Let O_K be a complete discrete valuation ring. Denote by K its fractions field and by k its residue field. Assume that k is of characteristic p>0 and perfect. Breuil gives an anti-equivalence between the category of finite flat O_K-group schemes killed by a power of p and a category of linear algebra objects which is called (Mod/S). The aim of this article is to make explicit the Cartier duality on the category (Mod/S)
Let Gf A be the category of finite dimensional commutative formal == groups over a ring A. To A one ...
International audienceIn this paper we establish a precise comparison between vanishing cycles and t...
AbstractLet R be a discrete valuation ring with residue field of characteristic p>0. Let K be its fr...
Let O_K be a complete discrete valuation ring. Denote by K its fractions field and by k its residue ...
Let R be a discrete valuation ring of characteristic zero with field of fractions K and perfect resi...
For a prime number p>2 we give a direct proof of Breuil's classification of finite flat group scheme...
For a prime number p>2 we give a direct proof of Breuil's classification of finite flat group scheme...
Let R be a discrete valuation ring with residue field of characteristic p>0. Let K be its fraction f...
Let O_K be a discrete valuation ring of mixed characteristics (0,p), with residue field k. Using wor...
An ${\Bbb F}_q[t]$-analogue of the Cartier duality is established. Applications to $π$-divisible gro...
Duality is one of the fundamental concepts in mathematics. The most basic duality is that of linear ...
AbstractLet p be an odd prime, and let OK be the ring of integers in a finite extension K/Qp. Breuil...
This book provides a unified approach to much of the theories of equivalence and duality between cat...
Let R be a ring. We prove that the homotopy category K(R-Proj) is always א1-compactly generated, and...
AbstractIn this paper, we analyze ramification in the sense of Abbes–Saito of a finite flat group sc...
Let Gf A be the category of finite dimensional commutative formal == groups over a ring A. To A one ...
International audienceIn this paper we establish a precise comparison between vanishing cycles and t...
AbstractLet R be a discrete valuation ring with residue field of characteristic p>0. Let K be its fr...
Let O_K be a complete discrete valuation ring. Denote by K its fractions field and by k its residue ...
Let R be a discrete valuation ring of characteristic zero with field of fractions K and perfect resi...
For a prime number p>2 we give a direct proof of Breuil's classification of finite flat group scheme...
For a prime number p>2 we give a direct proof of Breuil's classification of finite flat group scheme...
Let R be a discrete valuation ring with residue field of characteristic p>0. Let K be its fraction f...
Let O_K be a discrete valuation ring of mixed characteristics (0,p), with residue field k. Using wor...
An ${\Bbb F}_q[t]$-analogue of the Cartier duality is established. Applications to $π$-divisible gro...
Duality is one of the fundamental concepts in mathematics. The most basic duality is that of linear ...
AbstractLet p be an odd prime, and let OK be the ring of integers in a finite extension K/Qp. Breuil...
This book provides a unified approach to much of the theories of equivalence and duality between cat...
Let R be a ring. We prove that the homotopy category K(R-Proj) is always א1-compactly generated, and...
AbstractIn this paper, we analyze ramification in the sense of Abbes–Saito of a finite flat group sc...
Let Gf A be the category of finite dimensional commutative formal == groups over a ring A. To A one ...
International audienceIn this paper we establish a precise comparison between vanishing cycles and t...
AbstractLet R be a discrete valuation ring with residue field of characteristic p>0. Let K be its fr...