A perfectly mirrored box sits on a scale. You fill it with photons of total energy — particles with zero mass. Does the scale read more?
Solution
Yes: heavier by exactly .
Mass is not the sum of the masses of the parts; it is the norm of the total four-momentum. Already two photons of energy flying in opposite directions form a system with and , hence invariant mass — massless constituents, massive whole. The box of light is a composite at rest with rest energy increased by , and it gravitates, and weighs, accordingly.
The scale learns this through radiation pressure. Photons bouncing off the floor have fallen through the box’s height and arrive slightly blueshifted; photons hitting the ceiling arrive slightly redshifted. The floor is pushed harder than the ceiling, and integrating the imbalance over the photon gas gives precisely . The bookkeeping device that makes all such accounts come out consistent is the stress-energy tensor: energy density, momentum flux, and pressure all gravitate together.
Deeper in the notebook: 06. Relativistic Mechanics and the Stress-Energy Tensor · 01. Gravitational Redshift