X-Git-Url: http://gitweb.michael.orlitzky.com/?p=mjotex.git;a=blobdiff_plain;f=examples.tex;h=e0ffcb97a11ce5a97a2e837e7c994fd19714e1ae;hp=ee0409699b5a5041fe833e90dac720b8223d04f1;hb=987368c596bfe23dbcbaf5260a0d7011c9d3fc1e;hpb=16277f17cbd1a3c797d13cc2724784eedc207f22 diff --git a/examples.tex b/examples.tex index ee04096..e0ffcb9 100644 --- a/examples.tex +++ b/examples.tex @@ -28,7 +28,8 @@ \begin{section}{Arrow} The identity operator on $V$ is $\identity{V}$. The composition of $f$ and $g$ is $\compose{f}{g}$. The inverse of $f$ is - $\inverse{f}$. + $\inverse{f}$. If $f$ is a function and $A$ is a subset of its + domain, then the preimage under $f$ of $A$ is $\preimage{f}{A}$. \end{section} \begin{section}{Common} @@ -55,7 +56,7 @@ (indexed) union and intersections of things, like $\unionmany{k=1}{\infty}{A_{k}}$ or $\intersectmany{k=1}{\infty}{B_{k}}$. The best part about those - are that they do the right thing in a display equation: + is that they do the right thing in a display equation: % \begin{equation*} \unionmany{k=1}{\infty}{A_{k}} = \intersectmany{k=1}{\infty}{B_{k}} @@ -103,6 +104,30 @@ The set of all bounded linear operators from $V$ to $W$ is $\boundedops[W]{V}$. If $W = V$, then we write $\boundedops{V}$ instead. + + The direct sum of $V$ and $W$ is $\directsum{V}{W}$, of course, + but what if $W = V^{\perp}$? Then we wish to indicate that fact by + writing $\directsumperp{V}{W}$. That operator should survive a + display equation, too, and the weight of the circle should match + that of the usual direct sum operator. + % + \begin{align*} + Z = \directsumperp{V}{W}\\ + \oplus \oplusperp \oplus \oplusperp + \end{align*} + % + Its form should also survive in different font sizes... + \Large + \begin{align*} + Z = \directsumperp{V}{W}\\ + \oplus \oplusperp \oplus \oplusperp + \end{align*} + \Huge + \begin{align*} + Z = \directsumperp{V}{W}\\ + \oplus \oplusperp \oplus \oplusperp + \end{align*} + \normalsize \end{section} \begin{section}{Listing}