Some of the material in is restricted to members of the community. By logging in, you may be able to gain additional access to certain collections or items. If you have questions about access or logging in, please use the form on the Contact Page.
Some of the material in is restricted to members of the community. By logging in, you may be able to gain additional access to certain collections or items. If you have questions about access or logging in, please use the form on the Contact Page.
This folder contains rough calculations with action-angle variables. These are used to solve for rotation or oscillation without calculating the equations of motion.
A continuation of the notes from folder 8 written at a later date. The notes at the end of the proof shows how the invariant integral relates to wave function.
Much of this folder seems to be related to how a vacuum effects the velocity of a wave. Dirac points out that the the vacuum has a large effect on the velocity. Some other topics discussed in the folder are,
This shows four different bases for what appears to be lagrangian field theory. The bases include the different functions of each base and what purpose the different bases serve.
This is a proof of how homogeneous moments relate to classical mechanics equations, in specific the Hamilton-Jacobi equation. Includes an example of harmonic oscillators.
A large group of calculations on a variety of topics. Self energy of photons using angular acceleration, wave function, fundamental interactions at high energy, Lorentz's force, and Maxwell's equation are all topics present within the...
This folder is a large melting pot of anything and everything including lecture notes for displacement caused by rotation, proofs of linear and quadratic equations, and groups of proofs that have no explanations.
This is a compilation of many different topics including math, science, physics, and engineering with varying topics such as thermodynamics, wave functions, genetics, transfer of heat and transfer of energy.
Notes on waves inside Conformal Space, which comes from conformal geometry, as well as proofs that highlight the breakdown of Conformal spaces and how the waves then fit inside them. This folder also includes a section on developments in...
Non-Orthogonal Wave Functions is a repeating topic in this folder. Orthogonality is the relation of two lines (waves in this case) that come to a right angle. What seperates this from perpendicular lines (waves) is that orthogonal lines...
A set of proofs on a variety of subjects in quantum mathematics and physics, including moments applied by waves, interaction between protons and neutrons and their impact on the calculation of nuclear forces, and how the total surface...
A group of letters from multiple researchers from the University of Newcastle, U.S. Naval Observatory, and the University of Louvain. Also included are some of Dirac's responses to these letters. All letters are in regard to Dirac's...
This folder contains some proofs of how Schrodinger found the bases of wave mechanics, which is a theory that calculates atomic spectra. This folder also discusses the physical reality of waves and the particles within them.
Topics of Interest within this folder are kinematic equations, derivatives, and matrices. On one side of certain groups of documents there are what could be lecture notes for a very basic physics class, while on the back side of the same...
This folder includes a more in depth discussion of some topics that are considered the basis of physics such as equilibrium, surface tension, and the forces behind motion. Dirac uses equations for these ideals that are more common in...
This is a set of proofs for solving for dust with density as a variable, unsure if the variable is the volume of dust, mass of dust, or both on a particular object.
This folder includes notes and proofs on matrices and relativistic theory. The folder also includes notes on wave functions and the movement of electrons in spinor notatio.
This folder contains proofs on the movement of electrons, forces acting upon electrons in a field, and the energy displayed by electrons in a field. There are also physical field functions, proofs for the equations of motion of a...
A set of papers containing calculations, examples, and definitions, most of which are about wave function, a topic in physics relating to quantum mathematics. Most likely used for lecture material.
This folder has multiple topics shown by proofs and definitions, such as the forces applied to a particle in free space, and the momentum created by these forces. There is also a section on how the electrons behave in a field of...
This folder has a variety of subjects, it contains proofs and definitions for topics such as general field theory, factor groups, and motion of a surface by itself.
This folder includes many topics in quantum mechanics such as vectors, spinning particles, quantization notes, and equations of motion. There also seems to be plans for a quantum mechanics lecture and some official Cambridge documents...
The notebook contains proofs of definite integrals of trigonometric series, vector equations, Bessel harmonics and, spherical harmonics. These proofs contain equation examples and the definitions of the different theorems behind the...
This folder deals with spinors that take up more than 2 dimensions, which is called Hilbert Space. The folder has a number of proofs on the vectors that take up an infinite number of dimensions.
The general idea of this folder seems to be based on a matrix code broken down into 4 groups; m_12, m_30, m_1-, and m_2- . This matrix code is then broken down into two different "schemes" which show the proofs and a small explanation...
This folder deals with spinors that take up more than 2 dimensions, which is called Hilbert Space. The folder has a number of proofs on the vectors that take up an infinite number of dimensions.
Some of the material in is restricted to members of the community. By logging in, you may be able to gain additional access to certain collections or items. If you have questions about access or logging in, please use the form on the Contact Page.
