vetorivit

Vetorivit is a hypothetical mathematical construct used to describe a structured field that combines a vector field with a scalar field. Concretely, on a smooth manifold M, a vetorivit is defined as a section of the product bundle TM × R, which assigns to each point p a pair (v_p, s_p) with v_p in the tangent space T_pM and s_p in R. The two components are required to vary smoothly with p. This framework extends ordinary vector fields by incorporating a pointwise scalar weight alongside the direction field.

Notes on notation and operations: If X denotes a vector field and f a scalar function on

Applications: In differential geometry, vetorivit provides a compact way to couple directional flows with local densities,

See also: vector field, tangent bundle, product bundle, weighted vector field.