Statistics for tag 06Z0
| tag creation | last update | |
|---|---|---|
| Jul 30, 2011 | Jan 21, 2021 | more history |
Complexity measure
| metric | value |
|---|---|
| number of results in proof | 9 |
| number of results used in preliminary results | 248 |
| number of chapters used | 18 |
| number of sections used | 80 |
| number of results (indirectly) using this tag | 1124 |
Tags (directly) using this result
- Lemma 36.3.7
in Section 36.3: Derived category of quasi-coherent modules
(go to statistics) - Lemma 36.3.8
in Section 36.3: Derived category of quasi-coherent modules
(go to statistics) - Lemma 36.3.9
in Section 36.3: Derived category of quasi-coherent modules
(go to statistics) - Lemma 36.5.2
in Section 36.5: Affine morphisms
(go to statistics) - Lemma 36.5.3
in Section 36.5: Affine morphisms
(go to statistics) - Lemma 36.7.3
in Section 36.7: The coherator
(go to statistics) - Proposition 36.9.5
in Section 36.9: Koszul complexes
(go to statistics) - Lemma 36.10.3
in Section 36.10: Pseudo-coherent and perfect complexes
(go to statistics) - Lemma 36.10.4
in Section 36.10: Pseudo-coherent and perfect complexes
(go to statistics) - Lemma 36.10.6
in Section 36.10: Pseudo-coherent and perfect complexes
(go to statistics) - Lemma 36.10.8
in Section 36.10: Pseudo-coherent and perfect complexes
(go to statistics) - Lemma 36.12.2
in Section 36.12: Descent finiteness properties of complexes
(go to statistics) - Lemma 36.12.6
in Section 36.12: Descent finiteness properties of complexes
(go to statistics) - Lemma 36.13.3
in Section 36.13: Lifting complexes
(go to statistics) - Lemma 36.13.4
in Section 36.13: Lifting complexes
(go to statistics) - Lemma 36.13.7
in Section 36.13: Lifting complexes
(go to statistics) - Lemma 36.13.9
in Section 36.13: Lifting complexes
(go to statistics) - Lemma 36.14.4
in Section 36.14: Approximation by perfect complexes
(go to statistics) - Lemma 36.15.2
in Section 36.15: Generating derived categories
(go to statistics) - Theorem 36.15.3
in Section 36.15: Generating derived categories
(go to statistics) - Proposition 36.17.1
in Section 36.17: Compact and perfect objects
(go to statistics) - Lemma 36.21.4
in Section 36.21: The coherator revisited
(go to statistics) - Lemma 36.22.1
in Section 36.22: Cohomology and base change, IV
(go to statistics) - Lemma 36.23.1
in Section 36.23: Künneth formula, II
(go to statistics) - Lemma 36.26.2
in Section 36.26: Cohomology and base change, V
(go to statistics) - Lemma 36.29.2
in Section 36.29: Limits and derived categories
(go to statistics) - Lemma 36.29.3
in Section 36.29: Limits and derived categories
(go to statistics) - Lemma 36.31.1
in Section 36.31: Perfect complexes
(go to statistics) - Lemma 36.31.4
in Section 36.31: Perfect complexes
(go to statistics) - Lemma 36.33.2
in Section 36.33: Other applications
(go to statistics) - Lemma 36.35.3
in Section 36.35: Relatively perfect objects
(go to statistics) - Lemma 36.35.8
in Section 36.35: Relatively perfect objects
(go to statistics) - Lemma 36.38.3
in Section 36.38: K-groups
(go to statistics) - Lemma 36.39.1
in Section 36.39: Determinants of complexes
(go to statistics) - Lemma 36.40.1
in Section 36.40: Detecting Boundedness
(go to statistics) - Lemma 36.40.2
in Section 36.40: Detecting Boundedness
(go to statistics) - Proposition 36.40.5
in Section 36.40: Detecting Boundedness
(go to statistics) - Proposition 36.40.6
in Section 36.40: Detecting Boundedness
(go to statistics) - Lemma 37.13.16
in Section 37.13: The naive cotangent complex
(go to statistics) - Lemma 37.33.5
in Section 37.33: Theorem of the cube
(go to statistics) - Lemma 37.33.6
in Section 37.33: Theorem of the cube
(go to statistics) - Lemma 37.62.15
in Section 37.62: Local complete intersection morphisms
(go to statistics) - Lemma 37.62.16
in Section 37.62: Local complete intersection morphisms
(go to statistics) - Lemma 37.62.17
in Section 37.62: Local complete intersection morphisms
(go to statistics) - Lemma 37.71.1
in Section 37.71: Relatively perfect objects
(go to statistics) - Lemma 37.71.3
in Section 37.71: Relatively perfect objects
(go to statistics) - Lemma 38.29.2
in Section 38.29: Grothendieck's Existence Theorem, V
(go to statistics) - Lemma 38.43.4
in Section 38.43: Blowing up complexes, II
(go to statistics) - Lemma 48.2.1
in Section 48.2: Dualizing complexes on schemes
(go to statistics) - Lemma 48.2.4
in Section 48.2: Dualizing complexes on schemes
(go to statistics) - Lemma 48.6.2
in Section 48.6: Right adjoint of pushforward and base change, II
(go to statistics) - Lemma 48.26.1
in Section 48.26: More on dualizing complexes
(go to statistics) - Lemma 50.13.1
in Section 50.13: Leray-Hirsch type theorems
(go to statistics) - Lemma 51.2.1
in Section 51.2: Generalities
(go to statistics) - Lemma 52.7.2
in Section 52.7: The theorem on formal functions
(go to statistics) - Lemma 59.101.3
in Section 59.101: Comparing fppf and étale topologies: modules
(go to statistics) - Lemma 75.13.9
in Section 75.13: Pseudo-coherent and perfect complexes
(go to statistics) - Theorem 75.15.4
in Section 75.15: Generating derived categories
(go to statistics) - Lemma 75.20.1
in Section 75.20: Cohomology and base change, IV
(go to statistics) - Lemma 76.54.5
in Section 76.54: Descent of finiteness properties of complexes
(go to statistics) - Lemma 77.13.2
in Section 77.13: Grothendieck's Existence Theorem, bis
(go to statistics) - Lemma 81.8.1
in Section 81.8: Pushouts and derived categories
(go to statistics) - Lemma 81.10.4
in Section 81.10: Formal glueing of quasi-coherent modules
(go to statistics) - Lemma 84.7.4
in Section 84.7: Comparing fppf and étale topologies: modules
(go to statistics) - Lemma 86.2.3
in Section 86.2: Dualizing complexes on algebraic spaces
(go to statistics) - Lemma 86.5.1
in Section 86.5: Right adjoint of pushforward and base change, II
(go to statistics) - Lemma 96.26.3
in Section 96.26: Quasi-coherent objects in the derived category
(go to statistics) - Lemma 99.3.8
in Section 99.3: The Hom functor
(go to statistics)