The Functional Communicativity of COVID-19

An Astro-Socio-Biological Multi-Level Informatic Analysis

Mathematical Sciences Research Report Summary on COVID-19 Pandemic

The Mathematics of COVID-19

An Astro-Socio-Biological Analysis A multi-scale entropic analysis of COVID-19 is developed on the micro-biological, meso-social, & macro-astrological levels to model the accumulation of errors during processes of self-replication within immune response,...

read more

Limits, the First Step into Calculus

The concept of a limit is the central idea that underlies calculus and is the unifying mechanism that allows for differentials and integrals to be related. Calculus is used to model real-life phenomena in the language of mathematics. Anything that involves a rate of...

read more

What is an Integral?

The integral is a method to find the area under a curve. It is formulated as a sum of many smaller areas that approximate the area of the curve, all added together to find the total area. We let the number of areas under the curve approach infinity so the...

read more

Continuous Democracy System

The future of participatory direct democracy, as advocated by Bernie Sander, lies in information systems of coordination that allow deep public opinion to be integrated within a whole reflexive administrative state.  The ideal of a fully adaptive and sensitive...

read more

Quantum Computing Democracy

Consider the binary computer.  All bits have one of two states either 0 or 1, symbolic for 'off' and 'on' with reference to a circuit as symbolic of a 'fact of the world' propositionally, A is true or false.  In a quantum computer, the states may be occupied in...

read more

Navier-Stokes is hard?

I was recently asked the question; "How can the Navier-Stokes equations both describe our observable world and not be known to always have solutions in 3D?" For those that don't know, the Navier-Stokes (NS) equations represent a mathematical model that describes...

read more

Pin It on Pinterest

Share This