01719nam 2200445 450 991052469590332120221222205212.00-88099-448-7(CKB)1000000000521812(NjHacI)991000000000521812(EXLCZ)99100000000052181220221222d2006 uy 0engur|||||||||||txtrdacontentcrdamediacrrdacarrierThe geography of American poverty is there a need for place-based policies? /Mark D. Partridge, Dan S. RickmanKalamazoo, Michigan :W.E. Upjohn Institute,[2006]©20061 online resource (xi, 355 pages) illustrations, maps0-88099-286-7 Includes bibliographical references (pages 311-340) and index.Partridge and Rickman explore the wide geographic disparities in poverty across the United States. Their focus on the spatial dimensions of U.S. poverty reveals distinct differences across states, metropolitan areas, and counties and leads them to consider why antipoverty policies have succeeded in some places and failed in others.GEOGRAPHY OF AMERICAN POVERTYPovertyUnited StatesUrban poorUnited StatesRural poorUnited StatesPovertyUrban poorRural poor339.460973Partridge Mark D.1168357Rickman Dan S.NjHacINjHaclBOOK9910524695903321The geography of American poverty2995789UNINA02895nam 2200565 450 991078887420332120220817013627.01-4704-0857-0(CKB)3360000000464618(EBL)3113858(SSID)ssj0000973218(PQKBManifestationID)11539951(PQKBTitleCode)TC0000973218(PQKBWorkID)10960089(PQKB)11340281(MiAaPQ)EBC3113858(RPAM)4832417(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 CAUCHY-RIEMANN COMPLEX -- I.1 The Cauchy-Riemann complex in C[sup(n)]. Notation -- I.2 Bochner-Martinelli formula with exponential -- I.3 Koppelman formulas with exponential -- I.4 Vanishing of the error terms -- CHAPTER II: HOMOTOPY FORMULAS IN THE TANGENTIAL CAUCHY-RIEMANN COMPLEX -- II.1 Local description of the tangential Cauchy-Riemann complex -- II.2 Application of the Bochner-Martinelli formula to a CR manifold -- II.3 Homotopy formulas for differential forms that vanish on the s-part of the boundary -- II.4 The pinching transformation -- II.5 Reduction to differential forms that vanish on the s-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 formsCauchy-Riemann equations.Homotopy theory.Differential forms.515/.353Treves Francois1930-424171MiAaPQMiAaPQMiAaPQBOOK9910788874203321Homotopy formulas in the tangential Cauchy-Riemann complex3705612UNINA