Enter the content which will be displayed in sticky bar

Jeff Baugher
Subject: Integral Geometry: A Geometric, Notational and Natural Philosophy Counterargument To General Relativity

Date: 2016-04-02 Time: 10:00 - 11:40 US/Eastern (7 years 7 months ago)
America/Los Angeles: 2016-04-02 07:00 (DST)
America/New York: 2016-04-02 10:00 (DST)
America/Sao Paulo: 2016-04-02 11:00
Europe/London: 2016-04-02 14:00
Asia/Colombo: 2016-04-02 19:30
Australia/Sydney: 2016-04-03 01:00 (DST)

Where: Online Video Conference
Recording Playback
This video conference used Fuzemeeting.
The meeting can be replayed by clicking this link:


In this presentation we describe a framework for building new versions of physics equations using measurement of the changes of relative area and Natural Philosophy.  We consider the similarity of directional derivatives and Poisson's equation, utilized in mainstream physics as Force and Energy (density), to a new concept of measuring the changes of infinitesimal slices of area derived from one relative and one absolute line segment.  We find that the concept and notation for scalar fields can be derived from these infinitesimal slices of area.  We then further consider the outcome of measuring changes of slices of area derived from two relative line segments only.  We show that the geometrical properties of these relative slices of area, if functionally related, bear a marked and exceedingly disturbing similarity to concepts contained within mainstream "Differential Geometry" and, as a result, General Relativity.