Revision as of 03:40, 5 October 2007 by imported>Hendra I. Nurdin
In mathematics, an inner produce space is a vector space that is endowed with an inner product. It is also a normed space since an inner product induces a norm on the vector space on which it is defined. A complete inner product space is called a Hilbert space.
Examples of inner product spaces
- The Euclidean space endowed with the real inner product for all . This inner product induces the Euclidean norm
- The space of the equivalence class of all complex-valued Lebesque measurable scalar square integrable functions on with the complex inner product . Here a square integrable function is any function f satisfying . The inner product induces the norm
See also
Completeness
Banach space
Hilbert space