Page:Grundgleichungen (Minkowski).djvu/27

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Here I am using a method of calculation, which enables us to deal in a simple manner with the space-time vectors of the 1st, and 2nd kind, and of which the rules, as far as required are given below.

1°. A system of magnitudes $a_{hk}$ , formed into the matrix

\left|{\begin{array}{ccc}a_{11},&\dots &a_{1q}\\\vdots &&\vdots \\a_{p1},&\dots &a_{pq}\end{array}}\right|

arranged in p horizontal rows, and q vertical columns is called a $p\times q$ series-matrix,^[1] and will be denoted by the letter A.

If all the quantities $a_{hk}$ are multiplied by c, the resulting matrix will be denoted by $cA$ .

If the roles of the horizontal rows and vertical columns be intercharged, we obtain a $q\times p$ series matrix, which will be known as the transposed matrix of A, and will be denoted by A.

{\bar {A}}=\left|{\begin{array}{ccc}a_{11},&\dots &a_{q1}\\\vdots &&\vdots \\a_{1p},&\dots &a_{pq}\end{array}}\right|

.

If we have a second $p\times q$ series matrix B.

B=\left|{\begin{array}{ccc}b_{11},&\dots &b_{1q}\\\vdots &&\vdots \\b_{p1},&\dots &b_{pq}\end{array}}\right|

,

then A+B shall denote the $p\times q$ series matrix whose members are $a_{hk}+b_{hk}$ .

2° If we have two matrices

A=\left|{\begin{array}{ccc}a_{11},&\dots &a_{1q}\\\vdots &&\vdots \\a_{p1},&\dots &a_{pq}\end{array}}\right|,\ B=\left|{\begin{array}{ccc}b_{11},&\dots &b_{1r}\\\vdots &&\vdots \\b_{p1},&\dots &b_{qr}\end{array}}\right|

where the number of horizontal rows of B, is equal to the number of vertical columns of A,

↑ One could think about using Hamilton's quaternion calculus instead of Cayley's matrix calculus, however, Hamilton's calculus seems to me as too narrow and cumbersome for our purposes.

[1] One could think about using Hamilton's quaternion calculus instead of Cayley's matrix calculus, however, Hamilton's calculus seems to me as too narrow and cumbersome for our purposes.

[1]