AbstractWe discuss the asymptotic behaviour of the genus and the number of rational places in towers of function fields over a finite field
We introduce the notion of the dual tower of a recursive tower of function fields over a finite fiel...
For a function field F/F-l over a finite field of cardinality l, denote by g(F) (resp. N(F)) the gen...
AbstractFor an algebraic curve X over the finite field Fq, we denote by N(X) and g(X) the number of ...
We discuss the asymptotic behaviour of the genus and the number of rational places in towers of func...
For a tower F 1 ⊆ F 2 ⊆ ⋯ of algebraic function fields F i/F q, define λ := lim i→∞ N(F i)/g(F i), w...
AbstractWe discuss the asymptotic behaviour of the genus and the number of rational places in towers...
Over any quadratic finite field we construct function fields of large genus that have simultaneo...
Over any quadratic finite field we construct function fields of large genus that have simultaneo...
We construct Galois towers with good asymptotic properties over any non-prime finite field Fℓ; that ...
This is a thesis in Algebraic Number Theory, concerned with the study of bounds for the Ihara functi...
This is a thesis in Algebraic Number Theory, concerned with the study of bounds for the Ihara functi...
AbstractFor a towerF1⊆F2⊆ ··· of algebraic function fieldsFi/Fq, define λ = limi→∞N(Fi)/g(Fi), where...
We consider a tower of function fields F = (Fn)n≥0 over a finite field Fq and a finite extension E/F...
For a tower F 1 ⊆ F 2 ⊆ ⋯ of algebraic function fields F i/F q, define τ := lim i→∞ N(F i)/g(F i), w...
En esta Tesis obtenemos resultados estructurales generales sobre el comportamiento asintótico de suc...
We introduce the notion of the dual tower of a recursive tower of function fields over a finite fiel...
For a function field F/F-l over a finite field of cardinality l, denote by g(F) (resp. N(F)) the gen...
AbstractFor an algebraic curve X over the finite field Fq, we denote by N(X) and g(X) the number of ...
We discuss the asymptotic behaviour of the genus and the number of rational places in towers of func...
For a tower F 1 ⊆ F 2 ⊆ ⋯ of algebraic function fields F i/F q, define λ := lim i→∞ N(F i)/g(F i), w...
AbstractWe discuss the asymptotic behaviour of the genus and the number of rational places in towers...
Over any quadratic finite field we construct function fields of large genus that have simultaneo...
Over any quadratic finite field we construct function fields of large genus that have simultaneo...
We construct Galois towers with good asymptotic properties over any non-prime finite field Fℓ; that ...
This is a thesis in Algebraic Number Theory, concerned with the study of bounds for the Ihara functi...
This is a thesis in Algebraic Number Theory, concerned with the study of bounds for the Ihara functi...
AbstractFor a towerF1⊆F2⊆ ··· of algebraic function fieldsFi/Fq, define λ = limi→∞N(Fi)/g(Fi), where...
We consider a tower of function fields F = (Fn)n≥0 over a finite field Fq and a finite extension E/F...
For a tower F 1 ⊆ F 2 ⊆ ⋯ of algebraic function fields F i/F q, define τ := lim i→∞ N(F i)/g(F i), w...
En esta Tesis obtenemos resultados estructurales generales sobre el comportamiento asintótico de suc...
We introduce the notion of the dual tower of a recursive tower of function fields over a finite fiel...
For a function field F/F-l over a finite field of cardinality l, denote by g(F) (resp. N(F)) the gen...
AbstractFor an algebraic curve X over the finite field Fq, we denote by N(X) and g(X) the number of ...
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