Add to ORKGRiemannian Geometry studies the geometry of curved spaces. It originated with the ideas of the Bernhard Riemann in the 19th century extending Gaussian geometry, or the study of geometry of curves and surfaces contained in 3 dimensional Euclidean space
Abstract. The first derivative is about approximation by a linear object. Curvature is a measure of ...
n the study of geometry, mathematicians are interested in how certain geometrical objects curve or o...
Special structures often arise naturally in Riemannian geometry. They are usually given by the exist...
We may have an intuitive idea of what it means for surfaces to be curved, but what does it mean for ...
Riemannian and conformal geometry are classical topics of differential geometry. Even though both k...
This established reference work continues to provide its readers with a gateway to some of the most ...
Intended for a one year course, this text serves as a single source, introducing readers to the impo...
In Riemannian (differential) geometry, the differences between Euclidean geometry, elliptic geometry...
In the last fifty years of the twentieth century Riemannian geometry has exploded with activity. Ber...
This textbook is designed for a one or two semester graduate course on Riemannian geometry for stude...
Riemannian and conformal geometry are classical topics of differential geometry. Even though both k...
This book presents the classical theory of curves in the plane and three-dimensional space, and the ...
This is a set of lecture notes for the course Math 240BC given during the Winter and Spring of 2009....
International audienceThis book is on the work of Bernhard Riemann and its impact on mathematics, ph...
We may have an intuitive idea of what it means for surfaces to be curved, but what does it mean for ...
Abstract. The first derivative is about approximation by a linear object. Curvature is a measure of ...
n the study of geometry, mathematicians are interested in how certain geometrical objects curve or o...
Special structures often arise naturally in Riemannian geometry. They are usually given by the exist...
We may have an intuitive idea of what it means for surfaces to be curved, but what does it mean for ...
Riemannian and conformal geometry are classical topics of differential geometry. Even though both k...
This established reference work continues to provide its readers with a gateway to some of the most ...
Intended for a one year course, this text serves as a single source, introducing readers to the impo...
In Riemannian (differential) geometry, the differences between Euclidean geometry, elliptic geometry...
In the last fifty years of the twentieth century Riemannian geometry has exploded with activity. Ber...
This textbook is designed for a one or two semester graduate course on Riemannian geometry for stude...
Riemannian and conformal geometry are classical topics of differential geometry. Even though both k...
This book presents the classical theory of curves in the plane and three-dimensional space, and the ...
This is a set of lecture notes for the course Math 240BC given during the Winter and Spring of 2009....
International audienceThis book is on the work of Bernhard Riemann and its impact on mathematics, ph...
We may have an intuitive idea of what it means for surfaces to be curved, but what does it mean for ...
Abstract. The first derivative is about approximation by a linear object. Curvature is a measure of ...
n the study of geometry, mathematicians are interested in how certain geometrical objects curve or o...
Special structures often arise naturally in Riemannian geometry. They are usually given by the exist...