A vector field is an operator that takes a smooth real-valued function of a manifold and produces a new function on the manifold which computes the directional derivative of the given function at each point of the manifold.
A vector field is an operator that takes a smooth real-valued function of a manifold and produces a new function on the manifold which computes the directional derivative of the given function at each point of the manifold.
(coordinate-name->vf-name n)
From the name n
of a coordinate, produce the name of the coordinate basis
vector field (as a symbol)
From the name `n` of a coordinate, produce the name of the coordinate basis vector field (as a symbol)
(evolution order)
We can use the coordinatized vector field to build an evolution along an integral curve.
We can use the coordinatized vector field to build an evolution along an integral curve.
cljdoc is a website building & hosting documentation for Clojure/Script libraries
× close