8 edition of **Harmonic maps with symmetry, harmonic morphisms, and deformations of metrics** found in the catalog.

- 92 Want to read
- 13 Currently reading

Published
**1983**
by Pitman Advanced Pub. Program in Boston
.

Written in English

- Harmonic maps.,
- Submanifolds.,
- Harmonic morphisms.

**Edition Notes**

Statement | P. Baird. |

Series | Research notes in mathematics ;, 87 |

Classifications | |
---|---|

LC Classifications | QA614.73 .B34 1983 |

The Physical Object | |

Pagination | 181 p. : |

Number of Pages | 181 |

ID Numbers | |

Open Library | OL3166207M |

ISBN 10 | 0273086030 |

LC Control Number | 83008186 |

Harmonic Maps and Minimal Immersions with Symmetries (AM), Volume Methods of Ordinary Differential Equations Applied to Elliptic Variational Problems. (AM) James Eells and Andrea Ratto. The aim of this book is to study harmonic maps, minimal and parallel mean curvature immersions in the presence of symmetry. MSC Classification Codes. xx: General. Instructional exposition (textbooks, tutorial papers, etc.) Research exposition (monographs, survey articles).

Announcement: p-Harmonic Morphisms Minimal Foliations and Conformal Deformations of Metrics Speaker: Ye-Lin Ou, University of Oklahoma Time & Place: PM in PHSC For more info, call and ask for Y. Ou Thursday, May 5, -- Karcher Colloquium Announcement: What can we do with the Nash embedding theorem? The Topos of Music is the upgraded and vastly deepened English extension of the seminal German Geometrie der Töne. It reflects the dramatic progress of mathematical music theory and its operationalization by information technology since the publication of Geometrie der Töne in /5(1).

unspecified () conservation-laws, equivariant harmonic maps and harmonic morphisms. proceedings of the london mathematical society, 64 (part 1). pp. unspecified () the construction of a class of harmonic maps to quaternionic projective-space. Wood J. Harmonic maps and harmonic morphisms. Sci. , , Go to original source Yablonskaya N.V. On some classes of almost geodesic mappings of general spaces with affine connections. Ukr. Geom. Sb. 27, , Yablonskaya N.V. Special groups of almost geodesic transformations of spaces with affine connection. Sov.

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Get this from a library. Harmonic maps with symmetry, harmonic morphisms, and deformations of metrics. [P Baird] -- "The aim of this book is to construct harmonic maps between Riemannian manifolds, and in particular between spheres.

These maps have a delightful geometry associated with them. Infinitesimal deformations of harmonic maps and morphisms Article in International Journal of Geometric Methods in Modern Physics 3(6) September with 19 Reads How we measure 'reads'. Abstract. The last five decades have witnessed many developments in the theory of harmonic maps.

To become acquainted to some of these, the reader is referred to two reports and a survey paper by Eells and Lemaire [,] about. Harmonic maps with symmetry, harmonic morphisms and deformations of metrics We plan and deformations of metrics book write a comprehensive survey on biharmonic maps and biharmonic submanifolds.

This book is Author: Ye-Lin Ou. PITMAN BOOKS LIMI1ED Long Acre, London WC2E 9AN PITMAN PUBLISHING INC Plain Street, Marshfield, Massachusetts Associated Companies Pitman Publishing Pty Ltd, Melbou.

These notes are intended to give an introduction to the ideas of twistor constructions for harmonic maps which are, at the present time, developing very fast.

We explain the ubiquitous "J 2 " structure in twistor theory by showing how it naturally arises from a generalization of S.S. Chern's fundamental theorem on the antiholomorphicity of the Cited by: 1.

Harmonic maps. Submanifolds. Title. Series. QAB34 ' ISBN British Library Cataloguing in Publication Data Baird, P. Harmonic maps with symmetry, harmonic morphisms and deformations of metrics(Research notes in mathematics; 87) 1. Clearly any harmonic map is biharmonic, therefore it is interesting to construct non-harmonic biharmonic maps.

In [] the authors found new examples of biharmonic maps by conformally deforming the domain metric of harmonic in [] the author analyzed the behavior of the biharmonic equation under the conformal change the domain metric, she obtained metrics g ˜ = e 2 γ such that the Cited by: 4.

Harmonic Maps and Differential Geometry: A Harmonic Map Fest in Honour of John C. Wood's 60th Birthday SeptemberCagliari, Italy Loubeau E., Montaldo S. (eds.) This volume contains the proceedings of a conference held in Cagliari, Italy, from September, to celebrate John C. Wood's 60th birthday. Baird, Harmonic Maps with Symmetry, Harmonic Morphisms and Deformations of Metrics, Research Notes in Math.

87 () Pitman Books Ltd ( pages). Baird et J. Eells, A conservation law for harmonic maps, Springer Lecture Notes in Math. (). His work in this direction include constructions of minimal submanifolds, harmonic maps, and canonical metrics on manifolds.

The most notable, and probably the most influential of this, was his solution of the Calabi conjecture on Ricci flat metrics, and the existence of Kahler-Einstein metrics.

Harmonic Maps with Symmetry, Harmonic Morphisms, and Deformations of Metrics. Pitman Advanced Pub. Program. Paul Baird. Year: Language: english. File: PDF, MB.

A search query can be a title of the book, a name of the author, ISBN or anything else. Read more about ZAlerts. The Toda equations and equiharmonic maps of surfaces into flag manifolds J. BOLTON 13 p-harmonic morphisms: the 1 metrics on Lie groups V.

DE SMEDT AND S. SALAMON Unforeseen descent, or local-to-global formulas, for familiar objects can be articulated in terms of higher invertible morphisms. Compatible associative deformations of a sequence of maps of spaces, or derived schemes, can putatively be represented by higher categories, as.

[Cambridge Tracts in Mathematics] Frédéric Hélein - Harmonic maps conservation laws and moving frames ( Cambridge University Press).pdf.

The Mathematical Sciences Research Institute (MSRI), founded inis an independent nonprofit mathematical research institution whose funding sources include the National Science Foundation, foundations, corporations, and more than 90 universities and institutions.

The Institute is located at 17 Gauss Way, on the University of California, Berkeley campus, close to Grizzly Peak, on the. A Lie algebroid morphism Φ: ⊤Σ → E (over ϕ: Σ → M) is said to be a (generalised) harmonic map if it is a critical point of the Lie algebroid sigma model.

If E = ⊤ M, then we get the standard notion of a harmonic map between (Σ, g) and (M, G).Cited by: 2. A History of Mirror Symmetry xv The Organization of this Book xvii Part 1. Mathematical Preliminaries 1 Chapter 1. Diﬀerential Geometry 3 Introduction 3 Manifolds 4 Vector Bundles 5 Metrics, Connections, Curvature 11 Diﬀerential Forms 18 Chapter 2.

Algebraic Geometry 25 Introduction 25 Projective Spaces For each of the spheres S n, n ≥ 5, we construct a new infinite family of harmonic self-maps, and prove that their members have Brouwer degree ±1 or ± self-maps are obtained by solving a singular boundary value problem. As an application we show that for each of the special orthogonal groups SO (4), SO (5), SO (6) and SO (7) there exist two infinite families of harmonic by: 3.

On harmonic maps into symmetric spaces and gauge-theoretic approach We shall discuss harmonic maps of Riemann surfaces, more generally pluriharmonic maps of complex manifolds, into compact symmetric spaces, and their moduli spaces from the viewpoint of the gauge-thoeretic equations.

We extend the notion of super-Minkowski space-time to include Z 2 n -graded (Majorana) spinor coordinates. Our choice of the grading leads to spinor coordinates that are nilpotent but commute amongst themselves. The mathematical framework we employ is the recently developed category of Z 2 n -manifolds understood as locally ringed spaces.

The formalism we present resembles N -extended Cited by: 5.Chenglong Yu "Kahler-Einstein metrics and generalized Schwarzian derivatives" Sep 30 Sep 19 Peter Smillie "Constant Gaussian curvature hypersurfaces in Minkowski space" ref 1 2 3 Karsten Gimre "Mean Curvature Flows and Isotopy of Maps Between Spheres" ref: Sep 21 Atsushi Kanazawa "Log CY, cluster, and mirror symmetry" ref 1 2 3.It develops mirror symmetry from both mathematical and physical perspectives.

The material will be particularly useful for those wishing to advance their understanding by exploring mirror symmetry at the interface of mathematics and physics.

This one-of-a-kind volume offers the first comprehensive exposition on this increasingly active area of.