equation x2 − Dy2 = N, D > 0.
Expositiones Math.18 (2000), 323-331.
[9] Mollin R.A., Poorten A.J. and Williams H.C. Halfway to a Solution of
x2 − Dy2 = −3. Journal de Theorie des Nombres Bordeaux, 6(1994),
421-457.
[10] Niven I., Zuckerman H.S. and Montgomery H.L. An Introduction to the
Theory of Numbers. Fifth Edition, John Wiley&Sons, Inc., New York,
1991.
[11] Stevenhagen P. A Density Conjecture for the Negative Pell Equation.
Computational Algebra and Number Theory, Math. Appl. 325 (1992),
187-200.
[12] Tekcan A. Pell Equation x2 − Dy2 = 2, II. Bulletin of the Irish
Mathematical Society 54 (2004), 73-89.
[13] Tekcan A., Bizim O. and Bayraktar M. Solving the Pell Equation Using
the Fundamental Element of the Field Q(ÔêÜΔ). South East Asian Bull.
of Maths. 30(2006), 355-366.
[14] Tekcan A. The Pell Equation x2 − Dy2 = ┬▒4. Applied Mathematical
Sciences, 1(8)(2007), 363-369.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:56157", author = "Ahmet Tekcan", title = "The Pell Equation x2 − (k2 − k)y2 = 2t", abstract = "Let k, t, d be arbitrary integers with k ≥ 2, t ≥ 0 and
d = k2 - k. In the first section we give some preliminaries from
Pell equations x2 - dy2 = 1 and x2 - dy2 = N, where N be any
fixed positive integer. In the second section, we consider the integer
solutions of Pell equations x2 - dy2 = 1 and x2 - dy2 = 2t. We
give a method for the solutions of these equations. Further we derive
recurrence relations on the solutions of these equations", keywords = "Pell equation, solutions of Pell equation.", volume = "2", number = "7", pages = "454-5", }
