AbstractWe show he ordinary locus of X0(pn)(Cp) is normally the set of Cp-valued points on 2n affinoids which correspond to components of the stable model of X0(pn). We then show the points on Edixhoven's “horizontal” components of X0(p2) correspond to elliptic curves which are p-isogenous to curves which Buzzard calls “too supersingular.
AbstractLet X0(ℓ) be the modular curve, parameterizing cyclic isogenies of degree ℓ, and Z0(ℓ) be it...
AbstractLet S2 be the p-primary second Morava stabilizer group, C a supersingular elliptic curve ove...
AbstractWe analyze the geometry of rational p-division points in degenerating families of elliptic c...
Abstract: We show he ordinary locus of X0(p n)(Cp) is normally the set of Cp-valued points on 2n aff...
AbstractWe show he ordinary locus of X0(pn)(Cp) is normally the set of Cp-valued points on 2n affino...
AbstractLet f:C→B be a smoothing of a stable curve C and Sf∗ be the moduli space of theta characteri...
We determine the stable models of the modular curves X0(p 3) for primes p ≥ 13. An essential ingredi...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/47942/1/10231_2003_Article_94.pd
We give a description of the formal neighborhoods of the components of the boundary divisor in the D...
Here we study the Brill–Noether theory of “extremal” Cornalba’s theta-characteristics on stable curv...
Abstract. In this paper, we explore the geometry of the modular curves X0(p n), over Cp in a few non...
Given a Galois cover $Y \to X$ of smooth projective geometrically connected curves over a complete d...
AbstractThis paper studies the stable reduction of p-cyclic covers X→PK1 of the projective line over...
Modular curves of the form X0(N) are intrinsically interesting curves to investigate. They contain a...
AbstractFor small odd primes p, we prove that most of the rational points on the modular curve X0(p)...
AbstractLet X0(ℓ) be the modular curve, parameterizing cyclic isogenies of degree ℓ, and Z0(ℓ) be it...
AbstractLet S2 be the p-primary second Morava stabilizer group, C a supersingular elliptic curve ove...
AbstractWe analyze the geometry of rational p-division points in degenerating families of elliptic c...
Abstract: We show he ordinary locus of X0(p n)(Cp) is normally the set of Cp-valued points on 2n aff...
AbstractWe show he ordinary locus of X0(pn)(Cp) is normally the set of Cp-valued points on 2n affino...
AbstractLet f:C→B be a smoothing of a stable curve C and Sf∗ be the moduli space of theta characteri...
We determine the stable models of the modular curves X0(p 3) for primes p ≥ 13. An essential ingredi...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/47942/1/10231_2003_Article_94.pd
We give a description of the formal neighborhoods of the components of the boundary divisor in the D...
Here we study the Brill–Noether theory of “extremal” Cornalba’s theta-characteristics on stable curv...
Abstract. In this paper, we explore the geometry of the modular curves X0(p n), over Cp in a few non...
Given a Galois cover $Y \to X$ of smooth projective geometrically connected curves over a complete d...
AbstractThis paper studies the stable reduction of p-cyclic covers X→PK1 of the projective line over...
Modular curves of the form X0(N) are intrinsically interesting curves to investigate. They contain a...
AbstractFor small odd primes p, we prove that most of the rational points on the modular curve X0(p)...
AbstractLet X0(ℓ) be the modular curve, parameterizing cyclic isogenies of degree ℓ, and Z0(ℓ) be it...
AbstractLet S2 be the p-primary second Morava stabilizer group, C a supersingular elliptic curve ove...
AbstractWe analyze the geometry of rational p-division points in degenerating families of elliptic c...
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