**Tensor Analysis**

by Edward Nelson

**Publisher**: Princeton Univ Pr 1974**ISBN/ASIN**: 0691080461**ISBN-13**: 9780691080468**Number of pages**: 138

**Description**:

These are the lecture notes for the first part of a one-term course on differential geometry given at Princeton in the spring of 1967. They are an expository account of the formal algebraic aspects of tensor analysis using both modern and classical notations.

Download or read it online for free here:

**Download link**

(3.2MB, PDF)

## Similar books

**Notes on Differential Geometry**

by

**Noel J. Hicks**-

**Van Nostrand**

A concise introduction to differential geometry. The ten chapters of Hicks' book contain most of the mathematics that has become the standard background for not only differential geometry, but also much of modern theoretical physics and cosmology.

(

**8324**views)

**A Course Of Differential Geometry**

by

**John Edward Campbell**-

**Clarendon Press**

Contents: Tensor theory; The ground form when n=2; Geodesics in two-way space; Two-way space as a locus in Euclidean space; Deformation of a surface and congruences; Curves in Euclidean space and on a surface; The ruled surface; Minimal surface; etc.

(

**2053**views)

**Differential Geometry Course Notes**

by

**Richard Koch**-

**University of Oregon**

These are differential geometry course notes. From the table of contents: Preface; Curves; Surfaces; Extrinsic Theory; The Covariant Derivative; The Theorema Egregium; The Gauss-Bonnet Theorem; Riemann's Counting Argument.

(

**6758**views)

**Differential Geometry**

by

**Balazs Csikos**-

**Eötvös Loránd University**

Contents: Basic Structures on Rn, Length of Curves; Curvatures of a Curve; Plane Curves; 3D Curves; Hypersurfaces; Surfaces in 3-dimensional space; Fundamental equations of hypersurface theory; Topological and Differentiable Manifolds; etc.

(

**7746**views)