Definition:Orthogonal (Linear Algebra)/Orthogonal Complement/Also known as
Jump to navigation
Jump to search
Orthogonal Complement: Also known as
The orthogonal complement of a subset $A$ of an inner product space is also known as its orthocomplement.
The operation of assigning the orthogonal complement $A^\perp$ to $A$ is referred to as orthocomplementation.
Sources
This page may be the result of a refactoring operation. As such, the following source works, along with any process flow, will need to be reviewed. When this has been completed, the citation of that source work (if it is appropriate that it stay on this page) is to be placed above this message, into the usual chronological ordering. In particular: with respect to subpages which have been separated out If you have access to any of these works, then you are invited to review this list, and make any necessary corrections. To discuss this page in more detail, feel free to use the talk page. When this work has been completed, you may remove this instance of {{SourceReview}} from the code. |
- 1990: John B. Conway: A Course in Functional Analysis (2nd ed.) ... (previous) ... (next): $\text I.2.1$