Rayleigh’s principle for one-way wave propagation asserts that the average kinetic energy in the wave must be equal to the average potential energy, i.e., 

Here, u is the horizontal particle velocity, v the vertical particle velocity, and p the pressure. This energy conservation formula can be used to determine a “natural” reference wavenumber k₀ for propagation in any of the parabolic approximations to the Helmholtz equation.

a. Derive an approximate expression for k₀ in terms of integrals of field quantities satisfying the standard parabolic

b. For a single mode propagating in an ideal, pressure-release waveguide show that the “natural” wavenumber found in (a) equals the modal eigenvalue.

c. Discuss the implications of multi-mode propagation for the choice of a reference wavenumber, particularly in lossy environments with mode stripping.

d. Consider next the alternative PE form given by Derive the approximate expression for k₀ and show that for single-mode propagation in an ideal, pressure-release waveguide the “natural” wavenumber now equals the water wavenumber.