Waves Bundle Comparison May 2026

[ \psi(x,t) = \frac1\sqrt2\pi \int_-\infty^\infty A(k) , e^i(kx - \omega(k)t) , dk ]

For an ideal flexible string, ( \omega = v|k| ) (linear, nondispersive). waves bundle comparison

[ \omega = c|k| \quad \text(linear, nondispersive) ] From a stone dropped in water to a

wave packet, dispersion, group velocity, Schrödinger equation, electromagnetic pulse, mechanical wave 1. Introduction A wave bundle (or wave packet) is a superposition of multiple sinusoidal waves with slightly different frequencies and wavenumbers, resulting in a spatially and temporally localized disturbance. From a stone dropped in water to a femtosecond laser pulse and an electron’s probability density, wave bundles are ubiquitous. integrate to get [ |\psi(x

Starting from Gaussian wave packet at ( t=0 ): [ \psi(x,0) = \left( \frac12\pi\sigma_0^2 \right)^1/4 e^-x^2/(4\sigma_0^2) e^ik_0x ] Fourier transform gives ( A(k) \propto e^-\sigma_0^2 (k-k_0)^2 ). Using ( \omega = \hbar k^2/(2m) ), integrate to get [ |\psi(x,t)|^2 = \frac1\sqrt2\pi , \sigma(t) e^-(x - v_g t)^2/(2\sigma(t)^2), \quad \sigma(t) = \sigma_0 \sqrt1 + \left( \frac\hbar t2m\sigma_0^2 \right)^2 ] Hence width grows unbounded as ( t \to \infty ). ∎