A field which is complete with respect to a discrete valuation is called a local field if its field
of residue classes is finite.
The Hasse principle is one of the chief applications
of local field theory. A local field with field
characteristic 
is isomorphic to the field
of power series in one variable whose coefficients are in a finite
field. A local field of characteristic zero is either 
the p-adic numbers,
or power series in a complex variable.
Local Field
See also
Function Field, Global Field, Hasse Principle, Local Class Field Theory, Number Field, p-adic Number, ValuationPortions of this entry contributed by Todd Rowland
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References
Iyanaga, S. and Kawada, Y. (Eds.). "Local Fields." §257 in Encyclopedic Dictionary of Mathematics. Cambridge, MA: MIT Press, pp. 811-815, 1980.Referenced on Wolfram|Alpha
Local FieldCite this as:
Rowland, Todd and Weisstein, Eric W. "Local Field." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/LocalField.html