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Mathematics-Online lexicon:

Higher Partial Derivatives


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Since partial derivatives are themselves functions, we can repeat the process of partial differentiation.

Second partial derivatives are denoted by

$\displaystyle \partial_i \partial_j f =
f_{x_jx_i} =
\frac{\partial^2 f}{\partial x_i \partial x_j}
.$

Similarly higher partial derivatives are written $ \partial_i\partial_j\partial_k\ldots f .$

In the case when mixed partial derivatives are equal (i.e. it does not matter whether the partial derivatives are taken first with respect to a variable $ x_i$ and then with respect to $ x_j$ or vice versa) one can use multiindices for higher partial derivatives.

$\displaystyle \partial^\alpha f =
\partial_1^{\alpha_1}\cdots\partial_n^{\alpha_n} f,
\quad \alpha=(\alpha_1,\ldots,\alpha_n)\,
,
$

Here the index $ \alpha_i \in \mathbb{N}_0$ denotes the number of partial derivatives with respect to the $ i$-th variable. The sum $ \left\vert \alpha \right\vert=\alpha_1+\cdots
+\alpha_n$ is called the order of the partial derivative.

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  automatically generated 8/ 4/2008