Matches in DBpedia 2015-10 for { ?s ?p "In mathematics, Vojta's conjecture is a conjecture introduced by Vojta (1987) about heights of points on algebraic varieties over number fields. The conjecture was motivated by an analogy between diophantine approximation and Nevanlinna theory (value distribution theory) in complex analysis. It implies many other conjectures in diophantine approximation theory, diophantine equations, arithmetic geometry, and logic."@en }
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- Vojtas_conjecture abstract "In mathematics, Vojta's conjecture is a conjecture introduced by Vojta (1987) about heights of points on algebraic varieties over number fields. The conjecture was motivated by an analogy between diophantine approximation and Nevanlinna theory (value distribution theory) in complex analysis. It implies many other conjectures in diophantine approximation theory, diophantine equations, arithmetic geometry, and logic.".
- Vojtas_conjecture comment "In mathematics, Vojta's conjecture is a conjecture introduced by Vojta (1987) about heights of points on algebraic varieties over number fields. The conjecture was motivated by an analogy between diophantine approximation and Nevanlinna theory (value distribution theory) in complex analysis. It implies many other conjectures in diophantine approximation theory, diophantine equations, arithmetic geometry, and logic.".