Matches in DBpedia 2016-04 for { ?s ?p "In mathematics, the term global field refers to a field that is either:an algebraic number field, i.e., a finite extension of Q, ora global function field, i.e., the function field of an algebraic curve over a finite field, equivalently, a finite extension of Fq(T), the field of rational functions in one variable over the finite field with q elements.An axiomatic characterization of these fields via valuation theory was given by Emil Artin and George Whaples in the 1940s."@en }
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- Global_field abstract "In mathematics, the term global field refers to a field that is either:an algebraic number field, i.e., a finite extension of Q, ora global function field, i.e., the function field of an algebraic curve over a finite field, equivalently, a finite extension of Fq(T), the field of rational functions in one variable over the finite field with q elements.An axiomatic characterization of these fields via valuation theory was given by Emil Artin and George Whaples in the 1940s.".
- Q1531713 abstract "In mathematics, the term global field refers to a field that is either:an algebraic number field, i.e., a finite extension of Q, ora global function field, i.e., the function field of an algebraic curve over a finite field, equivalently, a finite extension of Fq(T), the field of rational functions in one variable over the finite field with q elements.An axiomatic characterization of these fields via valuation theory was given by Emil Artin and George Whaples in the 1940s.".
- Global_field comment "In mathematics, the term global field refers to a field that is either:an algebraic number field, i.e., a finite extension of Q, ora global function field, i.e., the function field of an algebraic curve over a finite field, equivalently, a finite extension of Fq(T), the field of rational functions in one variable over the finite field with q elements.An axiomatic characterization of these fields via valuation theory was given by Emil Artin and George Whaples in the 1940s.".
- Q1531713 comment "In mathematics, the term global field refers to a field that is either:an algebraic number field, i.e., a finite extension of Q, ora global function field, i.e., the function field of an algebraic curve over a finite field, equivalently, a finite extension of Fq(T), the field of rational functions in one variable over the finite field with q elements.An axiomatic characterization of these fields via valuation theory was given by Emil Artin and George Whaples in the 1940s.".