Multi-index: Difference between revisions

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imported>Aleksander Stos
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In mathematics, '''multi-index''' is an ''n''-tuple of non-negative integers. Multi-indices are widely used in multidimensional analysis to denote e.g. partial derivatives and multivariable power function. Many formulas known from the one dimension one (i.e. the real line) carry on to <math>\mathbb{R}^n</math> by simple replacing usual indices with multi-indices.
In mathematics, '''multi-index''' is an ''n''-tuple of non-negative integers. Multi-indices are widely used in multivariable analysis to denote e.g. partial derivatives and multidimensional power function. Many formulas known from the one dimension one (i.e. the real line) carry on to <math>\mathbb{R}^n</math> by simple replacing usual indices with multi-indices.


Formally, multi-index <math>\alpha</math> is defined as
Formally, multi-index <math>\alpha</math> is defined as

Revision as of 12:53, 4 December 2007

In mathematics, multi-index is an n-tuple of non-negative integers. Multi-indices are widely used in multivariable analysis to denote e.g. partial derivatives and multidimensional power function. Many formulas known from the one dimension one (i.e. the real line) carry on to by simple replacing usual indices with multi-indices.

Formally, multi-index is defined as

, where

Basic definitions and notational conventions using multi-indices.

  • The order or length of
  • Factorial of a multi-index
  • multidimensional power notation
If and is a multi-index then is defined as
  • The following notation are used to denote a partial derivative of a function
Remark: sometimes instead of is used as well.