JQIS  Vol.4 No.3 , September 2014
The Principles of Causal Conspiracy
Abstract: The human mind understands logical processes and causality and formulates theories based on logical descriptions of empirical evidence. The Principles of Causal Conspiracy is based on defining information as logical charges similar to electric charges. Such information charges can be modeled in the vacuum of a quantum probability firmament as symmetry of quantum charges with a zero net charge. Observation of a state lifts one of these charges in a Möbius transformation from a multipolar field of possibilities that maximizes a local monopole field that is observable. In the first of several papers, I introduce new and profound principles, the Principles of Causal Conspiracy, to provide a consistent epistemology for quantum theory, relativity theory and all the known sciences.
Cite this paper: Anthony, M. (2014) The Principles of Causal Conspiracy. Journal of Quantum Information Science, 4, 137-172. doi: 10.4236/jqis.2014.43016.

[1]   Needham, T. (1997) Visual Complex Analysis. Clarendon Press, Oxford.

[2]   Møller, C. (1952) The Theory of Relativity. 2nd Edition, Oxford University Press, Delhi, 220.

[3]   Anthony, M.M. (2013) The Principles of Causal Conspiracy Book 1. Tate Publishing, Mustang.

[4]   Baaz, M., Papadimitriou, C., Scott, D., Putnam, H. and Harper, C., Eds. (2011) Kurt Gödel and the Foundations of Mathematics: Horizons of Truth. Cambridge University Press, Cambridge.

[5]   Genet, C., Intravaia, F., Lambrecht, A. and Reynaud, S. (2004) Electromagnetic Vacuum Fluctuations, Casimir and Van der Waals Forces. Annales de la Fondation Louis de Broglie, 29, 311-328.

[6]   Casimir, H.B.G. and Polder, D. (1948) The Influence of Retardation on the London-Van der Waals Forces. Physical Review, 73, 360-372.

[7]   Anthony, M.M. (2013) The Principles of Causal Conspiracy Book 2—A Unification of Mind, Matter, and Science. Tate Publishing, Mustang.

[8]   Jackson, J.D. and Okun, L.B. (2001) Historical Roots of Gauge Invariance. Reviews of Modern Physics, 73, 663-680.

[9]   Knopp, M. (1970) Modular Functions in Analytic Number Theory. Temple University, Chelsea Publishing Company, Vermont.

[10]   Rieger, L. (1951) On Free ℵξ-Complete Boolean Algebras (with an Application to Logic). Fundamenta Mathematicae, 38, 35-52.