Matrix
A matrix is a rectangular array of scalars from any field, such that each column belongs to the vector space , where is the number of rows. If a matrix has rows and columns, its order is said to be , and it is written as .
The element in the row and column of is written as . It is more often written as , in which case can be written as .
Transposes
Let be . Then is said to be the transpose of , written as or simply . If A is over the complex field, replacing each element of by its complex conjugate gives us the conjugate transpose of . In other words,
is said to be symmetric if and only if . is said to be hermitian if and only if . is said to be skew symmetric if and only if . is said to be skew hermitian if and only if .
Vector spaces associated with a matrix
As already stated before, the columns of form a subset of . The subspace of generated by these columns is said to be the column space of , written as . Similarly, the transposes of the rows form a subset of the vector space . The subspace of generated by these is known as the row space of , written as .
$y \in C(A) \Leftrightarrow \exists x <\math><math>\ni y_{m \times 1} = A_{{m \times n} x_{n \times 1}$ (Error compiling LaTeX. Unknown error_msg)
Rank and nullity
The dimension of