User:Alexathkust/algebra

first linear algebra

[edit] book a read

name	arthor	date	other
Linear Algebra--An introduction to Abstract Mathematics	Robert J. Valenza	Sep 07- Dec 07	textbook of MATH217

Name/Symbol	Definition	⇔	⇐	⇒
Adjoint operator T*	Let T:V→W be a linear transformation, where V and W are finite-dimensional inner product spaces with inner products $\langle \cdot,\cdot \rangle _1$ and $\langle \cdot,\cdot \rangle _2$ , respectively. A function T:W→V is called an adjoint* of T if $\langle \rm{T}(x),y\rangle _2=\langle x,\rm{T}^*(y)\rangle _1$ for all $x\isin \rm{V}$ and $y\isin \rm{W}$ .
Normal operator TT=TT
Self-adjoint(Hermitian) operator T=T*
Unitary operator \|\|T(x)\|\|=\|\|x\|\| (F=C)
Orthogonal operator \|\|T(x)\|\|=\|\|x\|\| (F=R)