Arithmetic and diophantine properties of elliptic curves with complex multiplication
Research output: Book/Report › Ph.D. thesis › Research
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Arithmetic and diophantine properties of elliptic curves with complex multiplication. / Campagna, Francesco.
Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2021. 169 p.Research output: Book/Report › Ph.D. thesis › Research
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TY - BOOK
T1 - Arithmetic and diophantine properties of elliptic curves with complex multiplication
AU - Campagna, Francesco
PY - 2021
Y1 - 2021
N2 - In this thesis we consider elliptic curves with complex multiplication from three different angles:diophantine, algebraic and arithmetic statistical.•Diophantine point of view: We study certain integrality properties of singular moduli i.e. of j-invariants of elliptic curves with complex multiplication. We prove various effective finiteness statements concerning differences of singular moduli that are S-units (Chapter 2).•Algebraic point of view: For every CM elliptic curve E defined over a number field F, we analyze the Galois representation associated to the action of the absolute Galois group of F on the torsion points of E. This includes an investigation of the entanglement in the family of p∞-division fields of E for p prime (Chapter 3 and Chapter 4).•Arithmetic statistical point of view: Given an elliptic curve E over a number field F, we look at the density of the set of primes p ⊆ F of good reduction for which the point group on the reduced elliptic curve E mod p is cyclic. We detail both the CM and the non-CM case, outlining differences and similarities (Chapter 5). Some of the material contained in the thesis has been used to write the following manuscripts: [Cam21b], [CS19], [CP21] and [Cam21a]. The article [CS19] has been written in collaboration with Peter Stevenhagen while the article [CP21] has been written in collaboration with Riccardo Pengo.
AB - In this thesis we consider elliptic curves with complex multiplication from three different angles:diophantine, algebraic and arithmetic statistical.•Diophantine point of view: We study certain integrality properties of singular moduli i.e. of j-invariants of elliptic curves with complex multiplication. We prove various effective finiteness statements concerning differences of singular moduli that are S-units (Chapter 2).•Algebraic point of view: For every CM elliptic curve E defined over a number field F, we analyze the Galois representation associated to the action of the absolute Galois group of F on the torsion points of E. This includes an investigation of the entanglement in the family of p∞-division fields of E for p prime (Chapter 3 and Chapter 4).•Arithmetic statistical point of view: Given an elliptic curve E over a number field F, we look at the density of the set of primes p ⊆ F of good reduction for which the point group on the reduced elliptic curve E mod p is cyclic. We detail both the CM and the non-CM case, outlining differences and similarities (Chapter 5). Some of the material contained in the thesis has been used to write the following manuscripts: [Cam21b], [CS19], [CP21] and [Cam21a]. The article [CS19] has been written in collaboration with Peter Stevenhagen while the article [CP21] has been written in collaboration with Riccardo Pengo.
M3 - Ph.D. thesis
BT - Arithmetic and diophantine properties of elliptic curves with complex multiplication
PB - Department of Mathematical Sciences, Faculty of Science, University of Copenhagen
ER -
ID: 283756076