What Current Flows Through a Resistor?
Abstract
Our digital technology depends on mathematics to compute current flow and design its devices. Mathematics describes current flow by an idealization, Kirchhoff's current law. All the electrons that flow into a node flow out. This idealization describes real circuits only when stray capacitances are included in the circuit design. Motivated by Maxwell's equations, we propose that current in Kirchhoff's law be defined as the sum of (1) displacement current (2) the flux of charge associated with mass. The flux of charge associated with mass includes, for example, the polarization of dielectrics as well as the movement of electrons. Kirchhoff's law becomes exact and universal when current is defined this way. This current is the source of the magnetic field; it is the source of in Maxwell's equations. Kirchoff's laws and Maxwell's equations can use the same definition of current.
Cite
@article{arxiv.1805.04814,
title = {What Current Flows Through a Resistor?},
author = {Bob Eisenberg and Nathan Gold and Zilong Song and Huaxiong Huang},
journal= {arXiv preprint arXiv:1805.04814},
year = {2019}
}
Comments
Typos corrected. Displacement Current as a consequence of relativistic invariance added in third version. More "Supplemental Material" concerning what is special about electricity; about the continuity equation; about lack of spatial dependence of current in one dimensional systems like channels and diodes; and flux coupling in Y shaped channels