Suppose that I put lots of big magnets around me, or say, that I charge myself up to a macroscopic charge. Now, suppose that there's a huge magnet in front of me (or a huge object with opposite charge). Will I feel the force attracting me (that is, the acceleration) while I don't try to resist to it and gets pulled to it, or would I feel it only if I try to resist and stay at the same place on the ground ?
Could it be that I feel the acceleration while I'm in air and gets attracted to the magnet AND also while I'm trying to resist hard to stay motionless on the ground?
Motivation: strong equivalence principle tells us that to be (locally) inertial is to free fall. To be locally inertial, is like to be at rest, that is, no force can ever be felt at rest. This is exactly what one notices if one experiments free falls: no force, just nothing. On the contrary, if one is on its chair (that is, getting accelerated upward), one feels some force. Could it be that electrostatic force also be integrated into a (parametrized) deformation of space time, which would mean that when one is getting accelerated to the magnet/charge (that is, not resisting it), one doesn't feel anything?
EDIT: The good question is the following one. Is there some constraints known on the distribution of charge density per unit of inertial mass, $\frac{q}{m_i}$ ? If such charge density was cosntant for all physical objects, then we would obtain a (0th order) strong equivalence principle for electromagnetism. If it is linear, one can imagine that there's a first order equivalence principle, and so on.
