2

Part of 2017 Miklós Schweitzer

Problems(1)

Field orderable iff sym matrixes diagonalizable over closure

Source: Miklós Schweitzer 2017, problem 2

Prove that a field

K

can be ordered if and only if every

A\in M_n(K)

symmetric matrix can be diagonalized over the algebraic closure of

K

. (In other words, for all

n\in\mathbb{N}

A\in M_n(K)

, there exists an

S\in GL_n(\overline{K})

S^{-1}AS

linear algebramatrixabstract algebrafield