Share on Facebook Share on Twitter Email
Answers.com

Positive linear functional

 
Sci-Tech Dictionary: positive linear functional
Home > Library > Science > Sci-Tech Dictionary
(¦päz·əd·iv ¦lin·ē·ər ′fəŋk·shən·əl)

(mathematics) A linear functional on some vector space of real-valued functions which takes every nonnegative function into a nonnegative number.

Search unanswered questions...

Enter a question here...
Search: All sources Community Q&A Reference topics

Wikipedia: Positive linear functional
Top
Home > Library > Miscellaneous > Wikipedia

In mathematics, especially in functional analysis, a positive linear functional on an ordered vector space (V, ≤) is a linear functional f on V so that for all positive elements v of V, that is v≥0, it holds that

f(v)\geq 0.

In other words, a positive linear functional is guaranteed to take nonnegative values for positive elements. The significance of positive linear functionals lies in results such as Riesz representation theorem.

Examples

\psi(f) = \int_X f(x) d \mu(x) \quad
for all f in Cc(X). Then, this functional is positive (the integral of any positive function is a positive number). Moreover, any positive functional on this space has this form, as follows from the Riesz representation theorem.

See also


This entry is from Wikipedia, the leading user-contributed encyclopedia. It may not have been reviewed by professional editors (see full disclaimer)

 
 

 

Copyrights:

Sci-Tech Dictionary. McGraw-Hill Dictionary of Scientific and Technical Terms. Copyright © 2003, 1994, 1989, 1984, 1978, 1976, 1974 by McGraw-Hill Companies, Inc. All rights reserved.  Read more
Wikipedia. This article is licensed under the Creative Commons Attribution/Share-Alike License. It uses material from the Wikipedia article "Positive linear functional" Read more