Ebook Info
- Published: 2012
- Number of pages: 264 pages
- Format: PDF
- File Size: 1.14 MB
- Authors: Peter B. Gilkey
Description
A central area of study in Differential Geometry is the examination of the relationship between the purely algebraic properties of the Riemann curvature tensor and the underlying geometric properties of the manifold. In this book, the findings of numerous investigations in this field of study are reviewed and presented in a clear, coherent form, including the latest developments and proofs. Even though many authors have worked in this area in recent years, many fundamental questions still remain unanswered. Many studies begin by first working purely algebraically and then later progressing onto the geometric setting and it has been found that many questions in differential geometry can be phrased as problems involving the geometric realization of curvature. Curvature decompositions are central to all investigations in this area. The authors present numerous results including the Singer-Thorpe decomposition, the Bokan decomposition, the Nikcevic decomposition, the Tricerri-Vanhecke decomposition, the Gray-Hervella decomposition and the De Smedt decomposition. They then proceed to draw appropriate geometric conclusions from these decompositions.The book organizes, in one coherent volume, the results of research completed by many different investigators over the past 30 years. Complete proofs are given of results that are often only outlined in the original publications. Whereas the original results are usually in the positive definite (Riemannian setting), here the authors extend the results to the pseudo-Riemannian setting and then further, in a complex framework, to para-Hermitian geometry as well. In addition to that, new results are obtained as well, making this an ideal text for anyone wishing to further their knowledge of the science of curvature.
User’s Reviews
Editorial Reviews: From the Back Cover A central area of study in Differential Geometry is the examination of the relationship between the purely algebraic properties of the Riemann curvature tensor and the underlying geometric properties of the manifold. In this book, the findings of numerous investigations in this field of study are reviewed and presented in a clear, coherent form, including the latest developments and proofs. Even though many authors have worked in this area in recent years, many fundamental questions still remain unanswered. Many studies begin by first working purely algebraically and then later progressing onto the geometric setting and it has been found that many questions in differential geometry can be phrased as problems involving the geometric realization of curvature. Curvature decompositions are central to all investigations in this area. The authors present numerous results including the Singer Thorpe decomposition, the Bokan decomposition, the Nikcevic decomposition, the Tricerri Vanhecke decomposition, the Gray Hervella decomposition and the De Smedt decomposition. They then proceed to draw appropriate geometric conclusions from these decompositions. The book organizes, in one coherent volume, the results of research completed by many different investigators over the past 30 years. Complete proofs are given of results that are often only outlined in the original publications. Whereas the original results are usually in the positive definite (Riemannian setting), here the authors extend the results to the pseudo-Riemannian setting and then further, in a complex framework, to para-Hermitian geometry as well. In addition to that, new results are obtained as well, making this an ideal text for anyone wishing to further their knowledge of the science of curvature.
Reviews from Amazon users which were colected at the time this book was published on the website:
⭐This is a must buy for anyone interested in differential geometry and curvature theory. The three authors obviously know their stuff. Not for the average casual reader – I would recommend having taken a first year graduate course in differential geometry before buying it. But apart from that – highly recommended.
⭐Not found.
Keywords
Free Download Geometric Realizations of Curvature (ICP Advanced Texts in Mathematics) in PDF format
Geometric Realizations of Curvature (ICP Advanced Texts in Mathematics) PDF Free Download
Download Geometric Realizations of Curvature (ICP Advanced Texts in Mathematics) 2012 PDF Free
Geometric Realizations of Curvature (ICP Advanced Texts in Mathematics) 2012 PDF Free Download
Download Geometric Realizations of Curvature (ICP Advanced Texts in Mathematics) PDF
Free Download Ebook Geometric Realizations of Curvature (ICP Advanced Texts in Mathematics)
