User:Jshflynn

Sigh
I impose all my will on the world and state now once and for all that:


 * $\N = \{1,2,3,...\}$


 * $\N^- = \{-1,-2,-3,...\}$


 * $\Z^+ = \{0,1,2,3,...\}$


 * $\Z^- = \{0,-1,-2,-3,...\}$


 * $\Z^\times = \{...,-2,-1,1,2,...\}$


 * $\Z = \{...,-2,-1,0,1,2,...\}$

What happens: "Wind and crickets." :) --Jshflynn (talk) 14:14, 18 March 2013 (UTC)


 * Alternatively we have the house style versions $\N_{>0}, \Z_{<0}, \Z_{\ge 0}, \Z_{\le 0}, \Z_{\ne 0}$ and $\Z$ which are preferred on this site. --prime mover (talk) 15:06, 18 March 2013 (UTC)


 * Your will is by no means standard: $\N = \{0,1,\ldots\}$ is pretty common, and $\Z^*$ is often the group of units of $\Z$, so $\Z^* = \{\pm 1\}$. The preferred versions have the advantage that there's little chance of confusion about what is intended, and this matters on a site has no "notation database" (side note: maybe it such a thing would be worthwhile anyway?). Unambiguity (disambiguity?) wins in this case. --Linus44 (talk) 22:49, 18 March 2013 (UTC)


 * See the "Symbol Index" for a start on such a notation database. --prime mover (talk) 23:17, 18 March 2013 (UTC)


 * Edit conflict! :)


 * You beat me to it PM. I should say that the thing above was a bad joke by me. --Jshflynn (talk) 23:25, 18 March 2013 (UTC)


 * In appropriate contexts (where the naturals are understood to be Von Neumann naturals), you can use $\omega$ for $\{ 0, 1, \dots \}$. Obviously that won't work when dealing with the naturals in lambda calculus or other such things. --Dfeuer (talk) 02:53, 19 March 2013 (UTC)


 * Such uses need to be explained in the context. The use of $\omega$ is purely conventional and has absolutely no intrinsic merit. --prime mover (talk) 06:18, 19 March 2013 (UTC)


 * Obviously. Of course all of these letters are purely conventional and have no intrinsic merit. --Dfeuer (talk) 16:57, 19 March 2013 (UTC)


 * I changed $\mathbb Z^*$ to $\mathbb Z^\times$ based on what Linus44 said. --Jshflynn (talk) 17:08, 19 March 2013 (UTC)

A Relation Zoo
What follows is a table of specific types of transitive relations as they are named on.

The relation of interest shall be denoted $\mathcal R$ and it shall be on the set $S$.

Under Reflexivity

 * T means the relation is reflexive.


 * F means the relation is antireflexive.

These can both hold iff $S = \varnothing$.

Under Symmetry

 * T means the relation is symmetric.


 * F means the relation is antisymmetric.

These can both hold iff $\mathcal R$ is coreflexive as proved in Relation both Symmetric and Antisymmetric.

If they both hold and $\mathcal R$ is reflexive or connected then $\mathcal R$ is the diagonal relation on $S$.

If they both hold and $\mathcal R$ is antireflexive then $\mathcal R$ is the null relation on $S$.

We leave it blank if it is not of concern to us.

Under Connected

 * T means the relation is connected.


 * F means it is not.

We leave it blank if it is not of concern to us.

The Table
In addition to this we name:


 * Partial Preordering: A Weak Partial Preordering or Strict Partial Preordering.


 * Total Preordering: A Weak Total Preordering or Strict Total Preordering.


 * Weak Preordering: A Weak Partial Preordering or Weak Total Preordering.


 * Strict Preordering: A Strict Partial Preordering or Strict Total Preordering.


 * Preordering: A Weak Preordering or Strict Preordering.

Similarly we name:


 * Partial Ordering: A Weak Partial Ordering or Strict Partial Ordering.


 * Total Ordering: A Weak Total Ordering or Strict Total Ordering.


 * Weak Ordering: A Weak Partial Ordering or Weak Total Ordering.


 * Strict Ordering: A Strict Partial Ordering or Strict Total Ordering.


 * Ordering: A Weak Ordering or Strict Ordering.


 * Null Relation: The relation that does not relate any pairs. It is transitive, antitransitive, negatively transitive, antisymmetric, and antireflexive, and is the only relation to be both symmetric and asymmetric. —Dfeuer (talk) 17:11, 19 March 2013 (UTC)

For the relational structure $\left({S, \mathcal R}\right)$ we name it as follows:

Blah blah blah :) --Jshflynn (talk) 13:06, 14 March 2013 (UTC)

True or not?
A non-empty semigroup $(S, \circ)$ is a group iff:


 * $\forall x \in S: x \circ_\mathcal P S = S \circ_\mathcal P x = S$

This definition of a group is given in An Introduction to Semigroup Theory (by John Howie). He states that its convenient for his set up but acknowledges that it is a highly unusual definition to give for a group.

Lame
Something occurred earlier to do with my cookies. My proof was not saved :(

--Jshflynn (talk) 15:13, 9 March 2013 (UTC)


 * If you use Google Chrome there exists the ability to go back to the page that failed to be saved and you can then do an emergency cut-and-paste into a separate text editor from which you can then retrieve the material you would otherwise lose. --prime mover (talk) 16:01, 9 March 2013 (UTC)


 * I did not know that. Thanks :) --Jshflynn (talk) 16:12, 9 March 2013 (UTC)

Sandbox
User:Jshflynn/Sandbox0

User:Jshflynn/Sandbox1

User:Jshflynn/Sandbox2

User:Jshflynn/Left Zero Semigroup

User:Jshflynn/Right Zero Semigroup

User:Jshflynn/Rectangular Band Isomorphism Theorem

Equivalence Relation Alternative Definition 2
$(1)$ $\mathcal R$ is left total or right total.

$(2)$ $\mathcal R = \mathcal R^{-1}$

$(3)$ $\mathcal R \circ \mathcal R = \mathcal R$

Construct Notes
Presenting Relations:

$(a \mathrel{\mathcal R} b)$

$(a \mathcal R b)$

As for parentheses, you should be careful because $\lor$, $\land$, and $\lnot$ can have somewhat different meanings that can be confused without parentheses. For example, $a = b \wedge c = d$ could be read as $(a = b) \land (c = d)$ (that is, "$a = b$ and $c = d$", or it could be read as "$a = (b \wedge c) = d$" (that is, "$a$ equals the meet of $b$ and $c$, which also equals $d$). The same problem happens with $\lor$, which looks just like $\vee$, which can mean "join". Note also that $\neg$ may be read as "complement" in some cases, so you have to be just as careful there. --Dfeuer (talk) 07:59, 5 March 2013 (UTC)

Engine Fuel
I will be extracting some stuff off this if you don't mind:




 * Actually, I'd rather see it coming from some elements from the extensive reference list &mdash; notes like these can perish without warning. If you like the presentation, please make sure to grab a copy of it before it's too late. &mdash; Lord_Farin (talk) 07:40, 5 March 2013 (UTC)


 * Okay :) --Jshflynn (talk) 07:50, 5 March 2013 (UTC)

When did transclusion first appear on this site?
In particular when did it really take off?

There's something oddly pleasing about it.


 * Sometime around when I discovered its use in Trigonometric Identities, around 29th Dec 2010. My playlist at the time was the Beatles 1962-66 and 1967-70 which I'd just bought for the wife for xmas. Can you think of a more pleasurable occupation than doing maths while listening to the Beatles? --prime mover (talk) 21:24, 6 March 2013 (UTC)

Archive
Welcome to the archive. Unfortunately there are no staff here so note down landmarks and try not to get lost :)

User:Jshflynn/archive/preMarch2013