Abstract
It is shown that every locally compact, disconnected nearfield (F,τ) possesses a non-archimedean, discrete valuation | |, which induces τ. The valuation nearring R of | | only has one maximal ideal P, and the quotient group R/P is finite. If the kernel K of F is infinite and if E is an infinite subfield of K, then R/P may be considered as a right vector space over the residue field of (E, | |). Based on this assumption the ramification index and the residual degree are introduced and studied.
Originalsprache | Deutsch |
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Seiten (von - bis) | 194-201 |
Seitenumfang | 8 |
Fachzeitschrift | Journal of Geometry |
Jahrgang | 31 |
Ausgabenummer | 1-2 |
DOIs | |
Publikationsstatus | Veröffentlicht - Apr. 1988 |