AbstractWe give formulas for the genera of all the possible quotient of a Fermat curve by a group of automorphisms in characteristic zero and for many classes of quotient curves also in positive characteristic. We use those results for giving evidence to the conjecture that, in any fixed positive characteristic, there should exist supersingular curves for any genus
AbstractWe explicitly identify infinitely many curves which are quotients of Fermat curves. We show ...
The Dickson–Guralnick–Zieve curve, briefly DGZ curve, defined over the finite field Fq arises natura...
In his paper, The group of automorphisms of the Fermat curve (see [7]), Tzermias proved that the aut...
We give formulas for the genera of all the possible quotient of a Fermat curve by a group of automor...
AbstractWe give formulas for the genera of all the possible quotient of a Fermat curve by a group of...
AbstractIn this article we provide a characterization of maximal and minimal Fermat curves using the...
AbstractIn his paper ("Oevres Scientifiques, Collected Papers, Vol. III, pp. 329-342, Springer-Verla...
I investigate the $K_2$ groups of the quotients of Fermat curves given in projective coordinates by ...
Tafazolian (IMPA at Rio de Janeiro) More than half a century ago, Andre ́ Weil proved a formula for ...
The structure of thep-divisible groups arising from Fermat curves over finite fields of characterist...
We introduce and study a new way to catagorize supersingular abelian varieties defined over a finite...
AbstractWe determine the isogeny classes of supersingular abelian threefolds over F2n containing the...
We explicitly identify infinitely many curves which are quotients of Fermat curves. We show that som...
In this article, we characterize the genera of those quotient curves Hq/G of the Fqjavax.xml.bind.JA...
I give a sufficient condition for the action of a group on an algebraic curve defined over (Q) over ...
AbstractWe explicitly identify infinitely many curves which are quotients of Fermat curves. We show ...
The Dickson–Guralnick–Zieve curve, briefly DGZ curve, defined over the finite field Fq arises natura...
In his paper, The group of automorphisms of the Fermat curve (see [7]), Tzermias proved that the aut...
We give formulas for the genera of all the possible quotient of a Fermat curve by a group of automor...
AbstractWe give formulas for the genera of all the possible quotient of a Fermat curve by a group of...
AbstractIn this article we provide a characterization of maximal and minimal Fermat curves using the...
AbstractIn his paper ("Oevres Scientifiques, Collected Papers, Vol. III, pp. 329-342, Springer-Verla...
I investigate the $K_2$ groups of the quotients of Fermat curves given in projective coordinates by ...
Tafazolian (IMPA at Rio de Janeiro) More than half a century ago, Andre ́ Weil proved a formula for ...
The structure of thep-divisible groups arising from Fermat curves over finite fields of characterist...
We introduce and study a new way to catagorize supersingular abelian varieties defined over a finite...
AbstractWe determine the isogeny classes of supersingular abelian threefolds over F2n containing the...
We explicitly identify infinitely many curves which are quotients of Fermat curves. We show that som...
In this article, we characterize the genera of those quotient curves Hq/G of the Fqjavax.xml.bind.JA...
I give a sufficient condition for the action of a group on an algebraic curve defined over (Q) over ...
AbstractWe explicitly identify infinitely many curves which are quotients of Fermat curves. We show ...
The Dickson–Guralnick–Zieve curve, briefly DGZ curve, defined over the finite field Fq arises natura...
In his paper, The group of automorphisms of the Fermat curve (see [7]), Tzermias proved that the aut...
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