John Voight Computing Classical Modular

Media Summary: Abstract: Birch gave an extremely efficient algorithm to Elliptic curves lie at the intersection of many areas of mathematics and remain central to modern number theory. The rank of an ... Talk given an the Clay Math Institute "Sage Days 53:

John Voight Computing Classical Modular - Detailed Analysis & Overview

Abstract: Birch gave an extremely efficient algorithm to Elliptic curves lie at the intersection of many areas of mathematics and remain central to modern number theory. The rank of an ... Talk given an the Clay Math Institute "Sage Days 53: Computational methods for modular and Shimura curves (John Voight) - Part 6 of 8

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John Voight: Computing classical modular forms as orthogonal modular forms

“Computational methods for modular and Shimura curves,” by John Voight (Part 1 of 8)

John Voight: Ranks of Elliptic Curves (October 17, 2025)

John Voight: Computing zeta Functions of Nondegenerate Hypersurfaces With Few Monomials

“Computational methods for modular and Shimura curves,” by John Voight (Part 2 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 4 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 3 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 5 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 7 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 6 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 8 of 8)

Computational methods for modular and Shimura curves (John Voight) - Part 6 of 8

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John Voight: Computing classical modular forms as orthogonal modular forms

John Voight: Computing classical modular forms as orthogonal modular forms

Abstract: Birch gave an extremely efficient algorithm to

“Computational methods for modular and Shimura curves,” by John Voight (Part 1 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 1 of 8)

Computational

John Voight: Ranks of Elliptic Curves (October 17, 2025)

John Voight: Ranks of Elliptic Curves (October 17, 2025)

Elliptic curves lie at the intersection of many areas of mathematics and remain central to modern number theory. The rank of an ...

John Voight: Computing zeta Functions of Nondegenerate Hypersurfaces With Few Monomials

John Voight: Computing zeta Functions of Nondegenerate Hypersurfaces With Few Monomials

Talk given an the Clay Math Institute "Sage Days 53:

“Computational methods for modular and Shimura curves,” by John Voight (Part 2 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 2 of 8)

Computational

“Computational methods for modular and Shimura curves,” by John Voight (Part 4 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 4 of 8)

Computational

“Computational methods for modular and Shimura curves,” by John Voight (Part 3 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 3 of 8)

Computational

“Computational methods for modular and Shimura curves,” by John Voight (Part 5 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 5 of 8)

Computational

“Computational methods for modular and Shimura curves,” by John Voight (Part 7 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 7 of 8)

Computational

“Computational methods for modular and Shimura curves,” by John Voight (Part 6 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 6 of 8)

Computational

“Computational methods for modular and Shimura curves,” by John Voight (Part 8 of 8)

“Computational methods for modular and Shimura curves,” by John Voight (Part 8 of 8)

Computational

Computational methods for modular and Shimura curves (John Voight) - Part 6 of 8

Computational methods for modular and Shimura curves (John Voight) - Part 6 of 8

Computational methods for modular and Shimura curves (John Voight) - Part 6 of 8

John Voight - Effective methods in inverse Galois theory

John Voight - Effective methods in inverse Galois theory

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