The unipotent Albanese map and Selmer varieties for curves

Geometric quadratic Chabauty over number fields ⋮ Quadratic Chabauty and 𝑝-adic Gross–Zagier ⋮ Homotopic and geometric Galois theory. Abstracts from the workshop held March 7--13, 2021 (online meeting) ⋮ Quadratic Chabauty: \(p\)-adic heights and integral points on hyperelliptic curves ⋮ Quadratic Chabauty and Rational Points II: Generalised Height Functions on Selmer Varieties ⋮ Afterword to the article “Arithmetic on curves” ⋮ A control theorem for the torsion Selmer pointed set ⋮ Explicit Chabauty-Kim theory for the thrice punctured line in depth 2 ⋮ Fundamental groups and Diophantine geometry ⋮ Explicit Vologodsky integration for hyperelliptic curves ⋮ Explicit two-cover descent for genus 2 curves ⋮ Quadratic Chabauty for modular curves: algorithms and examples ⋮ M_{0, 5}: Toward the Chabauty–Kim method in higher dimensions ⋮ Local constancy of pro‐unipotent Kummer maps ⋮ Geometric quadratic Chabauty and \(p\)-adic heights ⋮ Rational points on \(X_0^+(125)\) ⋮ Weight filtrations on Selmer schemes and the effective Chabauty–Kim method ⋮ Tangential localization for Selmer varieties ⋮ Selmer varieties for curves with CM Jacobians ⋮ Quadratic Chabauty for Atkin–Lehner quotients of modular curves of prime level and genus 4, 5, 6 ⋮ Mixed Tate motives and the unit equation. II ⋮ Relative fundamental groups and rational points ⋮ Reverse engineered Diophantine equations ⋮ Refined Selmer equations for the thrice-punctured line in depth two ⋮ Explicit methods in number theory. Abstracts from the workshop held July 18--24, 2021 (hybrid meeting) ⋮ Explicit Coleman integration for curves ⋮ Rational motivic path spaces and Kim's relative unipotent Section conjecture ⋮ Computation of the unipotent Albanese map on elliptic and hyperelliptic curves ⋮ Quadratic Chabauty for (bi)elliptic curves and Kim's conjecture ⋮ An effective Chabauty–Kim theorem ⋮ Quadratic points on modular curves with infinite Mordell–Weil group ⋮ A $p$-adic approach to rational points on curves ⋮ Functional transcendence for the unipotent Albanese map ⋮ Rational points of universal curves ⋮ The Bar Construction and Affine Stacks ⋮ Massey products for elliptic curves of rank 1 ⋮ Explicit Coleman Integration for Hyperelliptic Curves ⋮ \(p\)-adic \(L\)-functions and Selmer varieties associated to elliptic curves with complex multiplication ⋮ A non-abelian conjecture of Tate-Shafarevich type for hyperbolic curves ⋮ Quadratic Chabauty and rational points. I: \(p\)-adic heights ⋮ Quadratic Chabauty for modular curves and modular forms of rank one ⋮ Morphisms of rational motivic homotopy types ⋮ Height functions for motives. II ⋮ Explicit quadratic Chabauty over number fields ⋮ The polylog quotient and the Goncharov quotient in computational Chabauty–Kim Theory I ⋮ Explicit Chabauty-Kim for the split Cartan modular curve of level 13 ⋮ Remarks on non-abelian cohomology of proalgebraic groups ⋮ Diophantine problems and \(p\)-adic period mappings ⋮ On the proportion of locally soluble superelliptic curves ⋮ Two Recent p-adic Approaches Towards the (Effective) Mordell Conjecture ⋮ Diophantine Geometry and Non-abelian Reciprocity Laws I

• Realizations of polylogarithms
• On certain types of \(p\)-adic representations of the Galois group of a local field; construction of a Barsott-Tate ring.
• Effective Chabauty
• Unipotent variations of mixed Hodge structure
• The de Rham homotopy theory of complex algebraic varieties. I
• Continuous étale cohomology
• On the structure of certain Galois groups
• Finiteness and cohomological purity in rigid cohomology (with an appendix by Aise Johan de Jong)
• Fine Selmer groups of elliptic curves over \(p\)-adic Lie extensions
• \(p\)-adic multiple zeta values. I: \(p\)-adic multiple polylogarithms and the \(p\)-adic KZ equation
• Division points on curves
• Good reduction of abelian varieties
• On the descending central series of groups with a single defining relation
• The motivic fundamental group of \(\mathbf P^1\setminus\{0,1,\infty\}\) and the theorem of Siegel
• Towards non–abelian 𝑝–adic Hodge theory in the good reduction case
• Iterated path integrals
• The monodromy pairing.
• Coleman integration using the Tannakian formalism
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