MathDB

3

Part of 2017 Miklós Schweitzer

Problems(1)

Positive degree of algebraic integer at most 2n

Source: Miklós Schweitzer 2017, problem 3

1/13/2018
For every algebraic integer α\alpha define its positive degree deg+(α)\text{deg}^+(\alpha) to be the minimal kNk\in\mathbb{N} for which there exists a k×kk\times k matrix with non-negative integer entries with eigenvalue α\alpha. Prove that for any nNn\in\mathbb{N}, every algebraic integer α\alpha with degree nn satisfies deg+(α)2n\text{deg}^+(\alpha)\le 2n.
Algebraic integereigenvaluenumber theory