Multi-variable Polynomial Solutions to Pell's Equation and Fundamental Units in Real Quadratic Fields

Abstract

For each positive integer n it is shown how to construct a finite collection of multivariable polynomials \Fi:=Fi(t,X1,..., X n+12 )\ such that each positive integer whose squareroot has a continued fraction expansion with period n+1 lies in the range of exactly one of these polynomials. Moreover, each of these polynomials satisfy a polynomial Pell's equation Ci2 -FiHi2 = (-1)n-1 (where Ci and Hi are polynomials in the variables t,X1,..., X n+12 ) and the fundamental solution can be written down. Likewise, if all the Xi's and t are non-negative then the continued fraction expansion of Fi can be written down. Furthermore, the congruence class modulo 4 of Fi depends in a simple way on the variables t,X1,..., X n+12 so that the fundamental unit can be written down for a large class of real quadratic fields. Along the way a complete solution is given to the problem of determining for which symmetric strings of positive integers a1,..., an do there exist positive integers D and a0 such that D = [ a0;a1, >..., an,2a0].

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…