02983nam 2200577 450 991048067790332120170918214854.01-4704-0857-0(CKB)3360000000464618(EBL)3113858(SSID)ssj0000973218(PQKBManifestationID)11539951(PQKBTitleCode)TC0000973218(PQKBWorkID)10960089(PQKB)11340281(MiAaPQ)EBC3113858(PPN)195413172(EXLCZ)99336000000046461820140904h19901990 uy 0engur|n|---|||||txtccrHomotopy formulas in the tangential Cauchy-Riemann complex /François TrevesProvidence, Rhode Island :American Mathematical Society,1990.©19901 online resource (133 p.)Memoirs of the American Mathematical Society,0065-9266 ;Volume 87, Number 434"September 1990, volume 87, number 434 (second of 3 numbers)."0-8218-2496-1 Includes bibliographical references.""CONTENTS""; ""INTRODUCTION""; ""CHAPTER I: HOMOTOPY FORMULAS WITH EXPONENTIAL IN THE CAUCHYâ€?RIEMANN COMPLEX""; ""I.1 The Cauchyâ€?Riemann complex in C[sup(n)]. Notation""; ""I.2 Bochnerâ€?Martinelli formula with exponential""; ""I.3 Koppelman formulas with exponential""; ""I.4 Vanishing of the error terms""; ""CHAPTER II: HOMOTOPY FORMULAS IN THE TANGENTIAL CAUCHYâ€?RIEMANN COMPLEX""; ""II.1 Local description of the tangential Cauchyâ€?Riemann complex""; ""II.2 Application of the Bochnerâ€?Martinelli formula to a CR manifold""""II.3 Homotopy formulas for differential forms that vanish on the sâ€?part of the boundary""""II.4 The pinching transformation""; ""II.5 Reduction to differential forms that vanish on the sâ€?part of the boundary""; ""II.6 Convergence of the homotopy operators""; ""II.7 Exact homotopy formulas""; ""CHAPTER III: GEOMETRIC CONDITIONS""; ""III.1 In variance of the central hypothesis in the hypersurface case""; ""III.2 The hypersurface case: Supporting manifolds""; ""III.3 Local homotopy formulas on a hypersurface""; ""III.4 Local homotopy formulas in higher codimension""; ""REFERENCES""Memoirs of the American Mathematical Society ;Volume 87, Number 434.Cauchy-Riemann equationsHomotopy theoryDifferential formsElectronic books.Cauchy-Riemann equations.Homotopy theory.Differential forms.515/.353Treves Francois1930-424171MiAaPQMiAaPQMiAaPQBOOK9910480677903321Homotopy formulas in the tangential Cauchy-Riemann complex2122849UNINA01183nam0 22002771i 450 UON0026239020231205103718.27620050325d1963 |0itac50 baitaIT||||0 |||||Orlando innamoratoAmorum libriMatteo Maria Boioardo a cura di Aldo Scaglione2ª edTorinoUTET1963rist. 19742 v.23 cm.001UON001771632001 Classici Italianicollezione diretta da Mario Fubini210 TorinoUTET.21 -1 ; 2ITTorinoUONL000014BOIARDOMatteo MariaUONV136504154367SCAGLIONEAldoUONV061970UtetUONV246439650ITSOL20250214RICAUON00262390SIBA - SISTEMA BIBLIOTECARIO DI ATENEOSI ITA K 45 - T. 1 SI LO 10805 7 45 - T. 1 SIBA - SISTEMA BIBLIOTECARIO DI ATENEOSI ITA K 45 - T. 2 SI LO 10806 7 45 - T. 2 Orlando innamorato150943UNIOR