flightfacilities's definitions
Postulation that low-IQ people are more dishonest than high-IQ people.
Assertion that societal stability is contingent on high-IQ people remaining honest.
Assertion that societal stability is contingent on high-IQ people remaining honest.
Interiography argues that religion makes society stable because it prevents smart people from engaging in dishonesty.
by flightfacilities November 28, 2020

Planar as circumferentialized by an infinite^infinite number of lines rotating around a radial center.
Grammetry is the fundamental quantum plane.
by flightfacilities December 4, 2020

The irony of exploitation being regularized becoming self-similar even though the agents or elements being exploited are of a foreign origin.
Xenotransploitation regularizes the exploitation of marginalized vectors such that the vectors become regularized into an infinitely long line that is comprised of discrete parts between the uncountable set of supply chains and the countable set of features on the skeuomorph of a function.
Xenotransploitation leads to the conclusion of transplexity: resources can be infinitely assigned even though the supply-demand ratios are discrete...
Xenotransploitation leads to the conclusion of transplexity: resources can be infinitely assigned even though the supply-demand ratios are discrete...
by flightfacilities May 6, 2022

A model which states that Godel's incompleteness theorem is unable to count the second-set of-points in a non-Tarski object.
A Tarski object has two sets of points; one inside of the object and another set on the surface of the object. Boolean science tells us science cannot count the second set of points if they are inside of the shape.
by flightfacilities February 21, 2022

The paradigm that the limina has a 1-to-1 relationship with the Fauvic (internal) spaces of the Fauvic point.
In analytical meta-nihilism; the Fauvic-internal corners have a 1-to-1 relationship with the uncountable group of pseudorandom numbers.
Metafrequentism is a response to the question of whether an uncountable number of Fauvic corners have a 1-to-1 relationship with the perimeter of ONE pseudorandom number.
The answer is yes with respect to the pseudorandom prime; a liminal number.
Metafrequentism is a response to the question of whether an uncountable number of Fauvic corners have a 1-to-1 relationship with the perimeter of ONE pseudorandom number.
The answer is yes with respect to the pseudorandom prime; a liminal number.
by flightfacilities May 12, 2022

The point of hyper-irony which contains an uncountable number of internal corners and an infinite number of avatars (trans-meta points) on its exterior.
The interior corners are actually transitional colors (of uncountable number) and the shine-points are hypercolors.
The Fauvic point is transparency in a point.
The interior corners are actually transitional colors (of uncountable number) and the shine-points are hypercolors.
The Fauvic point is transparency in a point.
The Fauvic point describes the seat of meta-nihilism.
It is an uncountable number of Fauvic corners surrounded by an infinite number of hypercolors which are infinitely orthogonal to the line-of-neonihilism national deficit-value of debt backed currency.
It is an uncountable number of Fauvic corners surrounded by an infinite number of hypercolors which are infinitely orthogonal to the line-of-neonihilism national deficit-value of debt backed currency.
by flightfacilities May 12, 2022

The counting problem is also known as "Tarski's revenge."
It stands alongside two major problems in mathematics called the "compositional-unit problem" and the "unit-of-measurement problem." It is trying to determine how many points there are in an object.
It stands alongside two major problems in mathematics called the "compositional-unit problem" and the "unit-of-measurement problem." It is trying to determine how many points there are in an object.
Tarski's nihilism indicates that infinity plus an uncountable number of exterior points equate to an infinite number of points.
This is the solution to the counting problem.
A NON-Tarski object has the uncountable points on the INTERIOR surface with the infinite points; indicating that Godel's incompleteness theorem is stating that mathematics is unable to count the uncountable set of Tarski-points if they lie to the interior of the surface.
This is the solution to the counting problem.
A NON-Tarski object has the uncountable points on the INTERIOR surface with the infinite points; indicating that Godel's incompleteness theorem is stating that mathematics is unable to count the uncountable set of Tarski-points if they lie to the interior of the surface.
by flightfacilities February 21, 2022
