Download
1 / 37
720 likes | 2.61k Views
Phase Velocity and Group Velocity. Depinder Singh Assistant Professor of Physics Govt. College Ropar. Particle ______________________________. Our traditional understanding of a particle… “Localized” - definite position, momentum, confined in space. Wave ____________________________.
E N D
Phase Velocity and Group Velocity Depinder Singh Assistant Professor of Physics Govt. College Ropar
Particle______________________________ Our traditional understanding of a particle… “Localized” - definite position, momentum, confined in space
Wave____________________________ Our traditional understanding of a wave…. “de-localized” – spread out in space and time
Waves Normal Waves • are a disturbance in space • carry energy from one place to another • often (but not always) will (approximately) obey the classical wave equation Matter Waves • disturbance is the wave function Y(x, y, z, t ) • probability amplitude Y • probability density p(x, y, z, t ) =|Y|2
How do we associate a wave nature to a particle?___________________________________ What could represent both wave and particle? Find a description of a particle which is consistent with our notion of both particles and waves…… • Fits the “wave” description • “Localized” in space
____________________________________ A “Wave Packet” How do you construct a wave packet?
What happens when you add up waves?________________________________ The Superposition principle
Adding up waves of different frequencies.....____________________________________
Constructing a wave packet by adding up several waves …………___________________________________ If several waves of different wavelengths (frequencies) and phases are superposed together, one would get a resultant which is a localized wave packet
A wave packet describes a particle____________________________ • A wavepacket is a group of waves with slightly different wavelengths interfering with one another in a way that the amplitude of the group (envelope) is non-zero only in the neighbourhood of the particle • A wave packet is localized – a good representation for a particle!
Wave packet, phase velocity and group velocity ____________________________ • The spread of wavepacket in wavelength depends on the required degree of localization in space – the central wavelength is given by • What is the velocity of the wave packet?
Wave packet, phase velocity and group velocity • The velocities of the individual waves which superpose to produce the wave packet representing the particle are different - the wave packet as a whole has a different velocity from the waves that comprise it • Phase velocity: The rate at which the phase of the wave propagates in space • Group velocity: The rate at which the envelope of the wave packet propagates
Phase velocity • Phase velocity is the rate at which the phase of the wave propagates in space. • This is the velocity at which the phase of any one frequency component of the wave will propagate. • You could pick one particular phase of the wave and it would appear to travel at the phase velocity. • The phase velocity is given in terms of the wave's angular frequency ω and wave vectork by
Group velocity Group velocity of a wave is the velocity with which the variations in the shape of the wave's amplitude (known as the modulation or envelope of the wave) propagate through space. The group velocity is defined by the equation where: vg is the group velocity; ω is the wave's angular frequency; k is the wave number. The functionω(k), which gives ω as a function of k, is known as the dispersion relation.
Velocity of De-Broglie Waves-Phase velocity • Moving material particle-De broglie said a wave is associated which travel with the same velocity as that of the wave. • Let De-broglie wave velocity is W, so Vp or W=
Phase Velocity - continued • we know that =h/mv • From Planck`s Law E = h • From mass energy relation E = mc2 2
Phase Velocity - continued • h = mc2 = mc2/h W = Therefore W= mc2/h X h/mv • W = C2/v • So Particle velocity must be less than the velocity of light.W > c • We can say that De-Broglie waves must travel faster than the velocity of light.
The group velocity is the velocity of a pulse of light, that is, of its irradiance. While we derived the group velocity using two frequencies, think of it as occurring at a given frequency, the center frequency of a pulsed wave. It’s the velocity of the pulse. When vg = vf, the pulse propagates at the same velocity as the carrier wave (i.e., as the phase fronts): z This rarely occurs, however.
When the group and phase velocities are different… More generally, vg≠vf, and the carrier wave (phase fronts) propagates at the phase velocity, and the pulse (irradiance) propagates at the group velocity (usually slower). The carrier wave: The envelope (irradiance): Now we must multiply together these two quantities.
Differences in speed cause spreading or dispersion of wave packets
The group velocity is the speed of the wavepacket The phase velocity is the speed of the individual waves Phase velocity = Group Velocity The entire waveform—the component waves and their envelope—moves as one. non-dispersive wave. Phase velocity = -Group Velocity The envelope moves in the opposite direction of the component waves. Phase velocity > Group Velocity The component waves move more quickly than the envelope. Phase velocity < Group Velocity The component waves move more slowly than the envelope. Group Velocity = 0 The envelope is stationary while the component waves move through it. Phase velocity = 0 Now only the envelope moves over stationary component waves.
This gives us the relation between Phase velocity and Group velocity
This gives us the relation between Phase velocity and Group velocity
Phase Velocity for a massive particle and massless Particle phase velocity does not describe particle motion
