triple product

This limits its approach to the triple product along the temperature and time axis.

Using the triple product expansion it can be written as:

The cross product is used in both forms of the triple product.

The above mentioned triple product expansion was also included.

The phase of the triple product is the closure phase.

There are many different notations used to express the Jacobi triple product.

In mathematics, the triple product is a product of three vectors.

These considerations are combined in the Lawson criterion, or its modern form, the fusion triple product.

The prototypical example of a pseudoscalar is the scalar triple product.

Note that the denominator is the scalar triple product.

The scalar triple product is invariant under rotation of the coordinate system.

For the special case of tokamaks there is an additional motivation for using the triple product.

Exact differential (has another derivation of the triple product rule)

In mathematics, the Jacobi triple product is the mathematical identity:

In abstract algebra, the triple product property is an identity satisfied in some groups.

The scalar triple product identity follows because each is a different representation of the same diagram's function.

The pentagonal number theorem occurs as a special case of the Jacobi triple product.

The wrapped normal distribution may also be expressed in terms of the Jacobi triple product:

These are extended to a scalar triple product and a quadruple product.

The scalar triple product is sometimes denoted by (a b c) and defined as:

Another identity relates the cross product to the scalar triple product:

The above-mentioned triple product expansion (bac-cab rule) can be easily proven using this notation.

There are also two triple products:

This means that ST's can reach the same operational triple product numbers as conventional designs using one tenth the magnetic field.

For vectors in R, the exterior algebra is closely related to the cross product and triple product.