Category:Definitions/Orthogonality (Linear Algebra)
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This category contains definitions related to Orthogonality in the context of Linear Algebra.
Related results can be found in Category:Orthogonality (Linear Algebra).
Let $\struct {V, \innerprod \cdot \cdot}$ be an inner product space.
Let $u, v \in V$.
We say that $u$ and $v$ are orthogonal if and only if:
- $\innerprod u v = 0$
We denote this:
- $u \perp v$
Pages in category "Definitions/Orthogonality (Linear Algebra)"
The following 8 pages are in this category, out of 8 total.
O
- Definition:Orthogonal (Linear Algebra)
- Definition:Orthogonal (Linear Algebra)/Orthogonal Complement
- Definition:Orthogonal (Linear Algebra)/Orthogonal Complement/Also known as
- Definition:Orthogonal (Linear Algebra)/Real Vector Space
- Definition:Orthogonal (Linear Algebra)/Set
- Definition:Orthogonal (Linear Algebra)/Sets
- Definition:Orthogonal Sets
- Definition:Orthogonal Subspaces