International audienceWe present a probabilistic Las Vegas algorithm for computing the local zeta function of a genus-g hyperelliptic curve defined over F q with explicit real multiplication (RM) by an order $Z[η]$ in a degree-g totally real number field. It is based on the approaches by Schoof and Pila in a more favorable case where we can split the-torsion into g kernels of endomorphisms, as introduced by Gaudry, Kohel, and Smith in genus 2. To deal with these kernels in any genus, we adapt a technique that the author, Gaudry, and Spaenlehauer introduced to model the-torsion by structured polynomial systems. Applying this technique to the kernels, the systems we obtain are much smaller and so is the complexity of solving them. Our main re...
AbstractIn this paper we describe a generalisation and adaptation of Kedlaya’s algorithm for computi...
In this thesis we consider the problem of computing the zeta function and the number of rational poi...
International audienceThe use of (hyper)elliptic curves in cryptography relies on the ability to com...
International audienceWe present a probabilistic Las Vegas algorithm for computing the local zeta fu...
International audienceWe propose a Las Vegas probabilistic algorithm to compute the zeta function of...
We present an algorithm to compute the zeta function of an arbitrary hyperelliptic curve over a fini...
Let E_Gamma be a family of hyperelliptic curves defined by Y^2 = Q(X,Gamma) where Q is defined over ...
Counting points on algebraic curves has drawn a lot of attention due to its many applications from n...
We present an algorithm for computing the zeta function of an arbitrary hyperelliptic curve over a ...
Le comptage de points de courbes algébriques est une primitive essentielle en théorie des nombres, a...
International audienceWe describe an algorithm to compute the cardinality of Jacobians of ordinary h...
Schoof's classic algorithm allows point-counting for elliptic curves over finite fields in polynomia...
The use in cryptography of the group structure on elliptic curves or the jacobians of hyperelliptic ...
Abstract. We present an accelerated Schoof-type point-counting algo-rithm for curves of genus 2 equi...
Abstract. We describe an algorithm to compute the cardinality of Jacobians of ordi-nary hyperellipti...
AbstractIn this paper we describe a generalisation and adaptation of Kedlaya’s algorithm for computi...
In this thesis we consider the problem of computing the zeta function and the number of rational poi...
International audienceThe use of (hyper)elliptic curves in cryptography relies on the ability to com...
International audienceWe present a probabilistic Las Vegas algorithm for computing the local zeta fu...
International audienceWe propose a Las Vegas probabilistic algorithm to compute the zeta function of...
We present an algorithm to compute the zeta function of an arbitrary hyperelliptic curve over a fini...
Let E_Gamma be a family of hyperelliptic curves defined by Y^2 = Q(X,Gamma) where Q is defined over ...
Counting points on algebraic curves has drawn a lot of attention due to its many applications from n...
We present an algorithm for computing the zeta function of an arbitrary hyperelliptic curve over a ...
Le comptage de points de courbes algébriques est une primitive essentielle en théorie des nombres, a...
International audienceWe describe an algorithm to compute the cardinality of Jacobians of ordinary h...
Schoof's classic algorithm allows point-counting for elliptic curves over finite fields in polynomia...
The use in cryptography of the group structure on elliptic curves or the jacobians of hyperelliptic ...
Abstract. We present an accelerated Schoof-type point-counting algo-rithm for curves of genus 2 equi...
Abstract. We describe an algorithm to compute the cardinality of Jacobians of ordi-nary hyperellipti...
AbstractIn this paper we describe a generalisation and adaptation of Kedlaya’s algorithm for computi...
In this thesis we consider the problem of computing the zeta function and the number of rational poi...
International audienceThe use of (hyper)elliptic curves in cryptography relies on the ability to com...