X-Git-Url: http://gitweb.michael.orlitzky.com/?p=mjotex.git;a=blobdiff_plain;f=mjo-linear_algebra.tex;h=5c3f715744b14db7b4984b063952f02ba5ac530e;hp=5fce75a403b83ace1b686c622f05ea24e1248363;hb=7321e6c665f3b9797bb7a76618e6419a33357e6c;hpb=7a60af0c2fa38f05aecd84b530d3c5b87eaf3de7 diff --git a/mjo-linear_algebra.tex b/mjo-linear_algebra.tex index 5fce75a..5c3f715 100644 --- a/mjo-linear_algebra.tex +++ b/mjo-linear_algebra.tex @@ -5,6 +5,12 @@ % Needed for \lvert, \rVert, etc. and \operatorname. \usepackage{amsmath} +% Wasysym contains the \ocircle that we use in \directsumperp. +\usepackage{wasysym} + +% Part of the adjustbox package; needed to clip the \perp sign. +\usepackage{trimclip} + \input{mjo-common} % Absolute value (modulus) of a scalar. @@ -31,6 +37,10 @@ % specialized to real matrices. \newcommand*{\transpose}[1]{ #1^{T} } +% The Moore-Penrose (or any other, I guess) pseudo-inverse of its +% sole argument. +\newcommand*{\pseudoinverse}[1]{ #1^{+} } + % The trace of an operator. \newcommand*{\trace}[1]{ \operatorname{trace}\of{{#1}} } @@ -56,7 +66,7 @@ \newcommand*{\matricize}[1]{ \operatorname{mat}\of{{#1}} } % An inline column vector, with parentheses and a transpose operator. -\newcommand*{\colvec}[1]{ \left({#1}\right)^{T} } +\newcommand*{\colvec}[1]{ \transpose{\left({#1}\right)} } % Bounded linear operators on some space. The required argument is the % domain of those operators, and the optional argument is the @@ -76,14 +86,16 @@ % % Orthogonal direct sum. % -% Wasysym contains the \ocircle that we use in \directsumperp. -\usepackage{wasysym} -\usepackage{scalerel} +% First declare my ``perp in a circle'' operator, which is meant to be +% like an \obot or an \operp except has the correct weight circle. It's +% achieved by overlaying an \ocircle with a \perp, but only after we +% clip off the top half of the \perp sign and shift it up. \DeclareMathOperator{\oplusperp}{\mathbin{ \ooalign{ $\ocircle$\cr - \raisebox{\noexpand{0.65\height}}{${\vstretch{0.5}{\perp}}$}\cr + \raisebox{0.625\height}{$\clipbox{0pt 0pt 0pt 0.5\height}{$\perp$}$}\cr } }} +% Now declare an orthogonal direct sum in terms of \oplusperp. \newcommand*{\directsumperp}[2]{ {#1}\oplusperp{#2} }