This allows a reinterpretation of as a thermodynamic artifact of angular momentum conservation across boundaries of a connected hyperspherical manifold: eff=bare+torsion+exchange.\Lambda_{\text{eff}} = \Lambda_{\text{bare}} + \Lambda_{\text{torsion}} + \Lambda_{\text{exchange}}.
In this view, torsion acts as a balancing agent, dynamically adjusting local geometry to maintain a finite effective cosmological constant, reconciling QFT and cosmological measurements.
6.2 Hyperspherical Embedding and Layer Cosmology
We extend the model by hypothesizing that our universe is a 3-hypersphere () embedded in a higher-dimensional rotational manifold---analogous to how a 2-sphere may rotate in 3-space.
Let:
The universe be described by a hyperspherical metric with global topology S3S^3,
The rotation axis of the universe correspond to an angular coordinate in a non-observable dimension (e.g., in a compactified 5th or 6th dimension),
The multiverse be modeled as a stacked or foliated collection of such rotating universes, each influencing others via geometric junction conditions or torsion flux exchange.
This layer cosmology perspective:
Supports preferred-frame effects observable as cosmic anisotropy,
Offers a framework for interpreting large-scale CMB anomalies as inter-universe geometric interference,
