000 | 01119 a2200241 4500 | ||
---|---|---|---|
999 |
_c51908 _d51908 |
||
008 | 191219b ||||| |||| 00| 0 eng d | ||
020 | _a9783663099925 | ||
082 | _a516.35 HUB | ||
100 | _aHuber, Roland | ||
245 | _aEtale cohomology of rigid analytic varieties and adic spaces | ||
260 |
_bVieweg, _c1996 _aBraunschweig: |
||
300 |
_ax, 450p. _bpb; _c24 cm |
||
365 |
_aEURO _b84.99 |
||
440 | _a Aspects of mathematics; E, 0179-2156: Vol.30 | ||
520 | _aThe aim of this book is to give an introduction to adic spaces and to develop systematically their tale cohomology. First general properties of the tale topos of an adic space are studied, in particular the points and the constructible sheaves of this topos. After this the basic results on the tale cohomology of adic spaces are proved: base change theorems, finiteness, Poincar duality, comparison theorems with the algebraic case. | ||
650 | _aHomology Theory | ||
650 | _aMathematics | ||
650 | _aGeometry, Algebraic | ||
650 | _aAnalytic Spaces | ||
650 | _aCohomology Operations | ||
650 | _aEngineering | ||
942 |
_2ddc _cTD |