To put this in mathematical terms, we have to make use of the transformation properties of particles.

The correctness responsibilities of these two layers are formally specified by a set of transformation properties and conditions.

Various transformation properties for ensuring OT system correctness have been identified.

Ultimately this notion of the transformation properties of physical laws between frames played a more and more central role.

To illustrate the transformation properties, consider again the set of points p, identifiable in a given coordinate system where (manifold).

But on the basis of the Fermi-Rohrlich definition, this is only a dynamical problem and has nothing to do with the transformation properties any more.

The rightmost formulation follows from the transformation properties of the Hodge star operator.

You now explain to them that it is better thought of as an object with certain transformation properties under rotations.

You implore them to believe that it is an object with certain transformation properties under rotations.

It refers to the particular transformation properties under Lorentz transformation.