differentialtrT

DifferentialtrT is a differential operator defined on smooth tensor fields over a differentiable manifold, parameterized by a fixed tensor T of suitable type. It formalizes the combination of differentiation with contraction by a prescribed index pairing. Concretely, for a tensor field A of type (p,q), one first applies a connection ∇ to A to obtain ∇A, and then contracts a chosen pair of indices using T. This yields a new tensor field of type (p−1,q−1). When T implements the standard trace on the contracted indices, differentialtrT reduces in effect to a trace taken after differentiation in the relevant directions.

Properties of differentialtrT include linearity over smooth functions and dependence on both the connection ∇ and the

Special cases provide intuition. In Euclidean space with the standard flat connection and a (1,1)-tensor field

Applications of differentialtrT appear mainly in theoretical studies of tensor calculus and as an instructional device