摘要
丢番图方程1+q+q2+…+qy-1=apx,p,q,x,y∈N,gcd(p.q)=1,x>1,y>2的解的上界,在2≤p≤50,2≤50的情形,给出了当a=1时解的最小上界。
In this paper the upper bounds for the solution to the diophantine equation 1+q+q2+…qy-1=apx are computed,Where p,q,x,y∈N, gcd(p, q) = 1,x>1,y>2.In the case for 2≤p≤50,2≤q≤50 and a=1.The least upper bound for the solution to the equation is computed.
出处
《湛江师范学院学报》
1996年第2期4-9,共6页
Journal of Zhanjiang Normal College
关键词
丢番图方程
方程的解
解的上界
diophantine equation
solution to the equation
oupper bound for the sdution to the equation.