Closed Loop Interval Ontology

CLOSED LOOP INTERVAL ONTOLOGY
The Digital Integration of Conceptual Form

TzimTzum/Kaballah | Loop definition | Home | ORIGIN

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The Many Forms of Many/One

Universal conceptual form

Invocation

Aligning the vision

Project under development

Evolving and coalescing

Guiding motivation

Why we do this

A comprehensive vision

Ethics / governance / science

Cybernetic democracy

Homeostatic governance

Collective discernment

Idealized democracy

Objectives and strategy

Reconciliation and integration

Reconciliation of perspectives

Holistic view on alternatives

What is a concept?

Definitions and alternatives

Theories of concepts

Compare alternatives

What is truth?

How do we know?

Semantics

How meaning is created

Synthetic dimensionality

Foundational recursive definition

Universal hierarchy

Spectrum of levels

A universal foundation

The closed loop ensemble contains
all primary definitions

Set

Dimensions of set theory

Numbers

What is a number?

Venn diagrams

Topology of sets

Objects in Boolean algebra

How are they constructed?

Core vocabulary

Primary terms

Core terms on the strip

Closed Loop framework

Graphics

Hierarchical models

Digital geometry

Euclid in digital space

The dimensional construction
of abstract objects

Foundational method

The digital integration
of conceptual form

Compositional semantics

Closed loop interval ontology

How it works

Cognitive science

The integrated science of mind

Equality

What does it mean?

Formal systematic definitions

Core terms

Data structures

Constructive elements
and building blocks

Compactification

Preserving data under transformation

Steady-state cosmology

In the beginning

Semantic ontology

Domain and universal

Foundational ontology

A design proposal

Coordinate systems

Mapping the grid

Articles

From other sources

Arithmetic

Foundational computation

Plato's republic and
homeostatic democracy

Perfecting political balance

Branching computational architecture

Simultaneity or sequence

Abstract math and HTML

Concrete symbolic representation

All knowledge as conceptual

Science, philosophy and math
are defined in concepts

Does the Closed Loop
have an origin?

Emerging from a point

Theme
Universe - mathematics
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Definition / description

In mathematics, and particularly in set theory, category theory, type theory, and the foundations of mathematics, a universe is a collection that contains all the entities one wishes to consider in a given situation.

In set theory, universes are often classes that contain (as elements) all sets for which one hopes to prove a particular theorem. These classes can serve as inner models for various axiomatic systems such as ZFC or Morse–Kelley set theory. Universes are of critical importance to formalizing concepts in category theory inside set-theoretical foundations. For instance, the canonical motivating example of a category is Set, the category of all sets, which cannot be formalized in a set theory without some notion of a universe.

In type theory, a universe is a type whose elements are types.

Mon, Feb 15, 2021