Heights and Arakelov's Intersection Theory

Numerical equivalence of \(\mathbb{R} \)-divisors and Shioda-Tate formula for arithmetic varieties, Inequality of Bogomolov-Gieseker type on arithmetic surfaces, An arithmetic Hurwitz formula, SPECIAL VALUES OF THE ZETA FUNCTION OF AN ARITHMETIC SURFACE, Line bundles on arithmetic surfaces and intersection theory, Computing Néron-Tate heights of points on hyperelliptic Jacobians, VALUES OF ZETA FUNCTIONS OF ARITHMETIC SURFACES AT, Toward Dirichlet's unit theorem on arithmetic varieties, Correspondences in Arakelov geometry and applications to the case of Hecke operators on modular curves, On isoperimetric inequality in Arakelov geometry, On the global distance between two algebraic points on a curve., Unnamed Item, Arithmetic intersection theory, Numerical characterization of nef arithmetic divisors on arithmetic surfaces, The arithmetic Hodge index theorem and rigidity of dynamical systems over function fields, Problème de Lehmer sur les courbes elliptiques à multiplications complexes, Hodge index inequality in geometry and arithmetic: a probabilistic approach, The arithmetic Hodge index theorem for adelic line bundles, Unitary cycles on Shimura curves and the Shimura lift II, The dynamical Manin–Mumford conjecture and the dynamical Bogomolov conjecture for endomorphisms of, A $p$-adic analogue of the conjecture of Birch and Swinnerton-Dyer for modular abelian varieties, Valuations, intersections and Belyi functions--some remarks on the construction of heights, Continuity of volumes on arithmetic varieties, Explicit arithmetic intersection theory and computation of Néron-Tate heights, Unnamed Item, A relation between standard conjectures and their arithmetic analogues, Unnamed Item, Lower bounds on the arithmetic self-intersection number of the relative dualizing sheaf on arithmetic surfaces, Standard conjectures for the arithmetic Grassmannian \(G(2,N)\) and Racah polynomials., Computing canonical heights using arithmetic intersection theory, Néron-Tate heights of cycles on jacobians, A vanishing theorem on arithmetic surfaces, Potential theory and Lefschetz theorems for arithmetic surfaces