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added below the very first definition at kernel a remark that spells out the universal property more explicitly. Also added mentioning of some basic examples.
This is the list from proof assistant – Examples, and was (incompleteky) copied by hand into related entries, but we should make it (as done hereby) a standalone to be !includeed under “Related concepts” in relevant entries
All I did in editing was to group the proof assistants into “based on type/set theory” and “applicable to homotopy type theory”. Experts please hit “edit” and improve on it
Yesterday I had added some rough bits and pieces and some references to ADE singularity, and cross-linked with relevant entries such as ADE classification and M-theory on G2-manifolds. But for the moment this remains a stub.
expanded chain homotopy: added the usual non-commuting diagram, a discussion of chain homotopy equivalence and slightly expanded the description in terms of left homotopy
this MO comment made me realize that we didn’t have an entry proof assistant, so I started one
added the statement (now this prop) that smooth manifolds with boundary are fully faithful in diffeological spaces, with pointer to Igresias-Zemmour 13, section 4.16.
Will add the same to diffeological space.
A long time ago we had a discussion at graph about notions of morphism. I have written an article category of simple graphs which collects some properties of the category under one of those definitions (corresponding better, I think, to graph-theoretic practice).
Added a bunch of material to inverse semigroup under subsections of “Properties”.
New page displayed category.
I just aadded a sentence about Yang-Mills theory to gauge group, but there are some aspects of that article I feel we might want to discuss:
I don’t think that the statement “gauge groups encoded redundancies” of the mathematical description of the physics is correct. One hears this every now and then, and I suppose the idea is the observation that physical observables have to be in the trivial representation of the gauge group, but there is more to the gauge group than that.
Notably Yang-Mills theory is a theory of connections on G-principal bundles. No mathematician would ever say that the group G in a G-principal bundle just encodes a redundancy of our descriptins of that bundle. And the reason is because it is true only locally: the thing is that has a single object and hence is connected , but it has higher homotopy groups, and that’s where all the important information encoded by the gauge group sits.
So I would say that instead of being a redundancy of the description, instead the gauge group of Yang-Mills theory enocedes precisely the homotopy type of its moduli space. This is rather important.
A different matter are global gauge symmetries such as those that the DHR-theory deals with.
added to Yang-Mills instanton a discussion of instantons as tunnelings between Chern-Simons vacua.
am starting this for completeness, in the context of a more general entry Dp-D(p+4)-brane bound state. Nothing much here yet
started something. For the moment really just a glorified pointer to Buchert et al. 15 and putting Scharf 13 into perspective
stub for E-infinity algebra
I noticed some inconsistencies in the section outline at algebraic theory, that must have come from different people editing different pieces and mixing up some global entry structure.
I have briefly tried to reinstantiate consistent order. But the entry could probably do with somebody looking over in its entirety with an editor-hat on.
started some bare minimum omn RR-field tadpole cancellation. Currently I am using this just to complement discussion at intersecting D-brane models
just a stub for the moment, in order to have a place for recording relevant references, such as
am giving this table from the entry RR-field tadpole cancellation its stand-alone entry, so that it may be !include-ed into other relevant entries, such as at intersecting D-brane model