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Vanilla 1.1.10 is a product of Lussumo. More Information: Documentation, Community Support.
an essentially empty stub, for the moment just to satisfy a link long requested at harmonic analysis
If is an arbitrary monoid with multiplication then induces a map , . We say that is representative if is in the image of the canonical map . Equivalently, is representative if the span of all functions is finite dimensional. It follows then that is in fact in (the image of) where is the space of all representative functions on .
Peter-Weyl theorem says that the continuous representative functions form a dense subspace of the space of all continuous functions on a compact Lie group .
added a pointer to Euclid and his monad teminology.
This entry largely overlaps with the new entry distribution on an affine algebraic group, but for the moment, due different tradition and minor differences in scope and in definitions , the entries are (at least temporarily) separate.
Some minor additions and changes at the page.
I have edited group scheme and algebraic group slightly. To the latter I added Example-pointers to multiplicative group and additive group
I found the section-outline of the entry distribution was a bit of a mess. So I have now edited it (just the secion structure, nothing else yet):
a) There are now two subsections for “Operations on distributions”,
b) in “Related concepts” I re-titled “Variants” into “Currents” (for that’s what the text is about) and gave “Hyperfunctions and Coulombeau distributions” its own subsection title.
c) split up the References into “General” and “On Coulombeau functions”.
(I hope that this message is regarded as boring and non-controversial.)
Created:
This article is meant to give an exhaustive list of explicitly constructed nontopological functorial field theories in dimension 2 and higher. All currently known explicit constructions are nonextended, and with the exception of the Kandel construction, have dimension 2.
I am starting a page about the pentagon relation for multiplicative unitaries and related mathematics. The page for pentagon relation should be a separate page, as one does not really need the real forms and unitarity condition for the pentagon to work; this pentagon relations is sometimes called pentagon equation. Lan uses pentagon equation as a redirect to pentagon identity from the axioms of (coherent) monoidal category, which is usually called pentagon identity indeed, and the terms relations and equation are more used in the context of dilogarithms, quantum groups, operator algebras and alike subjects, all related. The pentagon coherence is in fact related to all of these in a large subset of cases which can be directly expressed categorically, but the literature is quite different in flavour and eventually I will build 3 different pages with redirects and other superstructure, and references to the related terms like Drinfeld associator.
Added
For a treatment in homotopy type theory see
- Dan Frumin, Herman Geuvers, Léon Gondelman, Niels van der Weide, Finite Sets in Homotopy Type Theory, (pdf)
added pointer to:
Made some some small improvements (ordering of sections, note on how the definition defaults to the usual definition of adjoints, fixing broken link in the references, etc) in relative adjoint functor.
added today’s
The Bayesian interpretation of quantum mechanics is correct. So there!
I have spelled out the proof at paracompact Hausdorff spaces equivalently admit subordinate partitions of unity.
This uses Urysohn’s lemma and the shrinking lemma, whose proofs are not yet spelled out on the Lab.
some bare minimum at cut rule
created page just to hyperlink a result in weak Hopf algebra, should fill in
To support mentioning weak wreath product in a parallel discussion with Urs, I created a stub for weak bialgebra with redirect weak Hopf algebra.
<div>
<p>created <a href="https://ncatlab.org/nlab/show/nonabelian+group+cohomology">nonabelian group cohomology</a></p>
<p>the secret title of this entry is "Schreier theory done right". (where "right" is right from the <a href="https://ncatlab.org/nlab/show/nPOV">nPOV</a>)</p>
<p>this is the first part of the answer to</p>
<blockquote>
What is going on at <a href="https://ncatlab.org/nlab/show/nonabelian+Lie+algebra+cohomology">nonabelian Lie algebra cohomology</a>?
</blockquote>
<p>The second part of the answer is the statement:</p>
<blockquote>
The same.
</blockquote>
<p>;-)</p>
<p>I'll expand on that eventually.</p>
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the graphics at the old entry horizontal composition comes out wrong on my system. What’s going on? This is included as SVG.
you can define to be the 2-category of all -small categories, where is some Grothendieck universe containing . That way, you have without contradiction.
Do you agree with changing this to
” you can define to be the 2-category of all -small categories, where is some Grothendieck universe containing . That way, for every small category , you have the category an object of without contradiction. This way, e.g. the diagram in Cat used in this definition of comma categories is defined. “
?
Reason: motivation is to have the pullback-definition of a comma category in (For others, it’s about the diagram here) defined, or rather, having Cat provide a way to make it precise. Currently, the diagrammatic definition can either be read formally, as a device to encode the usual definition of comma categories, or a reader can try to consult Cat in order to make it precise. Then they will first find only the usual definition of Cat having small objects only, which does not take care of the large category
used in the pullback-definition. Then perhaps they will read all the way up to Grothendieck universes, but find that option not quite sufficient either since it only mentions Set, but not . It seems to me that large small-presheaf-categories such as can be accomodated, too, though.
(Incidentally, tried to find a “canonical” thread for the article “Cat”, by using the search, but to no avail. Therefore started this one.)
Added a pointer to adjoint functors and triangle identities to the entry whiskering. Feel that an encyclopedia entry on that operation should mention these two other entries.
Wrote up a quick article on Roger Godement.
promted by demand from my Basic-Course-On-Category-Theory-Students I expanded the entry 2-category:
mentioned more relations to other concepts in the Idea-section;
added an Examples-section with a bunch of (classes of) examples;
added a list of references. Please add more if you can think of more!
Wrote some minimum at natural bundle.
created a bare minimum at jet group
stub for jet bundle
I have added some accompanying text to the list of links at monad (disambiguation).
One question: in the entry Gottfried Leibniz it is claimed that the term “monad” for a functor on a category with monoid structure also follows Leibniz’s notion of monads. Is this really so? What’s a reference for this claim?
I am asking because I don’t see how the notion of monoid in the endomorphisms of a category would be related to what Leibniz was talking about. What’s the idea, if there is one?
I have added the adjoint modality of on .
This example is from adjoint modality (here). But it was actually a little wrong there. I have fixed it and expanded there and then copied over to here.
I just see that in this entry it said
Classically, 1 was also counted as a prime number, …
If this is really true, it would be good to see a historic reference. But I’d rather the entry wouldn’t push this, since it seems misguided and, judging from web discussion one sees, is a tar pit for laymen to fall into.
The sentence continued with
… the number 1 is too prime to be prime.
and that does seem like a nice point to make. So I have edited the entry to now read as follows, but please everyone feel invited to have a go at it:
A prime number is a natural number which cannot be written as a product of two smaller numbers, hence a natural number greater than 1, which is divisible only by 1 and by itself.
This means that every natural number is, up to re-ordering of factors, uniquely expressed as a product of a tuple of prime numbers:
This is called the prime factorization of .
Notice that while the number is, clearly, only divisible by one and by itself, hence might look like it deserves to be counted as a prime number, too, this would break the uniqueness of this prime factorization. In view of the general phenomenon in classifications in mathematics of objects being too simple to be simple one might say that 1 is “too prime to be prime”.
a bare list of references, to be !include-ed into lists of references of relevant entries (such as 2d CFT, 2d SCFT, conformal cobordism category, modular functor and maybe elsewhere)