Module Discriminant
TOPICS
Let a module 
in an integral domain 
for 
be expressed using a two-element basis as
![M=[xi_1,xi_2],](https://mathworld.wolfram.com/images/equations/ModuleDiscriminant/NumberedEquation1.svg){kind=small}
where 
and 
are in 
.
Then the different of the module
is defined as
and the discriminant is defined as the square of the different (Cohn 1980).
For imaginary quadratic fields 
(with 
), the discriminants are given in the following table.
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The discriminants of real quadratic fields 
(
) are given in the following table.
| 2 |  | 34 |  | 67 |  |
| 3 |  | 35 |  | 69 |  |
| 5 | 5 | 37 | 37 | 70 |  |
| 6 |  | 38 |  | 71 |  |
| 7 |  | 39 |  | 73 | 73 |
| 10 |  | 41 | 41 | 74 |  |
| 11 |  | 42 |  | 77 |  |
| 13 | 13 | 43 |  | 78 |  |
| 14 |  | 46 |  | 79 |  |
| 15 |  | 47 |  | 82 |  |
| 17 | 17 | 51 |  | 83 |  |
| 19 |  | 53 | 53 | 85 |  |
| 21 |  | 55 |  | 86 |  |
| 22 |  | 57 |  | 87 |  |
| 23 |  | 58 |  | 89 | 89 |
| 26 |  | 59 |  | 91 |  |
| 29 | 29 | 61 | 61 | 93 |  |
| 30 |  | 62 |  | 94 |  |
| 31 |  | 65 |  | 95 |  |
| 33 |  | 66 |  | 97 | 97 |
See also
Different, Fundamental Discriminant, Module
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References
Cohn, H. Advanced Number Theory. New York: Dover, pp. 72-73 and 261-274, 1980.
Referenced on Wolfram|Alpha
Cite this as:
Weisstein, Eric W. "Module Discriminant." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/ModuleDiscriminant.html