Titlebook: CR Submanifolds of Complex Projective Space; Mirjana Djoric,Masafumi Okumura Book 2010 Springer-Verlag New York 2010 CR Submanifolds.Comp

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書(shū)目名稱CR Submanifolds of Complex Projective Space影響因子(影響力)

書(shū)目名稱CR Submanifolds of Complex Projective Space影響因子(影響力)學(xué)科排名

書(shū)目名稱CR Submanifolds of Complex Projective Space網(wǎng)絡(luò)公開(kāi)度

書(shū)目名稱CR Submanifolds of Complex Projective Space網(wǎng)絡(luò)公開(kāi)度學(xué)科排名

書(shū)目名稱CR Submanifolds of Complex Projective Space被引頻次

書(shū)目名稱CR Submanifolds of Complex Projective Space被引頻次學(xué)科排名

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書(shū)目名稱CR Submanifolds of Complex Projective Space年度引用學(xué)科排名

書(shū)目名稱CR Submanifolds of Complex Projective Space讀者反饋

書(shū)目名稱CR Submanifolds of Complex Projective Space讀者反饋學(xué)科排名

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1389-2177 n to complex differential geometry.Provides relevant techniqAlthoughsubmanifoldscomplexmanifoldshasbeenanactive?eldofstudyfor many years, in some sense this area is not su?ciently covered in the current literature. This text deals with the CR submanifolds of complex manifolds, with particular emphas

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Armand Faganel,Anita Trnav?evi?over, since a real hypersurface . of a K?hler manifold . has two geometric structures: an almost contact structure . and a submanifold structure represented by the shape operator . with respect to ., in this section we study the commutativity condition of . and . and we present its geometric meaning.

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1389-2177 ntial geometry and related ?elds and acce- able to professional di?erential geometers. However, for graduate students who are less advanced in di?erential geometry, these texts might be hard to read without ass978-1-4614-2477-2978-1-4419-0434-8Series ISSN 1389-2177 Series E-ISSN 2197-795X

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Book 2010onaboutthetopics. Therefore, thesekindsofmonographsare attractive to specialists in di?erential geometry and related ?elds and acce- able to professional di?erential geometers. However, for graduate students who are less advanced in di?erential geometry, these texts might be hard to read without ass

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Structure equations of a submanifold, ..(.). We say then that . is immersed in . by . or that . is an . of .. When an immersion . is injective, it is called an . of . into .. We say then that . (or the image .(.)) is an . (or, simply, a .) of .. In this sense, throughout what follows, we adopt the convention that by submanifold we mean

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