EQUIVALENT MATRICES
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(as right factor). To find hud and dbk we have only
to interchange the words first and second in what pre
cedes.
The product cd (or dc) may be obtained from d by
interchanging the two rows (or columns) of d.
The product e u d may be obtained from d by inserting
the factor u before each element of the first row of d.
The product de u may be obtained from d by inserting
the factor u after each element of the first column of d.
Hence for any n, matrix d is equivalent to those
and only those matrices which may be derived from it
by any succession of the following elementary transforma
tions:
i) The addition to the elements of any row of the
products of any element k of the set S into the corre
sponding elements of another row, k being used as a
left factor,
ii) The addition to the elements of any column of the
products of the corresponding elements of another
column into any element k of S, k being used as a right
factor.
iii) The interchange of any two rows or of two
columns.
iv) The insertion of the same unit factor before each
element of any row.
v) The insertion of the same unit factor after each
element of any column.
We shall call the element d IX of matrix d its first
element. If d^o there exists by (iii) an equivalent
matrix whose first element is not zero.
Lemma i. If the first element of a matrix d is not
zero and is a left divisor of every element of the first row and
