Add to ORKGFinding polynomial solutions to Pell’s equation is of interest as such solutions sometimes allow the fundamental units to be determined in an infinite class of real quadratic fields. In this paper, for each triple of positive integers (c, h, f) satisfying c 2 − f h2 = 1, where (c, h) are the smallest pair of integers satisfying this equation, several sets of polynomials (c(t), h(t), f(t)) which satisfy c(t) 2 − f(t) h(t) 2 = 1 and (c(0), h(0), f(0)) = (c, h, f) are derived. Moreover, it is shown that the pair (c(t), h(t)) constitute the fundamental polynomial solution to the Pell’s equation above. The continued fraction expansion of p f(t) is given in certain general cases (for example, when the continued fraction expansion of √ f has odd p...
In this paper we show how to construct several infinite families of polynomials D(¯x, k), such that ...
In this paper we show how to construct several infinite families of polynomials D(¯x, k), such that ...
Let R denote either the integers or the rationals and let d(x) be a square-free polynomial in R[x]. ...
Solving Pell’s equation is of relevance in finding fundamental units in real quadratic fields and fo...
Solving Pell’s equation is of relevance in finding fundamental units in real quadratic fields and fo...
Solving Pell’s equation is of relevance in finding fundamen-tal units in real quadratic fields and f...
Solving Pell’s equation is of relevance in finding fundamen-tal units in real quadratic fields and f...
summary:We shall describe how to construct a fundamental solution for the Pell equation $x^2-my^2=1$...
In the classical case we make use of Pells equation to compute units in the ring OF. Consider the p...
Minor corrections and new numerical resultsWe use the polynomials m_s(t) = t^2 − 4s, s ∈ {−1, 1}, in...
We investigate infinite families of integral quadratic polynomials {fk (X)} k∈N and show that, for ...
AbstractIn 1986, Mills and Robbins observed by computer the continued fraction expansion of certain ...
Includes bibliographical references.The Diophantine equation, x² - Dy² = N, where D and N are known ...
Dirichlet's theorem describes the structure of the group of units of the ring of algebraic integers ...
In this paper we show how to construct several infinite families of polynomials D(¯x, k), such that ...
In this paper we show how to construct several infinite families of polynomials D(¯x, k), such that ...
In this paper we show how to construct several infinite families of polynomials D(¯x, k), such that ...
Let R denote either the integers or the rationals and let d(x) be a square-free polynomial in R[x]. ...
Solving Pell’s equation is of relevance in finding fundamental units in real quadratic fields and fo...
Solving Pell’s equation is of relevance in finding fundamental units in real quadratic fields and fo...
Solving Pell’s equation is of relevance in finding fundamen-tal units in real quadratic fields and f...
Solving Pell’s equation is of relevance in finding fundamen-tal units in real quadratic fields and f...
summary:We shall describe how to construct a fundamental solution for the Pell equation $x^2-my^2=1$...
In the classical case we make use of Pells equation to compute units in the ring OF. Consider the p...
Minor corrections and new numerical resultsWe use the polynomials m_s(t) = t^2 − 4s, s ∈ {−1, 1}, in...
We investigate infinite families of integral quadratic polynomials {fk (X)} k∈N and show that, for ...
AbstractIn 1986, Mills and Robbins observed by computer the continued fraction expansion of certain ...
Includes bibliographical references.The Diophantine equation, x² - Dy² = N, where D and N are known ...
Dirichlet's theorem describes the structure of the group of units of the ring of algebraic integers ...
In this paper we show how to construct several infinite families of polynomials D(¯x, k), such that ...
In this paper we show how to construct several infinite families of polynomials D(¯x, k), such that ...
In this paper we show how to construct several infinite families of polynomials D(¯x, k), such that ...
Let R denote either the integers or the rationals and let d(x) be a square-free polynomial in R[x]. ...