Your search keyword '"Matthew Bisatt"' showing total 3 results

1. Tame torsion, the tame inverse Galois problem, and endomorphisms

Author

Matthew Bisatt

Subjects

Pure mathematics, Endomorphism, Mathematics - Number Theory, Inverse Galois problem, General Mathematics, Mathematics::Number Theory, Galois group, 11G15, 11G30, 12F12, symbols.namesake, Jacobian matrix and determinant, symbols, Torsion (algebra), FOS: Mathematics, Number Theory (math.NT), Endomorphism ring, Symplectic geometry, Mathematics

Abstract

Fix a positive integer $g$ and rational prime $p$. We prove the existence of a genus $g$ curve $C/\mathbb{Q}$ such that the mod $p$ representation of its Jacobian is tame by imposing conditions on the endomorphism ring. As an application, we consider the tame inverse Galois problem and are able to realise general symplectic groups as Galois groups of tame extensions of $\mathbb{Q}$., Comment: v2: Expanded to include application to tame inverse Galois problem. To appear in Manuscripta Mathematica

Published

2020

2. Tame torsion and the tame inverse Galois problem

Author

Matthew Bisatt and Tim Dokchitser

Subjects

Pure mathematics, Mathematics - Number Theory, Inverse Galois problem, General Mathematics, Mathematics::Number Theory, 010102 general mathematics, 010103 numerical & computational mathematics, Square-free integer, 01 natural sciences, Symplectic matrix, symbols.namesake, Finite field, Mathematics::Algebraic Geometry, Integer, Genus (mathematics), Jacobian matrix and determinant, Torsion (algebra), symbols, FOS: Mathematics, Number Theory (math.NT), 0101 mathematics, Mathematics, 11G30, 14G22

Abstract

Fix a positive integer g and a squarefree integer m. We prove the existence of a genus g curve $$C/{\mathbb {Q}}$$ C / Q such that the mod m representation of its Jacobian is tame. The method is to analyse the period matrices of hyperelliptic Mumford curves, which could be of independent interest. As an application, we study the tame version of the inverse Galois problem for symplectic matrix groups over finite fields.

Published

2019

3. Explicit root numbers of abelian varieties

Author

Matthew Bisatt

Subjects

Computer Science::Machine Learning, Abelian variety, Pure mathematics, Mathematics - Number Theory, Explicit formulae, Applied Mathematics, General Mathematics, 010102 general mathematics, Twists of curves, Computer Science::Digital Libraries, 01 natural sciences, Elliptic curve, Computer Science::Mathematical Software, FOS: Mathematics, Number Theory (math.NT), 0101 mathematics, Algebraic number, Abelian group, Hyperelliptic curve, Global field, Mathematics

Abstract

The Birch and Swinnerton-Dyer conjecture predicts that the parity of the algebraic rank of an abelian variety over a global field should be controlled by the expected sign of the functional equation of its $L$-function, known as the global root number. In this paper, we give explicit formulae for the local root numbers as a product of Jacobi symbols. This enables one to compute the global root number, generalising work of Rohrlich who studies the case of elliptic curves. We provide similar formulae for the root numbers after twisting the abelian variety by a self-dual Artin representation. As an application, we find a rational genus two hyperelliptic curve with a simple Jacobian whose root number is invariant under quadratic twist., Comment: Corrected formulation of Theorem 7.4; to appear in Transactions of the AMS

Published

2019