Difference between revisions of "Pell's equation (simple solutions)"

Revision as of 05:46, 17 April 2023

Pell's equation is any Diophantine equation of the form $x^2 – Dy^2 = 1,$ where $D$ is a given positive nonsquare integer, and integer solutions are sought for $x$ and $y.$

Denote the sequence of solutions $\{x_i, y_i \}.$ It is clear that $\{x_0, y_0 \} = \{1,0 \}.$

During the solution we need:

a) to construct a recurrent sequence $\{x_{i+1}, y_{i+1} \} = f({x_i, y_i})$ or two sequences $\{x_{i+1} \} = f({x_i}), \{y_{ i+1} \} = g({y_i});$

b) to prove that the equation has no other integer solutions.

Equation of the form $x^2 – 2y^2 = 1$

Prove that all positive integer solutions of the equation $x^2 – 2y^2 = 1$ can be found using recursively transformation $x_{i+1} = 3 x_i + 4 y_i , y_{i+1} = 2 x_i + 3 y_i$ of the pare $\{x_0, y_0\} = \{1,0\}.$

Proof

$\boldsymbol{a.}$ Let integers $(x_i, y_i)$ are the solution of the equation $\hspace{10mm} x_i^2 - 2 y_i^2 = 1,$ $\begin{equation} \left\{ \begin{aligned} x_{i+1} &= 3 x_i + 4 y_i ,\\ y_{i+1} &= 2 x_i + 3 y_i . \end{aligned} \right.\end{equation}$ Then $x_{i+1}^2 - 2 y_{i+1}^2 = (3 x_i + 4 y_i)^2 - 2 (2 x_i + 3 y_i)^2 = x_i^2 - 2 y_i^2 = 1.$

Therefore integers $(x_{i+1}, y_{i+1})$ are the solution of the given equation. If $i > 0$ then $x_{i+1} > y_{i+1} \ge 2(x_i + y_i) > x_i > y_i > 0.$ $\{(x_i, y_i) \} = \{(1,0), (3,2), (17,12), (99,70),...\}.$

$\boldsymbol{b.}$ Suppose that the pare of the positive integers $(x_I, y_I)$ is the solution different from founded in $\boldsymbol{a.}\hspace{10mm} x_I^2 - 2 y_I^2 = 1.$ Let $\begin{equation} \left\{ \begin{aligned} x_{i+1} &= 3 x_i - 4 y_i ,\\ y_{i+1} &= - 2 x_i + 3 y_i . \end{aligned} \right.\end{equation}$ then $x_{i+1}^2 - 2 y_{i+1}^2 = (3 x_i - 4 y_i)^2 - 2 (-2 x_i + 3 y_i)^2 = x_i^2 - 2 y_i^2 = 1,$ therefore integers $(x_{i+1}, y_{i+1})$ are the solution of the given equation.

$x_i^2 = 2 y_i^2 +1 > 2 y_i^2 \implies x_i > y_i >0.$ Similarly $x_{i +1}> y_{i+1}.$

There is no integer solution if $y_j = 1. y_j = 0$ is impossible. So $y_i > 1.$ $9 y_i^2 \ge 8 y_i^2 + 4 = 4 x_i^2 \implies 3y_i \ge 2x_i \implies y_{i+1} \ge 0.$

$0 \le y_{i+1} = y_i - 2 (x_i – y_i) < y_i.$

There is no member $y_j = 0$ in the sequence $\{y_i \},$ hence it is infinitely decreasing sequence of natural numbers. There is no such sequence. Contradiction.

vladimir.shelomovskii@gmail.com, vvsss

Equation of the form $x(x + 1) = 2y^2$

Prove that all positive integer solutions of the equation $x(x + 1) = 2y^2$ can be found using recursively transformation $x_{i+1} = 3 x_i + 4 y_i + 1, y_{i+1} = 2 x_i + 3 y_i + 1$ of the pare $\{x_0, y_0\} = \{0,0\}.$ In another form $\sqrt{x_{i+1}} = \sqrt{2x_i} + \sqrt{x_i + 1}.$

Proof $x(x + 1) = 2y^2 \implies 4x^2 + 4x + 1 = 8y^2 + 1 \implies (2x+1)^2 – 2(2y)^2 = 1.$ $\begin{equation} \left\{ \begin{aligned} 2 x_{i+1} + 1 &= 3 (2x_i + 1) - 4 (2 y_i) ,\\ 2 y_{i+1} &= - 2 (2 x_i + 1) + 3 (2 y_i) . \end{aligned} \right. \left\{ \begin{aligned} x_{i+1} &= 3 x_i - 4 y_i + 1 ,\\ y_{i+1} &= - 2 x_i + 3 y_i + 1 . \end{aligned} \right. \end{equation}$

vladimir.shelomovskii@gmail.com, vvsss

@@ Line 41: / Line 41: @@
 There is no member <math>y_j  = 0</math> in the sequence <math>\{y_i \},</math> hence it is infinitely decreasing sequence of natural numbers. There is no such sequence. Contradiction.
+'''vladimir.shelomovskii@gmail.com, vvsss'''
+==Equation of the form <math>x(x + 1) = 2y^2</math>==
+Prove that all positive integer solutions of the equation <math>x(x + 1) = 2y^2</math> can be found using recursively transformation <math>x_{i+1} = 3 x_i + 4 y_i + 1, y_{i+1} = 2 x_i + 3 y_i + 1</math> of the pare <math>\{x_0, y_0\} = \{0,0\}.</math> In another form <math>\sqrt{x_{i+1}} = \sqrt{2x_i} + \sqrt{x_i + 1}.</math>
+<i><b>Proof</b></i>
+<math>x(x + 1) = 2y^2 \implies 4x^2 + 4x + 1 = 8y^2 + 1 \implies (2x+1)^2 – 2(2y)^2 = 1.</math>
+<cmath>\begin{equation} \left\{ \begin{aligned}
+x_{i+1} + 1 &= 3 (2x_i + 1) - 4 (2 y_i) ,\\
+y_{i+1} &= - 2 (2 x_i + 1) + 3 (2 y_i) .
+\end{aligned} \right.
+\left\{ \begin{aligned}
+x_{i+1} &= 3 x_i  - 4 y_i + 1 ,\\
+y_{i+1} &= - 2 x_i + 3 y_i + 1 .
+\end{aligned} \right.
+\end{equation}</cmath>
+'''vladimir.shelomovskii@gmail.com, vvsss'''

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Difference between revisions of "Pell's equation (simple solutions)"

Revision as of 05:46, 17 April 2023

Equation of the form $x^2 – 2y^2 = 1$

Equation of the form $x(x + 1) = 2y^2$