Observerse: Difference between revisions

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The '''observerse''' is the central mathematical object in the [[Theory of Geometric Unity]]. It is a mapping from a four-dimensional manifold \(X^4\) to a manifold \(Y\), from which the theory is built. There are four different constructions of the observerse: exogenous, bundle-theoretic, endogenous, and tautological. Each generates a possible Geometric Unity theory.
The '''observerse''' is the central mathematical object in the [[Theory of Geometric Unity]]. It is a mapping from a four-dimensional manifold \(X^4\) to a manifold \(Y\), which replaces Einstein's spacetime. There are four different constructions of the observerse: exogenous, bundle-theoretic, endogenous, and tautological. Each generates a possible Geometric Unity theory.


== Exogenous ==
== Exogenous ==
In the observerse's exogenous construction, the manifold \(X^4\) includes into any manifold \(Y\) of four dimensions or higher which can admit it as an immersion.
$$ X^4 \hookrightarrow Y $$


== Bundle-Theoretic ==
== Bundle-Theoretic ==
In the observerse's bundle-theoretic construction, the manifold \(Y\) sits over \(X^4\) as a fiber bundle.


== Endogenous ==
== Endogenous ==
In the observerse's endogenous construction, \(Y\) is the space of metrics on the manifold \(X^4\).


== Tautological ==
== Tautological ==
In the observerse's tautological construction, the manifold \(X^4\) equals \(Y\).
$$ X^4 = Y $$


[[category:Ericisms]]
[[Category:Geometric Unity]]
[[Category:Geometric Unity]]
[[Category:Ericisms]]

Revision as of 01:16, 1 April 2021

The observerse is the central mathematical object in the Theory of Geometric Unity. It is a mapping from a four-dimensional manifold \(X^4\) to a manifold \(Y\), which replaces Einstein's spacetime. There are four different constructions of the observerse: exogenous, bundle-theoretic, endogenous, and tautological. Each generates a possible Geometric Unity theory.

Exogenous

In the observerse's exogenous construction, the manifold \(X^4\) includes into any manifold \(Y\) of four dimensions or higher which can admit it as an immersion.

$$ X^4 \hookrightarrow Y $$

Bundle-Theoretic

In the observerse's bundle-theoretic construction, the manifold \(Y\) sits over \(X^4\) as a fiber bundle.

Endogenous

In the observerse's endogenous construction, \(Y\) is the space of metrics on the manifold \(X^4\).

Tautological

In the observerse's tautological construction, the manifold \(X^4\) equals \(Y\).

$$ X^4 = Y $$