Quantum Hall Resistance and Quantum Hall Plateaus from Edge State Quantization

Abstract

Despite the extensive literature on the quantum Hall effect (QHE), a direct derivation of the phenomenological formula xy = h/e2 from first principles has remained elusive. In this work, we revisit the Landau and Landauer-B\"uttiker formalisms and impose hard-wall boundary conditions on the wavefunction, an essential but often overlooked constraint. This condition quantizes the guiding center position and the longitudinal wave number kx, leading naturally to a discrete number of edge states without invoking energy bending. We derive the Hall resistance directly and recover the standard result xy = h/e2, along with an explicit expression for the filling factor in terms of the Fermi energy and magnetic field. The resulting resistance steps reproduce the observed QHE plateaus and match experimental data without fitting parameters.