Commit 38b6c303 by Ralf Jung

### more CHANGELOG

parent 2708e2c5
 ... @@ -9,10 +9,10 @@ Changes in and extensions of the theory: ... @@ -9,10 +9,10 @@ Changes in and extensions of the theory: * [#] Add new modality: ■ ("plainly"). * [#] Add new modality: ■ ("plainly"). * [#] Camera morphisms have to be homomorphisms, not just monotone functions. * [#] Camera morphisms have to be homomorphisms, not just monotone functions. * [#] Add a proof that f has a fixed point if f^k is contractive. * Add a proof that f has a fixed point if f^k is contractive. * Constructions for least and greatest fixed points over monotone predicates * Constructions for least and greatest fixed points over monotone predicates (defined in the logic of Iris using impredicative quantification). (defined in the logic of Iris using impredicative quantification). * A proof of the inverse of wp_bind. * Add a proof of the inverse of wp_bind. Changes in Coq: Changes in Coq: ... ...
 ... @@ -75,6 +75,7 @@ The function space $\ofe \nfn \cofeB$ is a COFE if $\cofeB$ is a COFE (\ie the d ... @@ -75,6 +75,7 @@ The function space $\ofe \nfn \cofeB$ is a COFE if $\cofeB$ is a COFE (\ie the d Completeness is necessary to take fixed-points. Completeness is necessary to take fixed-points. For once, every \emph{contractive function} $f : \ofe \to \cofeB$ where $\cofeB$ is a COFE and inhabited has a \emph{unique} fixed-point $\fix(f)$ such that $\fix(f) = f(\fix(f))$. For once, every \emph{contractive function} $f : \ofe \to \cofeB$ where $\cofeB$ is a COFE and inhabited has a \emph{unique} fixed-point $\fix(f)$ such that $\fix(f) = f(\fix(f))$. This also holds if $f^k$ is contractive for an arbitrary $k$. Furthermore, by America and Rutten's theorem~\cite{America-Rutten:JCSS89,birkedal:metric-space}, every contractive (bi)functor from $\COFEs$ to $\COFEs$ has a unique\footnote{Uniqueness is not proven in Coq.} fixed-point. Furthermore, by America and Rutten's theorem~\cite{America-Rutten:JCSS89,birkedal:metric-space}, every contractive (bi)functor from $\COFEs$ to $\COFEs$ has a unique\footnote{Uniqueness is not proven in Coq.} fixed-point. ... ...
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