In a de Broglie wave, what is it that is waving?
Shripathee, it is the “quantum potential” (potential energy per unit mass) that is waving in a de Broglie wave. And the gradient of the quantum potential is the “quantum force” that acts together with the field forces on the particle to determine its motion. The complete description of the dynamics of a quantized particle requires that the quantum force be included in the forces acting upon it. See, for example, Feynman’s Lectures on Physics Volume III, Section 21-8 ("The dynamics of superconductivity"), in which Feynman solves the Schrödinger equation for the equations of motion of an electron in a superconducting fluid.
Louis de Broglie wrote a series of papers in his latter years in which he revisited his earlier work and showed that the quantum mechanical equations have a “double solution”, as de Broglie described it--see, for example, "The Reinterpretation of Wave Mechanics", by Louis de Broglie, Foundations of Physics, pg 5, 1970, see also his paper, "Theory of the Double Solution", by Louis de Broglie). On one hand, the square of the amplitude of the wave function represents the probability of finding the particle in a little volume of space (an interpretation first discovered by Born after Schrödinger discovered his famous quantum mechanical equation), but on the other, the wave function also describes a concrete physical potential field (potential energy per unit mass) in space-time. In these papers, de Broglie shows that when the quantum potential acts upon a particle such as an electron, the proper rest mass of the particle and the quantum potential fluctuate together. This fluctuating mass gives rise to a fluctuating force (the quantum force) on the particle according to Newton’s law F = d(Mv)/dt, where the derivative is taken also on the variable M.
It is interesting to note, by the way, that the wavelength of the de Broglie wave of a rest mass particle is analogous to the modulation envelope wavelength of a standing wave set up between two mirrors that are moving together through space. And the particle’s group velocity is analogous to the velocity of the standing wave apparatus--see, for example, "Moving Standing Wave and deBroglie Type Wavelength", by Walter Roy Mellen, American Journal of Physics, Feb 1973, Volume 41, pg 290.
