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Oka manifolds: From Oka to Stein and back

Franc Forstnerič (2013)

Annales de la faculté des sciences de Toulouse Mathématiques

Oka theory has its roots in the classical Oka-Grauert principle whose main result is Grauert’s classification of principal holomorphic fiber bundles over Stein spaces. Modern Oka theory concerns holomorphic maps from Stein manifolds and Stein spaces to Oka manifolds. It has emerged as a subfield of complex geometry in its own right since the appearance of a seminal paper of M. Gromov in 1989.In this expository paper we discuss Oka manifolds and Oka maps. We describe equivalent characterizations...

On algebraic models for homotopy 3-types.

Arvasi, Z., Ulualan, E. (2006)

Journal of Homotopy and Related Structures

On derived categories and derived functors.

S. Saneblidze (2007)

Extracta Mathematicae

On long exact $(\bar{π}, {Ext}_{λ})$ -sequences in module theory.

Su, C.Joanna (2004)

International Journal of Mathematics and Mathematical Sciences

On spaces of the same strong $n$ -type.

Félix, Yves, Thomas, Jean-Claude (1999)

Homology, Homotopy and Applications

On the 2-type of an iterated loop space.

Hans-Joachim Baues, Daniel Conduché (1997)

Forum mathematicum

On the adjoint map of homotopy abelian DG-Lie algebras

Donatella Iacono, Marco Manetti (2019)

Archivum Mathematicum

We prove that a differential graded Lie algebra is homotopy abelian if its adjoint map into its cochain complex of derivations is trivial in cohomology. The converse is true for cofibrant algebras and false in general.

On the derivative of the stable homotopy of mapping spaces.

Klein, John R. (2003)

Homology, Homotopy and Applications

On the derived category of sheaves on a manifold.

Neeman, Amnon (2001)

Documenta Mathematica

On weak $i$ -homotopy equivalences of modules

Zheng-Xu He (1984)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

Si definisce il gruppo di $i$ —omotopia di un singolo modulo e si introduce la nozione di equivalenza $i$ -omotopica debole. Sotto determinate condizioni per l'anello di base $\Lambda$ oppure per i moduli considerati, le equivalenze $i$ -omotopiche deboli coincidono con le equivalenze $i$ -omotopiche (forti).

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