摘要
在高斯整环中,利用代数数论理论和同余理论的方法研究丢番图方程x^(2)+(2n)^(2)=y^(9)(x,y,n∈Z,1≤n≤7)的整数解问题;首先统计了1≤n≤7时已有的证明结果,之后在n=3,5,6,7时对x分奇数和偶数情况讨论,证明了n=3,5,6,7时丢番图方程x^(2)+(2n)^(2)=y^(9)无整数解,即证明了丢番图方程x^(2)+(2n)^(2)=y^(9)(x,y,n∈Z,1≤n≤7)无整数解。
In Gauss domain,the problem of integer solution of the Diophantine equation x^(2)+(2n)^(2)=y^(9)(x,y,n∈Z,1≤n≤7)is discussed by using the methods of algebraic number theory and congruence theory.First of all,finding out the results that have been proven when 1≤n≤7.Then,by discussing the two cases that x is odd and x is even respectively,we proved that the Diophantine equation x^(2)+(2n)^(2)=y^(9)(x,y,n∈Z)has no integer solution when n=3,5,6,7.Finally the conclusion is reached that the Diophantine equation x^(2)+(2n)^(2)=y^(9)(x,y,n∈Z)has no integer solution when 1≤n≤7.
作者
陈一维
柴向阳
CHEN Yi-wei;CHAI Xiang-yang(College of Mathematics and Statistics,North China University of Water Resources and Electric Power,Zhengzhou 450045,China)
出处
《重庆工商大学学报(自然科学版)》
2021年第1期92-98,共7页
Journal of Chongqing Technology and Business University:Natural Science Edition
关键词
高斯整环
代数数论
同余理论
丢番图方程
整数解
Gauss integral ring
algebraic number theory
congruence theory
Diophantine equation
integer solution
