18. Fibre products of schemes The main result of this section is
... ψi : Ui −→ X, whose images cover X, such that fi = f ◦ ψi : Ui −→ Y and ψi |Uij = ψj ◦ φij : Uij −→ Y . X is unique, up to unique isomorphism, with these properties. We prove (18.2) in two steps (one of which can be further broken down into two substeps): • Construct the scheme X. • Construct the mo ...
... ψi : Ui −→ X, whose images cover X, such that fi = f ◦ ψi : Ui −→ Y and ψi |Uij = ψj ◦ φij : Uij −→ Y . X is unique, up to unique isomorphism, with these properties. We prove (18.2) in two steps (one of which can be further broken down into two substeps): • Construct the scheme X. • Construct the mo ...
A NEW PROOF OF E. CARTAN`S THEOREM ON
... In this paper there will be given a more direct proof which eliminates the use of symmetric Riemannian spaces. The author wishes to acknowledge his debt to Professor C. Che valley who suggested in an oral communication Lemma 1.4 below and to whom a proof of Theorem 1, essentially the same as the one ...
... In this paper there will be given a more direct proof which eliminates the use of symmetric Riemannian spaces. The author wishes to acknowledge his debt to Professor C. Che valley who suggested in an oral communication Lemma 1.4 below and to whom a proof of Theorem 1, essentially the same as the one ...
