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Eric Rowland (talk | contribs) Undid revision 1050111173 by 181.65.252.123 (talk) keep notation consistent |
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The power series
:<math>\
converges for ''x'' in '''C'''<sub>''p''</sub> satisfying |''x''|<sub>''p''</sub> < 1 and so defines the '''''p''-adic logarithm function''' log<sub>''p''</sub>(''z'') for |''z'' − 1|<sub>''p''</sub> < 1 satisfying the usual property log<sub>''p''</sub>(''zw'') = log<sub>''p''</sub>''z'' + log<sub>''p''</sub>''w''. The function log<sub>''p''</sub> can be extended to all of {{SubSup|'''C'''|''p''|×}} (the set of nonzero elements of '''C'''<sub>''p''</sub>) by imposing that it continues to satisfy this last property and setting log<sub>''p''</sub>(''p'') = 0. Specifically, every element ''w'' of {{SubSup|'''C'''|''p''|×}} can be written as ''w'' = ''p<sup>r</sup>''·ζ·''z'' with ''r'' a rational number, ζ a root of unity, and |''z'' − 1|<sub>''p''</sub> < 1,<ref>{{harvnb|Cohen|2007|loc=Proposition 4.4.44}}</ref> in which case log<sub>''p''</sub>(''w'') = log<sub>''p''</sub>(''z'').<ref>In factoring ''w'' as above, there is a choice of a root involved in writing ''p<sup>r</sup>'' since ''r'' is rational; however, different choices differ only by multiplication by a root of unity, which gets absorbed into the factor ζ.</ref> This function on {{SubSup|'''C'''|''p''|×}} is sometimes called the '''Iwasawa logarithm''' to emphasize the choice of log<sub>''p''</sub>(''p'') = 0. In fact, there is an extension of the logarithm from |''z'' − 1|<sub>''p''</sub> < 1 to all of {{SubSup|'''C'''|''p''|×}} for each choice of log<sub>''p''</sub>(''p'') in '''C'''<sub>''p''</sub>.<ref>{{harvnb|Cohen|2007|loc=§4.4.11}}</ref>
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