Principles Of Tensor Calculus: Tensor Calculus Site

). This process keeps the underlying physical meaning intact while changing the mathematical representation. 4. Covariant Differentiation

): Components that transform "with" the coordinate change (e.g., gradients of a scalar field). They are denoted with lower indices. Principles of Tensor Calculus: Tensor Calculus

, we write one tensor equation that holds for any number of dimensions and any geometry, from a flat sheet of paper to the warped spacetime around a black hole. Principles of Tensor Calculus: Tensor Calculus

Objects that have both upper and lower indices, reflecting both types of transformation. 3. The Metric Tensor ( gijg sub i j end-sub Principles of Tensor Calculus: Tensor Calculus