Row and column spaces

In linear algebra, the column space (also called the range or image) of a matrix A is the span (set of all possible linear combinations) of its column vectors. The column space of a matrix is the image or range of the corresponding matrix transformation.

Let $F$ be a field. The column space of an $m \times n$ matrix with components from $F$ is a linear subspace of the m-space $F^{m}$ . The dimension of the column space is called the rank of the matrix and is at most $min(m, n)$ .^[1] A definition for matrices over a ring $R$ is also possible.

The row space is defined similarly.

The row space and the column space of a matrix $A$ are sometimes denoted as $C (A T)$ and $C (A)$ respectively.^[2]

This article considers matrices of real numbers. The row and column spaces are subspaces of the real spaces $\mathbb {R} ^{n}$ and $\mathbb {R} ^{m}$ respectively.^[3]

^ Linear algebra, as discussed in this article, is a very well established mathematical discipline for which there are many sources. Almost all of the material in this article can be found in Lay 2005, Meyer 2001, and Strang 2005.
^ Strang, Gilbert (2016). Introduction to linear algebra (Fifth ed.). Wellesley, MA: Wellesley-Cambridge Press. pp. 128, 168. ISBN 978-0-9802327-7-6. OCLC 956503593.
^ Anton (1987, p. 179)

[ReferenceA-1] Linear algebra, as discussed in this article, is a very well established mathematical discipline for which there are many sources. Almost all of the material in this article can be found in Lay 2005, Meyer 2001, and Strang 2005.

[2] Strang, Gilbert (2016). Introduction to linear algebra (Fifth ed.). Wellesley, MA: Wellesley-Cambridge Press. pp. 128, 168. ISBN 978-0-9802327-7-6. OCLC 956503593.

[3] Anton (1987, p. 179)

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