- #1
Haorong Wu
- 413
- 89
- TL;DR Summary
- Gradient energy is given by ##\frac 1 2 (\nabla \phi)^2##. What does it represent?
In page 40 of Spacetime and geometry by Sean M. Carroll, when consider the classical mechanics of a single real scalar field, it reads that the field will have an energy density including various contributions:
kinetic energy:##\frac 1 2 \dot \phi^2##
gradient energy:##\frac 1 2 (\nabla \phi)^2##
potential energy:##V(\phi)##
I am not familiar with gradient energy. I googled it, but it returns with energy gradient, which I do not think is the same thing.
Also, is this gradient energy introduced because it and kinetic energy can combine into a covariant form?
Thanks!
kinetic energy:##\frac 1 2 \dot \phi^2##
gradient energy:##\frac 1 2 (\nabla \phi)^2##
potential energy:##V(\phi)##
I am not familiar with gradient energy. I googled it, but it returns with energy gradient, which I do not think is the same thing.
Also, is this gradient energy introduced because it and kinetic energy can combine into a covariant form?
Thanks!