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.
None of the writing found in this folder is in Dirac's handwriting. It is assumed to be Erwin Schrodinger's. This folder contains a partial letter from Schrodinger to Dirac about a formula for stellar mass. The letter includes the proof...
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...
Notes and proofs from P.A.M. Dirac on the consistency of the "Q" gravitational equation, which are compared to the findings of Schrodinger to better represent the consistency. Also contains an essay from Jagannathan Gomatam and F. Rohrlich.
Proofs and theories relating to relativistic dynamics by P.A.M. Dirac, covering topics from single particle dynamics, free particles, and classical mechanics of particles.
Notes from Paul Dirac covering multiple subjects, such as rotations in real space, e-vectors, and theory used to break down the ket matrix for the normal state.
Proofs from Paul Dirac covering symplectic space, transformations in symplectic space, bounded vectors and what they represent, and that there is a vector of infinite length for an unbounded matrix.
Proofs by Paul Dirac for the combination of theories in order to relate them back to particles and how they behave in waves. Some theories and laws include: classical electron equation of motion in de Sitter space, Riess Theory, ...
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.
