X-Git-Url: http://gitweb.michael.orlitzky.com/?p=mjotex.git;a=blobdiff_plain;f=mjo-linear_algebra.tex;h=a534523765ef1fd20f7729af25836bb2075fcd3e;hp=267ef67ae96af8482d502fbd9751b7471122d878;hb=66a672c6c1657ad96422fcdb4828bc5d9a108ab0;hpb=fe30cc3cf8f9a88785d2899d00a727931377bb5d diff --git a/mjo-linear_algebra.tex b/mjo-linear_algebra.tex index 267ef67..a534523 100644 --- a/mjo-linear_algebra.tex +++ b/mjo-linear_algebra.tex @@ -18,7 +18,7 @@ \usepackage{trimclip} \fi -\input{mjo-common} +\input{mjo-common} % for \of, at least % Absolute value (modulus) of a scalar. \newcommand*{\abs}[1]{\left\lvert{#1}\right\rvert} @@ -51,6 +51,11 @@ % The trace of an operator. \newcommand*{\trace}[1]{ \operatorname{trace}\of{{#1}} } +% The diagonal matrix whose only nonzero entries are on the diagonal +% and are given by our argument. The argument should therefore be a +% vector or tuple of entries, by convention going from the top-left to +% the bottom-right of the matrix. +\newcommand*{\diag}[1]{\operatorname{diag}\of{{#1}}} % The "rank" of its argument, which is context-dependent. It can mean % any or all of, @@ -71,6 +76,19 @@ % The orthogonal projection of its second argument onto the first. \newcommand*{\proj}[2] { \operatorname{proj}\of{#1, #2} } +% The set of all eigenvalues of its argument, which should be either a +% matrix or a linear operator. The sigma notation was chosen instead +% of lambda so that lambda can be reserved to denote the ordered tuple +% (largest to smallest) of eigenvalues. +\newcommand*{\spectrum}[1]{\sigma\of{{#1}}} +\ifdefined\newglossaryentry + \newglossaryentry{spectrum}{ + name={\ensuremath{\spectrum{L}}}, + description={the set of all eigenvalues of $L$}, + sort=s + } +\fi + % The ``Automorphism group of'' operator. \newcommand*{\Aut}[1]{ \operatorname{Aut}\of{{#1}} } @@ -133,7 +151,9 @@ % The space of complex Hermitian n-by-n matrices. Does not reduce to % merely "H" when n=1 since H^{n} does not mean an n-fold cartesian -% product of H^{1}. +% product of H^{1}. The field may also be given rather than assumed +% to be complex; for example \Hn[3]\of{\mathbb{O}} might denote the +% 3-by-3 Hermitian matrices with octonion entries. \newcommand*{\Hn}[1][n]{ \mathcal{H}^{#1} } \ifdefined\newglossaryentry \newglossaryentry{Hn}{