On Certain Computations of Pisot Numbers
Abstract
This paper presents two algorithms on certain computations about Pisot numbers. Firstly, we develop an algorithm that finds a Pisot number α such that [α] = given a real Galois extension of by its integral basis. This algorithm is based on the lattice reduction, and it runs in time polynomial in the size of the integral basis. Next, we show that for a fixed Pisot number α, one can compute [αn] m in time polynomial in ( (m n))O(1), where m and n are positive integers.
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