Multiple Cross Products

:(''A''×''B'')×''C'' ≠ ''A''×(''B''×''C'').

On the other hand Exterior Algebra ''is'' associative. Therefore this is an aspect of Multilinear Algebra that goes beyond the basics of the Wedge Product . Since the cross product is Anticommutative , left and right can be switched with a change of sign, at most.

In traditional treatments of tensors, this question is handled in terms of the Levi-Civita Symbol defined by

:

\epsilon_{ijk} =
\left\{
\begin{matrix}
+1 & \mbox{if } (i,j,k) \mbox{ is } (1,2,3), (2,3,1) \mbox{ or } (3,1,2)\
-1 & \mbox{if } (i,j,k) \mbox{ is } (3,2,1), (1,3,2) \mbox{ or } (2,1,3)\
0  & \mbox{otherwise: }i=j \mbox{ or } j=k \mbox{ or } k=i
\end{matrix}

ight.

and a basic identity for it.

Since the cross product as Cartesian Tensor is

:ε_''ijk''''a''_''i''''b''_''j''

with the Summation Convention understood, the required identity would be for

:ε_''ijk''ε_''klm''.

This is shown to be a combination of Kronecker Delta s

:δ_''il''δ_''jm'' − δ_''im''δ_''jl''.

This can be proved by a short direct argument on Permutation s; it is also equivalent to an identity on triple cross products.

Armed with this formula, any multiple cross product can be simplified. Those of odd length come out without cross products, since an even number of ε symbols will always 'cancel' into δ symbols. For long products the result does grow exponentially.

	APPAREL
	BABY
	BEAUTY
	BOOKS
	CAR TOYS
	CELL PHONES
	DVD'S
	ELECTRONICS
	GOURMET FOOD
	GROCERIES
	HEALTH & PERSONAL
	HOME & GARDEN
	JEWELRY
	MUSIC
	MUSIC INSTRUMENTS
	OFFICE PRODUCTS
	SOFTWARE
	SPORTING GOODS
	TOOLS & HARDWARE
	TOYS
	VIDEO GAMES
	SHOPPING HOME

	MORE SHOPPING...

	CATEGORIES ABOUT MULTIPLE CROSS PRODUCTS

	multilinear algebra

Information About

Multiple Cross Products