This extension field is now known as the Hilbert class field.
2.
Let be a field and an-dimensional extension field of.
3.
These are numbers lying in an extension field of.
4.
This field of rational functions is an extension field of " K ".
5.
These extension fields are tab separated " key : value " pairs, documented in the ctags manual.
6.
An extension field is constructed from an underlying prime field ( the base field ) using an irreducible polynomial over the field.
7.
Then the question is this : is there a Galois extension field such that the Galois group of the extension is isomorphic to?
8.
The TCP header contains 10 mandatory fields, and an optional extension field ( " Options ", pink background in table ).
9.
This is an extension field " L " of " K " in which the given polynomial splits into a product of linear factors.
10.
There is an analogy between extensions of association schemes and field \ mathbb { F }, while the extension scheme corresponds to the extension field obtained as a quotient.
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