解説

一般に、 $[ X ] \cdot [ Y ] \neq [ Y ] \cdot [ X ]$ である。

以下の関係式が成り立つ。

$$[ Z ] \cdot [ Y ] \cdot [ X ] = Z_{ij} Y_{jk} X_{kl} \{ e \} _i \otimes \{ e \} _l$$ (1.57)

$$[ Z ] \cdot ( [ Y ] \cdot [ X ] ) = ( [ Z ] \cdot [ Y ] ) \cdot [ X ]$$ (1.58)

$${ [ X ] } ^ { 2 } = [ X ] \cdot [ X ]$$ (1.59)

$${ [ X ] } ^ { 3 } = [ X ] \cdot [ X ] \cdot [ X ]$$ (1.60)

$$[ Y ] \cdot ( [ X ] \cdot \{ a \} ) = ( [ Y ] \cdot [ X ] ) \cdot \{ a \}$$ (1.61)

$$[ Z ] \cdot \{ [ Y ] \cdot ( [ X ] \cdot \{ a \} ) \} = ( [ Z ] \cdot [ Y ] \cdot [ X ] ) \cdot \{ a \}$$ (1.62)

$$( \{ a \} \otimes \{ b \} ) \cdot ( \{ c \} \otimes \{ d \} ) = ( \{ b \} \cdot \{ c \} ) ( \{ a \} \otimes \{ d \} )$$ (1.63)

$${ ( [ Y ] \cdot [ X ] ) } ^ { T } = { [ X ] } ^ { T } \cdot { [ Y ] } ^ { T }$$ (1.64)

$${ ( [ Z ] \cdot [ Y ] \cdot [ X ] ) } ^ { T } = { [ X ] } ^ { T } \cdot { [ Y ] } ^ { T } \cdot { [ Z ] } ^ { T }$$ (1.65)

$$[ X ] \cdot ( \{ a \} \otimes \{ b \} ) = ( [ X ] \cdot \{ a \} ) \otimes \{ b \}$$ (1.66)

$$( \{ a \} \otimes \{ b \} ) \cdot [ X ] = \{ a \} \otimes ( \{ b \} \cdot [ X ] ) = \{ a \} \otimes ( { [ X ] } ^ { T } \cdot \{ b \} )$$ (1.67)