02961cam  22004578i 450000100090000000300050000900500170001400600190003100700150005000800410006502000270010604000340013305000210016708200290018808400150021710000360023224501060026825000200037426300090039426400710040330000340047433600260050833700280053433800270056249000460058950400510063550510350068650600500172152001500177153300950192153800360201658800470205265000280209965000300212765000490215770000360220670000490224277601240229185600420241585600460245723340600RPAM20240215184454.0a      b    001 0 cr/|||||||||||240215s2023    riu     ob    001 0 eng    a9781470476182 (online)  aDLCbengerdacDLCdDLCdRPAM00aQA641b.E62 202400a516.3/6223/eng/20231023  a58-XX2msc1 aCieliebak, Kai,d1966-eauthor.10aIntroduction to the h-principle /h[electronic resource] cK. Cieliebak, Y. Eliashberg, N. Mishachev.  aSecond edition.  a2402 1aProvidence, Rhode Island :bAmerican Mathematical Society,c[2023]  a1 online resource (pages cm.)  atextbtxt2rdacontent  aunmediatedbn2rdamedia  avolumebnc2rdacarrier0 aGraduate Studies in Mathematics, vv. 239  aIncludes bibliographical references and index.00tIntriguetJets and holonomytThom transversality theoremtHolonomic approximationtApplicationstMultivalued holonomic approximationtDifferential relationstHomotopy principletOpen Diff $V$-invariant differential relationstApplications to closed manifoldstFoliationstSingularities of smooth mapstWrinklestWrinkles submersionstFolded solutions to differential relationstThe $h$-principle for sharp wrinkled embeddingstIgusa functionstSymplectic and contact basicstSymplectic and contact structures on open manifoldstSymplectic and contact structures on closed manifoldstEmbeddings into symplectic and contact manifoldstMicroflexibility and holonomic $\mathcal {R}$-approximationtFirst applications to microflexibilitytMicroflexible $\mathfrak {A}$-invariant differential relationstFurther applications to symplectic geometrytOne-dimensional convex integrationtHomotopy principle for ample differential relationstDirected immersions and embeddingstFirst order linear differential operatorstNash-Kuiper theorem1 aAccess is restricted to licensed institutions  a"The back-up contains a draft of the title page, copyright page, and manuscript. DO NOT INCLUDE THIS IN THE CIP RECORD"--cProvided by publisher.  aElectronic reproduction.bProvidence, Rhode Island :cAmerican Mathematical Society.d2024  aMode of access : World Wide Web  aDescription based on print version record. 0aGeometry, Differential. 0aDifferentiable manifolds. 0aDifferential equationsxNumerical solutions.1 aEliashberg, Y.,d1946-eauthor.1 aMishachev, N.q(Nikolai M.),d1952-eauthor.0 iPrint version: aCieliebak, Kai, 1966-tIntroduction to the h-principle /w(DLC)   2023043257x1065-7339z97814704610584 3Contentsuhttps://www.ams.org/gsm/2394 3Contentsuhttps://doi.org/10.1090/gsm/239