Vieta jumping

Vieta jumping is a classical method in the theory of quadratic Diophantine equations and binary quadratic forms. For example, it was used in the analysis of the Markov equation back in 1879 and in the 1953 paper of Mills. In 1988, the method came to the attention to mathematical olympiad problems in the light of the first olympiad problem to use it in a solution that was proposed for the International Mathematics Olympiad and assumed to be the most difficult problem on the contest: :Let and be positive integers such that divides . Show that \frac{a^2 + b^2}{ab + 1} is the square of an integer. Arthur Engel wrote the following about the problem's difficulty: Among the eleven students receiving the maximum score for solving this problem were Ngô Bảo Châu, Ravi Vakil, Zvezdelina Stankova, and Nicușor Dan. Emanouil Atanassov (from Bulgaria) solved the problem in a paragraph and received a special prize. ==Standard Vieta jumping==

The concept of standard Vieta jumping is a proof by contradiction, and consists of the following four steps: • Assume toward a contradiction that some solution () exists that violates the given requirements. • Take the minimal such solution according to some definition of minimality. • Replace some by a variable x in the formulas, and obtain an equation for which is a solution. • Using Vieta's formulas, show that this implies the existence of a smaller solution, hence a contradiction. ; Example Problem #6 at IMO 1988: Let and be positive integers such that divides . Prove that is a perfect square. • Fix some value that is a non-square positive integer. Assume there exist positive integers for which . • Let be positive integers for which and such that is minimized, and without loss of generality assume . • Fixing , replace with the variable to yield . We know that one root of this equation is . By standard properties of quadratic equations, we know that the other root satisfies and . • The first expression for shows that is an integer, while the second expression implies that since is not a perfect square. From it further follows that , and hence is a positive integer. Finally, implies that , hence , and thus , which contradicts the minimality of . ==Constant descent Vieta jumping==

The method of constant descent Vieta jumping is used when we wish to prove a statement regarding a constant having something to do with the relation between and . Unlike standard Vieta jumping, constant descent is not a proof by contradiction, and it consists of the following four steps: • The equality case is proven so that it may be assumed that . • and are fixed and the expression relating , and is rearranged to form a quadratic with coefficients in terms of and , one of whose roots is . The other root, is determined using Vieta's formulas. • For all above a certain base case, show that and that is an integer. Thus, while maintaining the same , we may replace with and repeat this process until we arrive at the base case. • Prove the statement for the base case, and as has remained constant through this process, this is sufficient to prove the statement for all ordered pairs. ; Example Let and be positive integers such that divides . Prove that . • If dividing implies that divides 1, and hence the positive integers , and . So, without loss of generality, assume that . • For any satisfying the given condition, let and rearrange and substitute to get . One root to this quadratic is , so by Vieta's formulas the other root may be written as follows: . • The first equation shows that is an integer and the second that it is positive. Because and they are both integers, , and hence ; As long as , we always have , and therefore . Thus, while maintaining the same , we may replace with and repeat this process until we arrive at the base case. • The base case we arrive at is the case where . For to satisfy the given condition, must divide , which implies that divides 2, making either 1 or 2. The first case is eliminated because . In the second case, . As has remained constant throughout this process of Vieta jumping, this is sufficient to show that for any satisfying the given condition, will always equal 3. ==Geometric interpretation==

Vieta jumping can be described in terms of lattice points on hyperbolas in the first quadrant. The same process of finding smaller roots is used instead to find lower lattice points on a hyperbola while remaining in the first quadrant. The procedure is as follows: • From the given condition we obtain the equation of a family of hyperbolas that are unchanged by switching and so that they are symmetric about the line . • Prove the desired statement for the intersections of the hyperbolas and the line . • Assume there is some lattice point on some hyperbola and without loss of generality . Then by Vieta's formulas, there is a corresponding lattice point with the same -coordinate on the other branch of the hyperbola, and by reflection through a new point on the original branch of the hyperbola is obtained. • It is shown that this process produces lower points on the same branch and can be repeated until some condition (such as ) is achieved. Then by substitution of this condition into the equation of the hyperbola, the desired conclusion will be proven. ; Example This method can be applied to problem #6 at IMO 1988: Let and be positive integers such that divides . Prove that is a perfect square. • Let and fix the value of . If , is a perfect square as desired. If , then and there is no integral solution . When , the equation defines a hyperbola and represents an integral lattice point on . • If is an integral lattice point on with , then (since is integral) one can see that . This proposition's statement is then true for the point . • Now let be a lattice point on a branch with and (as the previous remark covers the case ). By symmetry, we can assume that and that is on the higher branch of . By applying Vieta's Formulas, is a lattice point on the lower branch of . Let . From the equation for , one sees that . Since , it follows that . Hence the point is in the first quadrant. By reflection, the point is also a point in the first quadrant on . Moreover from Vieta's formulas, , and . Combining this equation with , one can show that . The new constructed point is then in the first quadrant, on the higher branch of , and with smaller ,-coordinates than the point we started with. • The process in the previous step can be repeated whenever the point has a positive -coordinate. However, since the -coordinates of these points will form a decreasing sequence of non-negative integers, the process can only be repeated finitely many times before it produces a point on the upper branch of ; by substitution, is a square as required. ==See also==