Keywords
- Residue Field
- Real Spectrum
- Prime Cone
- Power Series Ring
- Real Analytic Manifold
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References
M.E. Alonso, C. Andradas: Real spectra of complete local rings, Manuscripta math. 58 (1987) 155–177.
C. Andradas, L. Bröcker, J.M. Ruiz: Minimal generation of basic open semianalytic sets, Invent. Math. 92 (1988) 409–430.
M.E. Alonso, M.F. Roy: Real strict localizations, Math. Z. 194 (1987) 429–441.
J. Bochnak, M. Coste, M.F. Roy: Géométrie Algébrique Réelle, Ergebnisse Math. 12, Springer-Verlag 1987.
F. Fernández, T. Recio, J.M. Ruiz: Generalized Thom's lemma in semianalytic geometry, Bull. Polish Ac. Sc. 35 (1987) 297–301.
S. Greco: Two theorems on excellent rings, Nagoya Math. J 60 (1976) 139–149.
H. Matsumura: Commutative Algebra, 2d edition, W.A. Benjamin Co. 1980.
M.F. Roy: Fonctions de Nash et faisceau structural sur le spectre réel, in Lect. Notes Math. 959, Springer-Verlag 1982.
J.M. Ruiz: On Hilbert's 17th problem and real Nullstellensatz for global analytic functions, Math. Z 190 (1985) 447–454.
J.M. Ruiz: Basic properties of real analytic and semianalytic germs, Publ. Inst. Recherche Math. Rennes, 4 (1986) 29–51.
J.M. Ruiz: On the real spectrum of a ring of global analytic functions, Publ. Inst. Recherche Math. Rennes, 4 (1986) 84–95.
J.M. Ruiz: On the connected components of a global semianalytic set, J. reine angew. Math. 392 (1988) 137–144.
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© 1990 Springer-Verlag
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Ruiz, J.M. (1990). On the topology of global semianalytic sets. In: Galbiati, M., Tognoli, A. (eds) Real Analytic and Algebraic Geometry. Lecture Notes in Mathematics, vol 1420. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0083924
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DOI: https://doi.org/10.1007/BFb0083924
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