Cutoff wave-number in wave-guides

Question

When defining the dispersion relation in a waveguide we have an equation that also includes a cutoff wave-number. This cutoff wave number depends on the geometry of the waveguide.

$$ k_z = \sqrt{\omega^2/c^2 - (m\pi/a)^2 - (n\pi/b)^2}, $$ where $a,b$ are the dimensions of the waveguide and $n,m$ are the mode numbers.

I understand the mathematics behind this that when $k_z > \omega/c$ then $k_z$ (wavenumber) becomes imaginary and we get an exponential decay of the electric field. But I am not able to understand it intuitively.

What is so special about a waveguide geometry that below certain frequency we get no propagation of power but just an exponential decay in the waveguide?

Can this be explained using the phase relation between reflected and incident waves? Below cutoff frequency will there still be interference between incident and reflected wave?

What exactly is happening between the reflected and incident wave that we get an exponential decay when we excite a waveguide below cutoff frequency?

Answer 1

We always talk about the cutoff frequency of a particular mode. Have in mind that, when we talk about modes, we are referring to particular solutions to the Helmholtz Equation in a specific scenario with some boundary conditions that help us to determine these solutions.

Below the cutoff frequency essentially your wave cannot propagate because it is not fulfilling the necessary conditions for propagating inside your structure. As Jerrold pointed out in one of the comments, you have to trust the mathematics