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Nagata submaximal curves on ℙ¹ × ℙ¹

Wioletta Syzdek (2003)

Annales Polonici Mathematici

The aim of this paper is to show that on ℙ¹ × ℙ¹ with a polarization of type (2,1) there are no R-R expected submaximal curves through any 10 ≤ r ≤ 15 points.

Naive boundary strata and nilpotent orbits

Matt Kerr, Gregory Pearlstein (2014)

Annales de l’institut Fourier

We give a Hodge-theoretic parametrization of certain real Lie group orbits in the compact dual of a Mumford-Tate domain, and characterize the orbits which contain a naive limit Hodge filtration. A series of examples are worked out for the groups $S U (2, 1)$ , $S p_{4}$ , and $G_{2}$ .

Nakamaye’s theorem on log canonical pairs

Salvatore Cacciola, Angelo Felice Lopez (2014)

Annales de l’institut Fourier

We generalize Nakamaye’s description, via intersection theory, of the augmented base locus of a big and nef divisor on a normal pair with log-canonical singularities or, more generally, on a normal variety with non-lc locus of dimension $\leq 1$ . We also generalize Ein-Lazarsfeld-Mustaţă-Nakamaye-Popa’s description, in terms of valuations, of the subvarieties of the restricted base locus of a big divisor on a normal pair with klt singularities.

Nash cohomology of smooth manifolds

W. Kucharz (2005)

Annales Polonici Mathematici

A Nash cohomology class on a compact Nash manifold is a mod 2 cohomology class whose Poincaré dual homology class can be represented by a Nash subset. We find a canonical way to define Nash cohomology classes on an arbitrary compact smooth manifold M. Then the Nash cohomology ring of M is compared to the ring of algebraic cohomology classes on algebraic models of M. This is related to three conjectures concerning algebraic cohomology classes.

Nash functions on noncompact Nash manifolds

Michel Coste, Masahiro Shiota (2000)

Annales scientifiques de l'École Normale Supérieure

Nash Manifolds

Masahiro Shiota (1986)

Publications mathématiques et informatique de Rennes

Nash triviality in families of Nash manifolds.

Masahiro Shiota, Michel Coste (1992)

Inventiones mathematicae

Nash triviality in families of Nash mappings

Jesús Escribano (2001)

Annales de l’institut Fourier

We study triviality of Nash families of proper Nash submersions or, in a more general setting, the triviality of pairs of proper Nash submersions. We work with Nash manifolds and mappings defined over an arbitrary real closed field $R$ . To substitute the integration of vector fields, we study the fibers of such families on points of the real spectrum $\tilde{R^{p}}$ and we construct models of proper Nash submersions over smaller real closed fields. Finally we obtain results on finiteness of topological types in...