Bill_K said:What you've quoted is <O> for the case where the system is in an incoherent mixture of |Su> and |Sd>. This would be a classical mixture, like heads and tails on a coin, and is represented by a density matrix rather than a wavefunction.
More typically what we mean by a mixed state is a coherent mixture, |S> = A |Su> + B |Sd>, in which case the expectation value <S|O|S> will need to include interference terms A*B <Su|O|Sd> and B*A <Sd|O|Su>.
That's true only if your states are eigenstates of O (so the interference terms vanish).LostConjugate said:Can someone explain what the difference is between the expectation value of an observable in a pure vs a mixed state. The equations are identical. For example with spin up and down [tex]|A|^2<S_u|O|S_u> + |B|^2<S_d|O|S_d>[/tex]
kith said:That's true only if your states are eigenstates of O (so the interference terms vanish).
The interference term is a mathematical concept used in quantum mechanics to describe the interaction between two or more particles. It represents the combined effect of all possible paths that the particles can take, and it can either amplify or cancel out the overall probability of the particles' behavior.
The interference term is calculated using the mathematical formula for wave interference, where the amplitudes of the possible paths are added together and squared to find the total probability of the particles' behavior. This calculation involves complex numbers and can be quite complicated for systems with multiple particles.
Interference in quantum systems is caused by the wave-like nature of particles, which allows them to exist in multiple states or locations simultaneously. When these particles interact with each other, their wave functions can overlap and interfere, resulting in the interference term.
Yes, the interference term can be controlled through various techniques such as manipulating the environment or changing the properties of the particles. This allows scientists to study and harness the effects of interference for various applications in quantum computing, cryptography, and other fields.
The interference term can have a significant impact on measurements and observations in quantum systems. It can cause the behavior of particles to appear random or unpredictable, and it can also affect the accuracy and precision of measurements. Scientists must carefully consider and account for the interference term when interpreting experimental results in quantum mechanics.