计算非齐次相对Thue不等式的“小”解

Pub Date : 2021-01-01 DOI:10.7169/facm/1876
Istv'an Ga'al
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引用次数: 2

摘要

Thue方程及其相对和非齐次扩展在文献中是众所周知的。有一些方法,通常是乏味的方法,可以完全解决这些方程。另一方面,我们的经验表明,这种方程通常不会有非常大的解。因此,在一些应用中,有一个快速算法来计算这些方程的“小”解是有用的。在“小”解决方案下,我们指的是绝对值或大小为$\leq 10^{100}$的解决方案。这种算法以前是为相对的Thue方程构造的。相对和非齐次Thue方程在求解指数型方程和某些结果型方程中有应用。众所周知,某些“完全真实”的相对Thue方程可以简化为绝对Thue方程($\Bbb Z$以上的方程)。作为上述结果的一个常见推广,在我们的论文中,我们开发了一种快速算法来计算非齐次相对Thue方程的“小”解(比如大小为$\leq10^{100}$),更确切地说,是推广这些方程的某些不等式。我们将证明,在“完全真实”的情况下,这些可以类似地简化为绝对不均匀的Thue不等式。我们还给出了在相对情况下求解某些结果方程的一个应用。
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Calculating “small” solutions of inhomogeneous relative Thue inequalities
Thue equations and their relative and inhomogeneous extensions are well known in the literature. There exist methods, usually tedious methods, for the complete resolution of these equations. On the other hand our experiences show that such equations usually do not have extremely large solutions. Therefore in several applications it is useful to have a fast algorithm to calculate the"small"solutions of these equations. Under"small"solutions we mean the solutions, say, with absolute values or sizes $\leq 10^{100}$. Such algorithms were formerly constructed for Thue equations, relative Thue equations. The relative and inhomogeneous Thue equations have applications in solving index form equations and certain resultant form equations. It is also known that certain"totally real"relative Thue equations can be reduced to absolute Thue equations (equations over $\Bbb Z$). As a common generalization of the above results, in our paper we develop a fast algorithm for calculating"small"solutions (say with sizes $\leq 10^{100}$) of inhomogeneous relative Thue equations, more exactly of certain inequalities that generalize those equations. We shall show that in the"totally real"case these can similarly be reduced to absolute inhomogeneous Thue inequalities. We also give an application to solving certain resultant equations in the relative case.
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