Different

Two quantities are said to be different (or ``unequal'') if they are not Equal.

The term ``different'' also has a technical usage related to Modules. Let a Module in an Integral Domain for $R(\sqrt{D}\,)$ be expressed using a two-element basis as

$\begin{displaymath} M=[\xi_1, \xi_2], \end{displaymath}$

where $\xi_1$ and $\xi_2$ are in

. Then the different of the Module is defined as

$\begin{displaymath} \Delta=\Delta(M)=\left\vert\matrix{\xi_1 & \xi_2\cr \xi_1' & \xi_2'\cr}\right\vert = \xi_1\xi_2'-\xi_1'\xi_2. \end{displaymath}$

The different $\Delta\not=0$ Iff $\xi_1$ and $\xi_2$ are linearly independent. The Discriminant is defined as the square of the different.

See also Discriminant (Module), Equal, Module

References

Cohn, H. Advanced Number Theory. New York: Dover, pp. 72-73, 1980.