Vector-Tensor-Scalar Geometry Applied to Quantum Computers, Consciousness and Topological Materials

Abstract

Each part is intended to stand alone, and does not require reading of other parts. Part 1 - Quantum Computers Use Vector-Tensor-Scalar Geometry Quantum computers seem to use what I call vector-tensor-scalar geometry (explained in first diagram and paragraph). This article relates the Higgs boson/field to the supposedly unrelated graviton/gravitational field (together with the latter's constant interaction with the photon/electromagnetic field). And using General Relativity’s modification of Newtonian gravity, it explores the possibility of gravity producing mass instead of the currently accepted view that mass causes gravity. The parallelogram used in the geometry mentioned a moment ago can be converted by computer into the shape of Earth’s elliptical orbit, which means the vector/tensor/scalar relationship applies to this planet. The geometry also means finiteness corresponds to the scalar Higgs boson while infinity corresponds to the Higgs field which is a field of energy that is thought to exist in every region of the universe. Part 2 - Vector-Tensor-Scalar Geometry, and Consciousness as An Excitation of the Universal Field Those who are familiar with physics are taught that the graviton (the hypothetical elementary particle that is thought to be the carrier of the gravitational field) is unrelated to that elementary particle produced by the quantum excitation of the Higgs field and controversially nicknamed the “God Particle” - the Higgs boson. According to the vector-tensor-scalar geometry presented here, the particles are indeed related: as - inextricably - are the gravitational field and the allegedly unrelated Higgs field, a field of energy that is thought to exist in every region of the universe. This idea of consciousness as an excitation of the universal field agrees with mathematical physicist Roger Penrose and anesthesiologist Stuart Hameroff that consciousness involves quantum behaviour and quantum gravity effects. Part 3 – Topological Materials, Unnatural Fermions, Geometry, the Higgs Boson/Field, and the Higgs-like Body/Consciousness I found the concept of topological materials (topological insulators, topological superconductors) totally mystifying until I related them to universal topology. After writing about space-time topology, the down-to-earth application called topological materials is addressed. The General Theory of Relativity will be useful in this article. Specifically – the analogy of the theory’s curvature of space-time to a rubber sheet.