The inverse function theorem and the Jacobian conjecture for free analysis

“…Since this is the largest admissible topology, for any admissible topology , any -holomorphic function is automatically fine holomorphic. The class of nc functions considered in [14,24] is the fine holomorphic functions.…”

Section: -Holomorphic Functionsmentioning

confidence: 99%

Aspects of non-commutative function theory

Agler

McCarthy

2016

Concrete Operators

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“…Of course if

p [n]

is injective, then considered as a polynomial in

g n^{2}

commuting variables, it is bijective and has a polynomial inverse. The following free polynomial analog of Grothendieck's theorem was implicitly conjectured in . Theorem If

p : M {(C)}^{g} \to M {(C)}^{g}

is an injective free polynomial mapping, then there is a free polynomial mapping

q

such that

p \circ q (x) = x = q \circ p (x)

; that is,

p

has a free polynomial inverse.…”

Section: Introductionmentioning

confidence: 99%

“…Subsection 4.1 explores conditions that guarantee a free polynomial has a free polynomial inverse. While in Subsection 4.2 we recall the free derivative as defined in and investigate its properties. For a fixed free polynomial

p

, we define the function

F : (x, y) \mapsto (D p (y) [x], y)

and observe that Pascoe's solution to the free Jacobian conjecture can be interpreted as saying,

p

is bijective if and only if

F

is bijective.…”

Section: Introductionmentioning

confidence: 99%

The free Grothendieck theorem

Augat

2018

Proc. London Math. Soc.

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The main result of this paper establishes the free analog of Grothendieck's theorem on bijective polynomial mappings of Cg. Namely, we show if p is a polynomial mapping in g freely non‐commuting variables sending g‐tuples of matrices (of the same size) to g‐tuples of matrices (of the same size) that is injective, then it has a free polynomial inverse. Other results include an algorithm that tests if a free polynomial mapping p has a polynomial inverse (equivalently is injective; equivalently is bijective). Further, a class of free algebraic functions, called hyporational, lying strictly between the free rational functions and the free algebraic functions are identified. They play a significant role in the proof of the main result.

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