I wonder about Kirchhoff's first law in charged conductors. Consider:
$$j = \sigma E \implies \nabla \cdot j = \sigma (\nabla \cdot E) = \frac{\sigma \rho}{\epsilon_0}$$
This means that Kirchhoff's first law does not hold true if the conductor is charged ($\rho \neq 0)$
But is not that exactly the case with any conductor connected to a capacity?
Are the surface charges not exactly that excess in charge that create the electric field.
See also.
You are correct, Kirchhoff's circuit laws only apply when the lumped circuit approximation is valid and one of the assumptions of the lumped circuit approximation is that no charge accumulates in the conductors connecting the circuit elements.
However, in case there is significant charge accumulation in the conductors, circuit theory can easily account for this by modeling parasitic capacitor(s) at the appropriate points in the circuit.
But is not that exactly the case with any conductor connected to a capacity?
Usually the charge accumulates significantly only on the "plates" of the capacitors. These are considered part of the capacitor element and not part of the interconnect wiring, so charge accumulation here presents no special issue in terms of using KCL to solve a circuit. The charge that accumulates on the capacitor plate is simply accounted for as a current in or out of the capacitor element.
There is a way to state KCL without stipulations regarding charge accumulation. Rewrite the continuity equation (or take the divergence of Ampere's law) to get $$\mathbf\nabla\cdot\left(\mathbf j + \frac{\partial \mathbf D}{\partial t}\right)=0.$$ $\partial \mathbf D/\partial t$ is the so-called displacement current density. If we take $\mathbf j +\partial \mathbf D/\partial t$ to be "the current density", thus including the displacement current in what we call "current", then the total current leaving any closed surface is always zero.
Most famously, when current is flowing into one plate of a capacitor and out the other plate, displacement current is present between the plates of the capacitor. Taking this into account partially justifies that language of "current flowing through a capacitor". On the other hand, displacement current can be considered negligible in conductors (and zero at steady-state), so there is no real ambiguity in which version of current we speak of in practice.
When there is a charge in a conductor, then the net supplied voltage will be the algebraic sum of the voltage source and the voltage because of the charge in the conductor. The net voltage source will be equal to the net voltage drop and is the Kirchhoff’s Voltage Law (KVL).
