Share Email Print
cover

Proceedings Paper

Science and mathematical duality
Author(s): Francis T. S. Yu
Format Member Price Non-Member Price
PDF $17.00 $21.00

Paper Abstract

Every physical science existed within our temporal subspace must be temporal (i.e., t>0); otherwise it is a virtual (or fictitious) science as mathematics does. The burden of a scientific postulation is to proof it is existed within our universe and then find the solution. In this article we will show that, there exists a duality between science and mathematics in which any scientific postulation has to be shown it is satisfied all the boundary conditions within our temporal universe, before accepting it as a real physical science. Otherwise their virtual solution is not guarantee it is a physical science. One of the important conditions must be the causality condition (i.e., t>0) for which to confirm a solution is temporal and existed within our universe. Since the entire fundamental laws of science are mathematics, which includes the Maxwell equations, as well the Schrödinger equation, without the imposition of causality condition we are not sure that the solution is a physically real science within our universe. Since we have shown Schrödinger quantum mechanics is timeless, we will show what would happen if his timeless superposition principle is plunging within a temporal space. In which we have found that, timeless space is a virtual-abstract space that only existed in an absolute empty space with zero time (i.e., t = 0). And we have seen that only quantum physicists can implant a physical model into an empty subspace, as Schrödinger did. But empty space and temporal space are mutually excluded.

Paper Details

Date Published: 18 November 2019
PDF: 16 pages
Proc. SPIE 11188, Holography, Diffractive Optics, and Applications IX, 1118802 (18 November 2019); doi: 10.1117/12.2535812
Show Author Affiliations
Francis T. S. Yu, The Pennsylvania State Univ. (United States)


Published in SPIE Proceedings Vol. 11188:
Holography, Diffractive Optics, and Applications IX
Yunlong Sheng; Changhe Zhou; Liangcai Cao, Editor(s)

© SPIE. Terms of Use
Back to Top
PREMIUM CONTENT
Sign in to read the full article
Create a free SPIE account to get access to
premium articles and original research
Forgot your username?
close_icon_gray