Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : Michener & Rutledge Booksellers, Inc., Baldwin City, KS, Etats-Unis
Hardcover. Etat : Very Good+. Text clean and solid; no dust jacket; London Mathematical Society Monographs; 9.30 X 5.90 X 1.30 inches; 536 pages.
Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : Prometei Books, New Rochelle, NY, Etats-Unis
Edition originale
Hardcover. Etat : As New. 1st Edition. From publisher's library. Marking on the spine. Bookplate on inside cover and library stamp, otherwise book is new, never read, pages clean and crisp, spine unbroken. 0424C.
Edité par OUP Oxford, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : Ria Christie Collections, Uxbridge, Royaume-Uni
Etat : New. PRINT ON DEMAND Book; New; Fast Shipping from the UK. No. book.
Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : GreatBookPrices, Columbia, MD, Etats-Unis
Etat : New.
Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : GreatBookPricesUK, Castle Donington, DERBY, Royaume-Uni
Etat : New.
Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : Lucky's Textbooks, Dallas, TX, Etats-Unis
Etat : New.
Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : GreatBookPrices, Columbia, MD, Etats-Unis
Etat : As New. Unread book in perfect condition.
Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : BennettBooksLtd, North Las Vegas, NV, Etats-Unis
Hardcover. Etat : New. In shrink wrap! Looks like an interesting title!.
Edité par Oxford University Press, Oxford, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : AussieBookSeller, Truganina, VIC, Australie
Hardcover. Etat : new. Hardcover. This is the first account in book form of the theory of harmonic morphisms between Riemannian manifolds. Harmonic morphisms are maps which preserve Laplace's equation. They can be characterized as harmonic maps which satisfy an additional first order condition. Examples include harmonic functions, conformal mappings in the plane, and holomorphic functions with values in a Riemann surface. There are connections with many concepts in differential geometry, forexample, Killing fields, geodesics, foliations, Clifford systems, twistor spaces, Hermitian structures, isoparametric mappings, and Einstein metrics, and also the Brownian path-preserving maps ofprobability theory. Giving a complete account of the fundamental aspects of the subject, this book is self-contained, assuming only a basic knowledge of differential geometry. One chapter follows the complete development of the fundamental geometric aspects of harmonic maps from scratch.This text is suitable for a beginning graduate student interested in harmonic maps and morphisms, or related subjects. The student is brought to the frontiers ofknowledge in this rapidly expanding field in which there are many interesting avenues of research to be developed.The authors are world leaders in the field, and have establishedmany of the key results. In this book they have brought together their work and the work of many others to form a coherent account of the subject.This book is the 29th volume in the London Mathematical Society Monographs series, published by Oxford University press on behalf of the London Mathematical Society. The series contains authoritative accounts of current research in mathematics and high quality expository works bringing the reader to the frontiers ofresearch. Of particular interest are topics that have developed rapidly in the past ten years or so, but which have reached a certain level of maturity. Clarity of exposition is important and each bookcontains preliminary material to make the topic accessible to those commencing work in this area. This is an account in book form of the theory of harmonic morphisms between Riemannian manifolds. Harmonic morphisms are maps which preserve Laplace's equation. They can be characterized as harmonic maps which satisfy an additional first order condition. Shipping may be from our Sydney, NSW warehouse or from our UK or US warehouse, depending on stock availability.
Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : GreatBookPricesUK, Castle Donington, DERBY, Royaume-Uni
Etat : As New. Unread book in perfect condition.
Edité par Oxford University Press, Oxford, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : Grand Eagle Retail, Wilmington, DE, Etats-Unis
Hardcover. Etat : new. Hardcover. This is the first account in book form of the theory of harmonic morphisms between Riemannian manifolds. Harmonic morphisms are maps which preserve Laplace's equation. They can be characterized as harmonic maps which satisfy an additional first order condition. Examples include harmonic functions, conformal mappings in the plane, and holomorphic functions with values in a Riemann surface. There are connections with many concepts in differential geometry, forexample, Killing fields, geodesics, foliations, Clifford systems, twistor spaces, Hermitian structures, isoparametric mappings, and Einstein metrics, and also the Brownian path-preserving maps ofprobability theory. Giving a complete account of the fundamental aspects of the subject, this book is self-contained, assuming only a basic knowledge of differential geometry. One chapter follows the complete development of the fundamental geometric aspects of harmonic maps from scratch.This text is suitable for a beginning graduate student interested in harmonic maps and morphisms, or related subjects. The student is brought to the frontiers ofknowledge in this rapidly expanding field in which there are many interesting avenues of research to be developed.The authors are world leaders in the field, and have establishedmany of the key results. In this book they have brought together their work and the work of many others to form a coherent account of the subject.This book is the 29th volume in the London Mathematical Society Monographs series, published by Oxford University press on behalf of the London Mathematical Society. The series contains authoritative accounts of current research in mathematics and high quality expository works bringing the reader to the frontiers ofresearch. Of particular interest are topics that have developed rapidly in the past ten years or so, but which have reached a certain level of maturity. Clarity of exposition is important and each bookcontains preliminary material to make the topic accessible to those commencing work in this area. This is an account in book form of the theory of harmonic morphisms between Riemannian manifolds. Harmonic morphisms are maps which preserve Laplace's equation. They can be characterized as harmonic maps which satisfy an additional first order condition. This item is printed on demand. Shipping may be from multiple locations in the US or from the UK, depending on stock availability.
Edité par Oxford University Press, USA Mai 2003, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : AHA-BUCH GmbH, Einbeck, Allemagne
Buch. Etat : Neu. Neuware - This is the first account in book form of the theory of harmonic morphisms between Riemannian manifolds. Harmonic morphisms are maps which preserve Laplace's equation. They can be characterized as harmonic maps which satisfy an additional first order condition. Examples include harmonic functions, conformal mappings in the plane, and holomorphic functions with values in a Riemann surface. There are connections with many concepts in differential geometry, for example, Killing fields, geodesics, foliations, Clifford systems, twistor spaces, Hermitian structures, iso-parametric mappings, and Einstein metrics and also the Brownain pathpreserving maps of probability theory. Giving a complete account of the fundamental aspects of the subject, this book is self-contained, assuming only a basic knowledge of differential geometry.
Edité par Oxford University Press, 2003
ISBN 10 : 0198503628 ISBN 13 : 9780198503620
Vendeur : Iridium_Books, DH, SE, Espagne
Hardback. Etat : Muy Bueno / Very Good.