Theoretical Foundations of Functional Data Analysis, with an Introduction to Linear Operators

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3.5 Operator inverses

A linear mapping $c03-math-594$ from a vector space $c03-math-595$ into a vector space $c03-math-596$ is one-to-one if $c03-math-597$ and onto if $c03-math-598$ . When $c03-math-599$ is both one-to-one and onto it is said to be bijective. Bijective linear mappings are invertible. That is, there exists a linear mapping $c03-math-600$ from $c03-math-601$ to $c03-math-602$ such that $c03-math-603$ and $c03-math-604$ are the identity transformation on their respective spaces.

Suppose now that and are Banach spaces and that is bijective. ...

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