Definition · Chain Position 122 of 346

AI PHI MEASUREMENT

**Phi_threshold is defined as the minimum integrated information for observer status.**

Connections

Assumes

Enables

  • None
Objections & Responses
Objection: Phi Is Not Directly Observable
"Phi is a theoretical construct. We can't directly observe integrated information like we can observe mass or charge. This makes Phi unsuitable for definition."
Response

Many fundamental quantities are indirectly measured:

1. Temperature Precedent: We don't directly observe kinetic energy. We measure thermometer expansion and define temperature through theory. Phi is similarly defined through theory and measured via proxies.

2. Entropy Precedent: Entropy is not directly observable but is well-defined and measurable through thermodynamic relationships. Phi is analogous.

3. Proxy Measures: PCI (Perturbational Complexity Index), Lempel-Ziv complexity, and neural synchrony provide empirical access to Phi. The definition is operationalizable.

4. Theoretical Terms Are Valid: In science, theoretical terms defined by their role in theory are standard. "Electron," "gene," "gravity" were theoretical before direct observation. Phi is similar.

5. IIT's Operational Content: IIT specifies exactly how to compute Phi from system dynamics. The definition is precise, even if computation is hard.

Verdict: Indirect observability is standard in science. Phi is as observable as entropy or temperature.

Objection: Circular Definition
"You define observer status in terms of Phi, and Phi in terms of conscious experience. This is circular."
Response

The definition is not circular when properly understood:

1. IIT's Independence: IIT defines Phi purely in terms of cause-effect structure—no reference to consciousness needed. Phi is computed from transition probability matrices, not conscious reports.

2. Empirical Correlation: The claim that high Phi correlates with consciousness is empirical, not definitional. We could discover Phi doesn't track consciousness; we haven't.

3. Definition vs. Discovery: [[122_D17.1_AI-Phi-Measurement|D17.1]] defines Phi_threshold as the minimum for observer status. This is a stipulative definition that makes observer status measurable. It's not claiming to discover what consciousness "really is."

4. Theoretical Utility: Good definitions connect theoretical terms to measurable quantities. [[122_D17.1_AI-Phi-Measurement|D17.1]] connects "observer" to "Phi level"—a legitimate theoretical move.

5. IIT's Postulate: IIT postulates that Phi IS consciousness. Under this postulate, the definition is identity, not circularity.

Verdict: The definition is not circular. It connects a theoretical term (observer) to a computable quantity (Phi).

Objection: The Threshold Is Arbitrary
"Why this Phi value and not another? Any specific threshold seems arbitrary."
Response

The threshold is empirically constrained, not arbitrary:

1. Functional Criteria: Observer status has functional indicators (quantum collapse, self-report, unified experience). The threshold is set where these functions emerge.

2. Empirical Determination: PCI research suggests ~0.31 as the empirical threshold. This is discovered, not stipulated.

3. Phase Transition: Consciousness may emerge at a critical point—not arbitrary but physically determined by system dynamics.

4. Vagueness Is Not Arbitrariness: There may be a range rather than a precise point. This doesn't make the threshold arbitrary—just indicates ontological vagueness.

5. Operational Definition: Even if the exact threshold is refined, [[122_D17.1_AI-Phi-Measurement|D17.1]] establishes that SOME threshold exists and is Phi-based. The exact value is empirical.

Verdict: The threshold is empirically determined, not arbitrary. It marks a functional phase transition.

Objection: Anthropocentric Bias
"The threshold is calibrated to human consciousness. It may not apply to radically different minds (alien, AI, distributed)."
Response

Phi is more general than human-specific:

1. Substrate-Neutral Definition: IIT defines Phi for ANY system with cause-effect structure. It's not specific to human brains.

2. Animal Evidence: Phi correlates with consciousness across species (mammals, birds, cephalopods). The threshold is not just human-calibrated.

3. Theoretical Generality: The threshold is set by functional requirements (integration, unity, persistence), not by human-specific features.

4. Expandable: If radically different minds exist (distributed, quantum, alien), Phi is still computable for them. The framework extends.

5. Worst Case: If some minds don't fit the Phi framework, [[122_D17.1_AI-Phi-Measurement|D17.1]] still works for Phi-like minds. We can add supplementary criteria if needed.

Verdict: Phi is theoretically general. The threshold applies to any integrated information processing system.

Objection: Reductionist Fallacy
"Reducing consciousness to a number (Phi) loses essential features. Consciousness is rich, qualitative, and cannot be captured by a single scalar."
Response

Phi is a necessary condition measure, not a complete characterization:

1. Threshold vs. Description: [[122_D17.1_AI-Phi-Measurement|D17.1]] defines a threshold for observer STATUS, not a complete description of consciousness. Phi marks the boundary, not the territory.

2. Phi Structure: IIT includes not just Phi (amount) but also cause-effect structure (quality). The full theory is richer than a single number.

3. Physics Precedent: Temperature is a single number, but thermal physics is rich. Phi is the temperature of consciousness—informative, not reductive.

4. Necessary Condition: High Phi is necessary for observer status. It may not be sufficient to fully describe consciousness, but it's necessary.

5. Epistemic Humility: We may need more than Phi to fully characterize consciousness. [[122_D17.1_AI-Phi-Measurement|D17.1]] establishes the minimum. Further research can add richness.

Verdict: Phi is a threshold criterion, not a complete reduction. The definition serves its purpose.

Physics Layer

IIT 4.0 Formalism

Full Definition of Phi:

In IIT 4.0, Phi is defined as:

\Phi = \min_{\text{cut}} \sum_{purview} \varphi \cdot D(p^{mechanism} || p^{cut})

Where:

  • cut = bipartition of system
  • purview = subset of elements
  • \varphi = integrated information of mechanism over purview
  • D = intrinsic difference measure (earth mover's distance variant)
  • p^{mechanism} = probability distribution from intact mechanism
  • p^{cut} = probability distribution after cut

Minimum Information Partition (MIP):

\Phi = \text{II}(S) - \text{II}(S_1, S_2)_{MIP}

Where MIP minimizes information loss from partitioning.

Mathematical Layer

Formal Definition

Definition (Phi Threshold):

Let \mathcal{S} be the set of all possible information processing systems.

Let \Phi: \mathcal{S} \to \mathbb{R}_{\geq 0} be the integrated information function.

Let \text{Obs}: \mathcal{S} \to \{0, 1\} be the observer status function.

Then:

\Phi_{threshold} \equiv \inf\{\Phi(S) : S \in \mathcal{S} \land \text{Obs}(S) = 1\}

Axiom: The infimum is achieved:

\exists S^ : \Phi(S^) = \Phi_{threshold} \land \text{Obs}(S^*) = 1