As a first example, consider
Rn with zero-bracket and standard inner product :((x_1,\dots,x_n),(y_1,\dots,y_n)):= \sum_j x_jy_j. Since the bracket is trivial the invariance is trivially fulfilled. As a more elaborate example consider
so(3), i.e.
R3 with base
X,Y,Z, standard inner product, and Lie bracket :[X,Y]=Z,\quad [Y,Z]=X,\quad [Z,X]=Y. Straightforward computation shows that the inner product is indeed preserved. A generalization is the following.
Semisimple Lie algebras A big group of examples fits into the category of semisimple Lie algebras, i.e. Lie algebras whose adjoint representation is faithful. Examples are
sl(n,R) and
su(n), as well as
direct sums of them. Let thus
g be a semi-simple Lie algebra with adjoint representation
ad, i.e. :\mathrm{ad}\colon\mathfrak{g}\to\mathrm{End}(\mathfrak{g}):X\mapsto (\mathrm{ad}_X\colon Y\mapsto [X,Y]). Define now the
Killing form :k\colon\mathfrak{g}\otimes\mathfrak{g}\to\mathbb{R}: X\otimes Y \mapsto -\mathrm{tr}(\mathrm{ad}_X\circ\mathrm{ad}_Y). Due to the
Cartan criterion, the Killing form is non-degenerate if and only if the Lie algebra is semisimple. If
g is in addition a
simple Lie algebra, then the Killing form is up to rescaling the only invariant symmetric bilinear form. == References ==