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Created a stub for Urysohn metrization theorem.
I added a proposition to this subsection which seems valid intuitionistically, but I wouldn’t mind a reality check from someone.
Indicated where to find (in the nLab) a proof of the equivalence with the axiom of choice and with Zorn’s lemma (<– it’s there).
also created axiom UIP, just for completeness. But the entry still needs some reference or else some further details.
Added a bit to Hartogs number. Including the curiosity that GCH implies AC. :-)
We don’t have anything on this, I think, but there is mention of “intrinsic” and “à la Church” at coercion. From Type refinement and monoidal closed bifibrations:
One of the difficulties in giving a clear mathematical definition of the “topic” of type theory is that the word “type” is actually used with two very different intuitive meanings and technical purposes in mind:
- Like the syntactician’s parts of speech, as a way of defining the grammar of well-formed expressions.
- Like the semanticist’s predicates, as a way of identifying subsets of expressions with certain desirable properties.
These two different views of types are often associated respectively with Alonzo Church and Haskell Curry (hence “types à la Church” and “types à la Curry”), while the late John Reynolds referred to these as the intrinsic and the extrinsic interpretations of types [11]. In the intrinsic view, all expressions carry a type, and there is no need (or even sense) to consider the meaning of “untyped” expressions; while in the extrinsic view, every expression carries an independent meaning, and typing judgments serve to assert some property of that meaning.
[11] is John C. Reynolds. The Meaning of Types: from Intrinsic to Extrinsic Semantics. BRICS Report RS-00-32, Aarhus University, December 2000. pdf
There are two very different ways of giving denotational semantics to a programming language (or other formal language) with a nontrivial type system. In an intrinsic semantics, only phrases that satisfy typing judgements have meanings. Indeed, meanings are assigned to the typing judgements, rather than to the phrases themselves, so that a phrase that satisfies several judgements will have several meanings.
In contrast, in an extrinsic semantics, the meaning of each phrase is the same as it would be in a untyped language, regardless of its typing properties. In this view, a typing judgement is an assertion that the meaning of a phrase possesses some property.
The terms “intrinsic” and “extrinsic” are recent coinages by the author [1, Chapter 15], but the concepts are much older. The intrinsic view is associated with Alonzo Church, and has been called “ontological” by Leivant [2]. The extrinsic view is associated with Haskell Curry, and has been called “semantical” by Leivant.
[1] John C. Reynolds. Theories of Programming Languages. Cambridge University Press, Cambridge, England, 1998. [2] Daniel Leivant. Typing and computational properties of lambda expressions. Theoretical Computer Science, 44(1):51–68, 1986.
Anyone have a preferred name for this distinction?
Created lexicographic order.
created stub entry for Walker-Wang model
Started 12-dimensional supergravity following some discussion with Urs.
added to identity type a mentioning of the alternative definition in terms of inductive types (paths).
brief category:people entry for hyperlinking references at 12-dimensional supergravity
gave this material, taken from the Examples-section at filtered topological space, its own entry
Didn’t touch the material beyond some trivial formatting and adding more references.
Started to write up a homotopy-theoretic version of James construction following ideas of Brunerie’s IAS talk at filtered topological space
created supergravity
so far just an "Idea" section and a link to D'Auria-Fre formulation of supergravity (which i am busy working on)
brief category:people entry for hyperlinking references at super Riemann surface and Randall-sundrum model