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- Q2993327 subject Q6248542.
- Q2993327 subject Q8234752.
- Q2993327 abstract "In algebraic number theory, Leopoldt's conjecture, introduced by H.-W. Leopoldt (1962, 1975), states that the p-adic regulator of a number field does not vanish. The p-adic regulator is an analogue of the usual regulator defined using p-adic logarithms instead of the usual logarithms, introduced by H.-W. Leopoldt (1962).Leopoldt proposed a definition of a p-adic regulator Rp attached to K and a prime number p. The definition of Rp uses an appropriate determinant with entries the p-adic logarithm of a generating set of units of K (up to torsion), in the manner of the usual regulator. The conjecture, which for general K is still open as of 2009, then comes out as the statement that Rp is not zero.".
- Q2993327 wikiPageExternalLink 1256059299.
- Q2993327 wikiPageExternalLink purl?GDZPPN002179482.
- Q2993327 wikiPageWikiLink Q1227702.
- Q2993327 wikiPageWikiLink Q1368270.
- Q2993327 wikiPageWikiLink Q1464168.
- Q2993327 wikiPageWikiLink Q181296.
- Q2993327 wikiPageWikiLink Q2997826.
- Q2993327 wikiPageWikiLink Q318705.
- Q2993327 wikiPageWikiLink Q32229.
- Q2993327 wikiPageWikiLink Q3527009.
- Q2993327 wikiPageWikiLink Q49008.
- Q2993327 wikiPageWikiLink Q613048.
- Q2993327 wikiPageWikiLink Q616608.
- Q2993327 wikiPageWikiLink Q6248542.
- Q2993327 wikiPageWikiLink Q625519.
- Q2993327 wikiPageWikiLink Q7116916.
- Q2993327 wikiPageWikiLink Q8234752.
- Q2993327 comment "In algebraic number theory, Leopoldt's conjecture, introduced by H.-W. Leopoldt (1962, 1975), states that the p-adic regulator of a number field does not vanish. The p-adic regulator is an analogue of the usual regulator defined using p-adic logarithms instead of the usual logarithms, introduced by H.-W. Leopoldt (1962).Leopoldt proposed a definition of a p-adic regulator Rp attached to K and a prime number p.".
- Q2993327 label "Leopoldt's conjecture".