arkajad said:For a starter you can check this: http://www.scholarpedia.org/article/Path_integral" , but there are several different approaches. The class of admissible paths depends on what you want to integrate. For instance you will find a sentence like this:
"This has the effect of restricting the integration to paths that satisfy a Hölder condition of order 3/2 and are thus differentiable, in such a way that expectations values with dq/dt are defined."
The Feynman integral over histories, also known as the path integral, is a mathematical tool used in quantum mechanics to calculate the probability of a particle moving from one position to another in a given amount of time. It takes into account all possible paths that the particle could take, rather than just considering the most likely path.
The Feynman integral is calculated by summing up the contributions from all possible paths that a particle could take, each weighted by a complex phase factor. This involves breaking the time interval into small segments and considering all possible positions that the particle could occupy at each segment.
The Feynman integral provides a way to express the fundamental principles of quantum mechanics, such as wave-particle duality and uncertainty, in a mathematical form. It also allows for the calculation of amplitudes and probabilities of quantum processes, making it a powerful tool in theoretical physics.
While the Feynman integral is a useful tool, it does have limitations. It is difficult to calculate for systems with more than a few particles, and it becomes increasingly complex for systems with interactions between particles. Additionally, it does not take into account the effects of gravity.
The Feynman integral has been applied in a wide range of fields, including quantum field theory, condensed matter physics, and cosmology. It has also been used to develop new theories, such as the sum-over-histories approach to quantum gravity. It continues to be an essential tool in theoretical physics research.