MATRICES AND VECTOR SPACES
It follows thatanytheorem established for the rows ofAwill apply to the
columns as well, and vice versa.
(ii)Determinant of the complex and Hermitian conjugate. It is clear that the
matrixA∗obtained by taking the complex conjugate of each element ofA
has the determinant|A∗|=|A|∗. Combining this result with (8.49), we find
that|A†|=|(A∗)T|=|A∗|=|A|∗. (8.50)(iii)Interchanging two rows or two columns. If two rows (columns) ofAare
interchanged, its determinant changes sign but is unaltered in magnitude.
(iv)Removing factors. If all the elements of a single row (column) ofAhave
a common factor,λ, then this factor may be removed; the value of the
determinant is given by the product of the remaining determinant andλ.
Clearly this implies that if all the elements of any row (column) are zero
then|A|= 0. It also follows that if every element of theN×NmatrixA
is multiplied by a constant factorλthen|λA|=λN|A|. (8.51)(v)Identical rows or columns. If any two rows (columns) ofAare identical or
are multiples of one another, then it can be shown that|A|=0.
(vi)Adding a constant multiple of one row (column) to another. The determinant
of a matrix is unchanged in value by adding to the elements of one row
(column) any fixed multiple of the elements of another row (column).
(vii)Determinant of a product.IfAandBare square matrices of the same order
then|AB|=|A||B|=|BA|. (8.52)A simple extension of this property gives, for example,|AB···G|=|A||B|···|G|=|A||G|···|B|=|A···GB|,which shows that the determinant is invariant under permutation of the
matrices in a multiple product.There is no explicit procedure for using the above results in the evaluation ofany given determinant, and judging the quickest route to an answer is a matter
of experience. A general guide is to try to reduce all terms but one in a row or
column to zero and hence in effect to obtain a determinant of smaller size. The
steps taken in evaluating the determinant in the example below are certainly not
the fastest, but they have been chosen in order to illustrate the use of most of the
properties listed above.