Global structure behind pointwise equivalences of noncommutative polynomials

TL;DR

This paper explores the relationship between local pointwise equivalences and global algebraic relations of noncommutative polynomials, revealing fundamental correspondences and their implications for spectral properties.

Contribution

It identifies key pairs of local and global equivalences in noncommutative polynomials, establishing their precise correspondences and deriving related spectral results.

Findings

Rank-equivalence equals stable association.

Isospectrality coincides with intertwinedness.

Pointwise similarity corresponds to equality.

Abstract

This paper investigates the interplay between local and global equivalences on noncommutative polynomials, the elements of the free algebra. When the latter are viewed as functions in several matrix variables, a local equivalence of noncommutative polynomials refers to their values sharing a common feature point-wise on matrix tuples of all dimensions, such as rank-equivalence (values have the same ranks), isospectrality (values have the same spectrum), and pointwise similarity (values are similar). On the other hand, a global equivalence refers to a ring-theoretic relation within the free algebra, such as stable association or (elementary) intertwinedness. This paper identifies the most ubiquitous pairs of local and global equivalences. Namely, rank-equivalence coincides with stable association, isospectrality coincides with both intertwinedness and transitive closure of elementary intertwinedness, and pointwise similarity coincides with equality. Using these characterizations, further results on spectral radii and norms of values of noncommutative polynomials are derived.