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001484004 001__ 1484004
001484004 003__ OCoLC
001484004 005__ 20240117003310.0
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001484004 007__ cr\un\nnnunnun
001484004 008__ 231115s2023\\\\sz\\\\\\ob\\\\001\0\eng\d
001484004 019__ $$a1409031291
001484004 020__ $$a9783031379130$$q(electronic bk.)
001484004 020__ $$a3031379136$$q(electronic bk.)
001484004 020__ $$z9783031379123
001484004 020__ $$z3031379128
001484004 0247_ $$a10.1007/978-3-031-37913-0$$2doi
001484004 035__ $$aSP(OCoLC)1409202175
001484004 040__ $$aYDX$$beng$$erda$$epn$$cYDX$$dGW5XE$$dEBLCP$$dOCLCQ$$dOCLCO$$dN$T
001484004 049__ $$aISEA
001484004 050_4 $$aQA614
001484004 08204 $$a516/.07$$223/eng/20231117
001484004 1001_ $$aLewis, Andrew D.,$$eauthor.
001484004 24510 $$aGeometric analysis on real analytic manifolds /$$cAndrew D. Lewis.
001484004 264_1 $$aCham :$$bSpringer,$$c[2023]
001484004 264_4 $$c©2023
001484004 300__ $$a1 online resource (xv, 314 pages).
001484004 336__ $$atext$$btxt$$2rdacontent
001484004 337__ $$acomputer$$bc$$2rdamedia
001484004 338__ $$aonline resource$$bcr$$2rdacarrier
001484004 4901_ $$aLecture notes in mathematics ;$$vvolume 2333
001484004 504__ $$aIncludes bibliographical references and index.
001484004 506__ $$aAccess limited to authorized users.
001484004 520__ $$aThis monograph provides some useful tools for performing global geometric analysis on real analytic manifolds. At the core of the methodology of the book is a variety of descriptions for the topologies for the space of real analytic sections of a real analytic vector bundle and for the space of real analytic mappings between real analytic manifolds. Among the various descriptions for these topologies is a development of geometric seminorms for the space of real analytic sections. To illustrate the techniques in the book, a number of fundamental constructions in differential geometry are shown to induce continuous mappings on spaces of real analytic sections and mappings. Aimed at researchers at the level of Doctoral students and above, the book introduces the reader to the challenges and opportunities of real analytic analysis and geometry.
001484004 650_6 $$aVariétés (Mathématiques)
001484004 650_6 $$aAnalyse géométrique.
001484004 650_0 $$aManifolds (Mathematics)
001484004 650_0 $$aGeometric analysis.$$0(DLC)sh2008008771
001484004 655_0 $$aElectronic books.
001484004 77608 $$iPrint version:$$z3031379128$$z9783031379123$$w(OCoLC)1389878669
001484004 830_0 $$aLecture notes in mathematics (Springer-Verlag) ;$$v2333.
001484004 852__ $$bebk
001484004 85640 $$3Springer Nature$$uhttps://univsouthin.idm.oclc.org/login?url=https://link.springer.com/10.1007/978-3-031-37913-0$$zOnline Access$$91397441.1
001484004 909CO $$ooai:library.usi.edu:1484004$$pGLOBAL_SET
001484004 980__ $$aBIB
001484004 980__ $$aEBOOK
001484004 982__ $$aEbook
001484004 983__ $$aOnline
001484004 994__ $$a92$$bISE