We present a treatment of the algebraic description of the Jacobian of a generic genus two plane curve which exploits an SL<sub>2</sub>(k) equivariance and clarifies the structure of Flynn’s 72 defining quadratic relations. The treatment is also applied to the Kummer variety
This chapter introduces the main characters of this book — curves and their Jacobians. To this aim w...
This chapter introduces the main characters of this book — curves and their Jacobians. To this aim w...
We show how to efficiently evaluate functions on jacobian varieties and their quo-tients. We deduce ...
Abstract. It was first pointed out by Weil [26] that we can use classical invariant theory to comput...
30 pages; acknoledgements addedWe explicitly construct the algebraic model of affine Jacobian of a g...
We present an explicit model of the Jacobian variety, and give a set of quadratic defining equations...
In this thesis we accomplish four main results related to Jacobians of curves. Firstly, we find a la...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
An algebraic curve is a curve defined over by polynomial equations with coefficients in a given fiel...
In this paper, we study the Jacobian varieties of certain diagonal curves of genus four: we first gi...
An algebraic curve is a curve defined over by polynomial equations with coefficients in a given fiel...
This chapter introduces the main characters of this book — curves and their Jacobians. To this aim w...
This chapter introduces the main characters of this book — curves and their Jacobians. To this aim w...
We show how to efficiently evaluate functions on jacobian varieties and their quo-tients. We deduce ...
Abstract. It was first pointed out by Weil [26] that we can use classical invariant theory to comput...
30 pages; acknoledgements addedWe explicitly construct the algebraic model of affine Jacobian of a g...
We present an explicit model of the Jacobian variety, and give a set of quadratic defining equations...
In this thesis we accomplish four main results related to Jacobians of curves. Firstly, we find a la...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
An algebraic curve is a curve defined over by polynomial equations with coefficients in a given fiel...
In this paper, we study the Jacobian varieties of certain diagonal curves of genus four: we first gi...
An algebraic curve is a curve defined over by polynomial equations with coefficients in a given fiel...
This chapter introduces the main characters of this book — curves and their Jacobians. To this aim w...
This chapter introduces the main characters of this book — curves and their Jacobians. To this aim w...
We show how to efficiently evaluate functions on jacobian varieties and their quo-tients. We deduce ...
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