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Representation gap for transition factors from social sciences in energy and emissions modeling

Kunnas S, Trutnevyte E.
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Rationalizing Focal Points

Theory and Decision, 2001
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Rational Singularities and Rational Points

2006
12 ...
Blickle, Manuel, Esnault, H��l��ne   +1 more
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Rational Points on the Sphere

The Ramanujan Journal, 2003
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Irreducible Subvarieties and Rational Points

American Journal of Mathematics, 1965
fields." In this paper we prove this conjecture by elementary considerations of algebraic geometry. Given an algebraic set V defined over a field k (always assumed to be perfect), we consider the set of all subvarieties (absolutely irreducible) of V which are defined over k.
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POINT RATIONING

Bulletin of the Oxford University Institute of Economics & Statistics, 1941
F. BURCHARDT., G. D. N. WORSWICK.
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Rational Points; Finite Fields

2020
Finite fields play an essential role in the study of rational solutions of equations. In this chapter we study Galois actions, in order to define correctly the arithmetic notions of point and k-rational variety, which we illustrate in particular in the case of finite fields.
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Rational points on curves

2005
Abstract This chapter is concerned with the identiFB01cation of integer points and rational points on curves of degree two and three. Elliptic curves have been studied extensively throughout the twentieth century and they are at the centre of a deep and profound theory.
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Rational Points

1991
M. A. Tsfasman, S. G. Vlăduţ
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