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1 results

  • The Diophantine Equations x2± y4=±z6 and x2+y8= z3

  • NILS BRUIN
  • Journal:
    Compositio Mathematica / Volume 118 / Issue 3 / September 1999
    Published online by Cambridge University Press:
    04 December 2007, pp. 305-321
    Print publication:
    September 1999
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  • In this article we determine all solutions to the equation xp+yq=zr, (p,q,r)∈{(2,4,6), (2,6,4), (4,6,2), (2,8,3)} in coprime integers x,y,z. First we determine a set of curves of genus 2, such that every solution corresponds to a rational point on one of these curves. Then we determine the rational points on these curves using either covers of rank 0 elliptic curves or a method known as effective Chabauty which works if the Mordell–Weil rank of the jacobian is smaller than the dimension.