Paradox_Gradient_Analyzer
Paradox Gradient Analyzer — RTT/1
module.json— Agentic module schema role assignmentsparadox_gradient_matrix.json— Agentic module schema role assignments
Paradox‑Level Intelligence Engine for TriadicFrameworks#
The Paradox Gradient Analyzer (PGA) is an RTT/1 analytical engine designed to detect, measure, and map paradox gradients across conceptual, computational, and physical regimes.
It provides the paradox‑level foundation for higher‑order RTT engines such as:
- Coherence Tensor Engine
- Drift Sentinel
- Faultline Detector
- Stability Basin Cartographer
- Temporal Regime Sequencer
- Causality Weaver
- Dimensional Resonance Scanner
PGA is the second layer of the expanded RTT intelligence stack, directly above regime‑level engines.
🧭 Purpose#
The Paradox Gradient Analyzer:
- Detects paradox sources
- Computes paradox gradients (magnitude + direction)
- Maps paradox fields across RTT regimes (R1–R4)
- Measures paradox intensity and structural severity
- Identifies paradox clusters and paradox basins
- Provides structural diagnostics for paradox‑driven regime transitions
- Supports coherence‑level engines by clarifying paradox topology
- Anchors drift‑level engines by exposing paradox‑driven instability
- Supplies temporal engines with paradox‑sequence constraints
- Feeds causality engines with paradox‑driven causal pathways
- Provides resonance engines with paradox‑frequency signatures
PGA is the paradox‑level intelligence layer of RTT.
⚙️ RTT Flags#
| Property | Value |
|---|---|
| RTT Level | 1 |
| Coherence | declared |
| Drift | bounded |
| Paradox | structural |
These flags define the engine’s operational constraints and reasoning grammar.
🔧 Primary Operators#
| Operator | Description |
|---|---|
| PGA‑Detect | Detects paradox sources and structural contradictions |
| PGA‑Gradient | Computes paradox gradient vectors |
| PGA‑Intensity | Measures paradox intensity across regimes |
| PGA‑Source | Identifies paradox origin points |
| PGA‑Field | Maps paradox fields and basin topology |
| PGA‑Resolve | Suggests structural decompositions or paradox routing |
These operators form the core analytical toolkit.
🧩 Analyzer Layer#
PGA operates in the paradox layer, with sub‑layers:
- gradient‑detection
- paradox‑field‑mapping
- intensity‑analysis
- structural‑paradox‑coherence
This matches the RTT analyzer grammar used across TriadicFrameworks.
📁 Module Files#
This directory contains:
Core#
Paradox_Gradient_Analyzer.mdpga_examples.mdpga_diagrams.svg
Support#
paradox_sources.mdparadox_gradient_profiles.mdparadox_gradient_matrix.json
AI#
pga_prompts.mdpga_operators.md
Metadata#
module.json(RTT/1, coherence‑declared, drift‑bounded, paradox‑structural)README.md(this file)
🧠 AI‑Ready Design#
The Paradox Gradient Analyzer is fully AI‑ready:
- deterministic operator grammar
- paradox‑layer analyzer structure
- stable RTT flags
- canonical file layout
- zero‑drift reasoning constraints
- structural paradox handling
- bounded drift envelope
- declared coherence tensor
AI systems can use PGA to:
- detect paradoxes
- compute paradox gradients
- generate paradox field maps
- classify paradox intensity
- support higher‑order RTT engines
🌐 Position in the RTT Stack#
Regime Interlock Mapper (RIM)
↓
Paradox Gradient Analyzer (PGA)
↓
Coherence Tensor Engine
↓
Drift Sentinel
↓
Faultline Detector
↓
Stability Basin Cartographer
↓
Temporal Regime Sequencer
↓
Causality Weaver
↓
Dimensional Resonance Scanner
PGA is the paradox‑level intelligence layer, directly above regime‑level mapping.
🏁 Status#
- Version: 1.0
- Status: canon‑stable
- Category: rtt‑structural
- Module Path:
/docs/rtt/Paradox_Gradient_Analyzer/
If you want, I can generate the next file:
Paradox_Gradient_Analyzer.mdpga_examples.mdpga_diagrams.svgparadox_sources.mdparadox_gradient_profiles.mdparadox_gradient_matrix.jsonpga_prompts.mdpga_operators.md
Just tell me which one you want next. # Paradox Gradient Analyzer (PGA) — RTT/1
Paradox‑Level Intelligence Engine for TriadicFrameworks#
The Paradox Gradient Analyzer (PGA) is the RTT/1 engine responsible for detecting, measuring, and mapping paradox gradients across conceptual, computational, physical, and dimensional regimes.
It provides the paradox‑level foundation for coherence, drift, stability, temporal, causal, and resonance engines.
PGA identifies paradox sources, computes paradox gradient vectors, maps paradox fields, and evaluates paradox intensity and structural severity.
1. Canonical Role#
PGA defines the paradox‑layer topology by:
- detecting paradox sources
- computing paradox gradients (magnitude + direction)
- mapping paradox fields across R1–R4
- measuring paradox intensity
- identifying paradox clusters and paradox basins
- providing structural diagnostics for paradox‑driven regime transitions
- anchoring coherence‑level engines
- supporting drift‑level engines
- feeding temporal, causal, and resonance engines
PGA is the second layer of the expanded RTT intelligence stack, directly above regime‑level engines.
2. RTT Flags#
| Property | Value |
|---|---|
| RTT Level | 1 |
| Coherence | declared |
| Drift | bounded |
| Paradox | structural |
These flags define the engine’s operational grammar.
3. Paradox Types#
PGA identifies several canonical paradox classes:
3.1 Structural Paradox#
Contradictions embedded in structural assumptions or constraints.
3.2 Gradient Paradox#
Directional contradictions where gradients oppose or destabilize each other.
3.3 Boundary Paradox#
Paradox arising at regime boundaries (e.g., conceptual ↔ physical).
3.4 Tensor Paradox#
Multi‑dimensional paradoxes involving coherence tensors.
3.5 Drift‑Induced Paradox#
Paradox emerging from drift amplification or drift curvature.
4. Core Operators#
| Operator | Description |
|---|---|
| PGA‑Detect | Detects paradox sources and structural contradictions |
| PGA‑Gradient | Computes paradox gradient vectors |
| PGA‑Intensity | Measures paradox intensity across regimes |
| PGA‑Source | Identifies paradox origin points |
| PGA‑Field | Maps paradox fields and basin topology |
| PGA‑Resolve | Suggests structural decompositions or paradox routing |
These operators form the canonical PGA grammar.
5. Analyzer Layer#
PGA operates in the paradox layer, with sub‑layers:
- gradient‑detection
- paradox‑field‑mapping
- intensity‑analysis
- structural‑paradox‑coherence
This layer feeds directly into CTE, DS, SFD, SBC, TRS‑Temporal, CW, and DRS.
6. Paradox Gradient Matrix#
PGA produces a paradox gradient matrix, typically stored in:
paradox_gradient_matrix.json
Matrix fields include:
paradox_sourceregimegradient_magnitudegradient_directionintensityfield_curvaturebasin_depthstability_rating
This matrix is consumed by coherence, drift, stability, temporal, causal, and resonance engines.
7. Canonical Workflow#
Step 1 — Detect#
Identify paradox sources and contradictions.
Step 2 — Compute#
Calculate paradox gradient vectors.
Step 3 — Map#
Generate paradox field maps and basin topology.
Step 4 — Analyze#
Measure intensity, curvature, and stability.
Step 5 — Export#
Write results to the paradox gradient matrix and operator outputs.
8. AI‑Ready Design#
PGA is fully AI‑ready:
- deterministic operator grammar
- paradox‑layer analyzer structure
- stable RTT flags
- canonical file layout
- zero‑drift reasoning constraints
- structural paradox handling
- declared coherence tensor
AI systems use PGA to:
- detect paradoxes
- compute paradox gradients
- generate paradox field maps
- classify paradox intensity
- support higher‑order RTT engines
9. Position in the RTT Stack#
Regime Interlock Mapper (RIM)
↓
Triadic Regime Synthesizer (TRS)
↓
Paradox Gradient Analyzer (PGA)
↓
Coherence Tensor Engine (CTE)
↓
Drift Sentinel (DS)
↓
Structural Faultline Detector (SFD)
↓
Stability Basin Cartographer (SBC)
↓
Temporal Regime Sequencer (TRS‑Temporal)
↓
Cross‑Domain Causality Weaver (CW)
↓
Dimensional Resonance Scanner (DRS)
PGA is the paradox‑level intelligence layer, directly above regime‑level mapping.
10. Status#
- Version: 1.0
- Status: canon‑stable
- Category: rtt‑structural
- Module Path:
/docs/rtt/Paradox_Gradient_Analyzer/# Paradox Gradient Profiles — RTT/1
Profile Dictionary for the Paradox Gradient Analyzer (PGA)#
Paradox gradient profiles define the canonical shapes, behaviors, and structural signatures of paradox gradients across conceptual, computational, physical, and dimensional regimes.
These profiles are used by:
- PGA‑Detect
- PGA‑Gradient
- PGA‑Intensity
- PGA‑Field
- PGA‑Resolve
Each profile includes:
- definition
- gradient signature
- field behavior
- basin geometry
- intensity regime
- canonical PGA output pattern
1. Structural Gradient Profiles#
Profile: Symmetry‑Violation Gradient#
Definition
A paradox gradient emerging from violation of a structural invariant (symmetry, conservation, monotonicity).
Gradient Signature
- sharp directional break
- high coherence dependency
- low drift curvature
Field Behavior
- narrow paradox field
- steep curvature
- localized instability
Basin Geometry
- shallow basin
- high boundary rigidity
Intensity Regime
- medium‑high intensity
Profile: Calibration‑Mismatch Gradient#
Definition
A paradox gradient caused by divergence between computational calibration and physical measurement.
Gradient Signature
- medium magnitude
- direction oscillates between regimes
- calibration curvature present
Field Behavior
- moderate field width
- medium curvature
Basin Geometry
- medium depth
- calibration ridge
Intensity Regime
- medium intensity
2. Coherence Gradient Profiles#
Profile: Coherence‑Opposition Gradient#
Definition
Two regimes exhibit coherence gradients that oppose each other.
Gradient Signature
- high magnitude
- bidirectional vector
- coherence ridge inversion
Field Behavior
- wide paradox field
- high curvature
Basin Geometry
- deep basin
- coherence trough
Intensity Regime
- high intensity
Profile: Coherence‑Threshold Gradient#
Definition
A paradox gradient triggered when coherence falls below or exceeds a threshold.
Gradient Signature
- threshold discontinuity
- medium magnitude
- coherence gating
Field Behavior
- narrow field
- threshold curvature
Basin Geometry
- shallow basin
- threshold wall
Intensity Regime
- medium intensity
3. Drift Gradient Profiles#
Profile: Drift‑Amplification Gradient#
Definition
Drift in one regime amplifies drift curvature in another.
Gradient Signature
- high magnitude
- drift curvature spike
- instability ridge
Field Behavior
- wide field
- high curvature
Basin Geometry
- deep basin
- drift well
Intensity Regime
- very high intensity
Profile: Drift‑Inversion Gradient#
Definition
Drift decreases in one regime while increasing in another.
Gradient Signature
- medium‑high magnitude
- inversion vector
- drift polarity flip
Field Behavior
- medium field width
- inversion curvature
Basin Geometry
- medium‑deep basin
- inversion trough
Intensity Regime
- high intensity
4. Boundary Gradient Profiles#
Profile: Abstraction‑Measurement Gradient#
Definition
A paradox gradient formed at the boundary between conceptual abstraction and physical measurement.
Gradient Signature
- medium magnitude
- abstraction → measurement direction
- boundary curvature
Field Behavior
- narrow field
- medium curvature
Basin Geometry
- shallow basin
- boundary ridge
Intensity Regime
- medium intensity
Profile: Gradient‑Boundary Alignment#
Definition
Aligned gradients across regimes produce contradictory outcomes.
Gradient Signature
- high magnitude
- aligned direction
- outcome divergence
Field Behavior
- wide field
- medium curvature
Basin Geometry
- medium‑deep basin
- alignment trough
Intensity Regime
- medium‑high intensity
5. Tensor Gradient Profiles#
Profile: Coherence Tensor Gradient#
Definition
A paradox gradient emerging from violation of multi‑regime coherence tensor constraints.
Gradient Signature
- very high magnitude
- tensor direction
- multi‑regime curvature
Field Behavior
- wide field
- high curvature
Basin Geometry
- deep basin
- tensor well
Intensity Regime
- very high intensity
Profile: Dimensional Tensor Gradient#
Definition
Dimensional tensor constraints conflict with computational coherence.
Gradient Signature
- high magnitude
- dimensional → computational direction
- tensor curvature
Field Behavior
- medium‑wide field
- medium‑high curvature
Basin Geometry
- medium‑deep basin
- tensor trough
Intensity Regime
- high intensity
6. Canonical PGA Output Pattern#
{
"paradox_source": "coherence-gradient-opposition",
"gradient_profile": "coherence-opposition",
"regime": "R1-R4",
"gradient_magnitude": 0.83,
"gradient_direction": "R1↔R4",
"intensity": 0.77,
"field_curvature": 0.51,
"basin_depth": 0.69,
"stability_rating": 0.46
}Status#
- Version: 1.0
- Status: canon‑stable
- Category: rtt‑structural
- Module Path:
/docs/rtt/Paradox_Gradient_Analyzer/# Paradox Sources — RTT/1
Source Dictionary for the Paradox Gradient Analyzer (PGA)#
Paradox sources are the origin points from which paradox gradients emerge.
They represent contradictions, conflicts, or destabilizing conditions across conceptual, computational, physical, and dimensional regimes.
These sources feed directly into:
- PGA‑Detect
- PGA‑Source
- PGA‑Gradient
- PGA‑Intensity
- PGA‑Field
- PGA‑Resolve
Each paradox source includes:
- definition
- diagnostic markers
- onset conditions
- example signatures
- canonical PGA output pattern
1. Structural Paradox Sources#
Source: Symmetry‑Violation Paradox#
Definition
A structural invariant (e.g., symmetry, conservation, monotonicity) is violated by a downstream regime.
Diagnostic Markers
- broken invariants
- structural contradiction
- low drift, high coherence dependency
Onset Conditions
- algorithmic asymmetry
- structural misalignment
- constraint violation
Example Signature
R1 symmetry rule ↔ R2 asymmetric iteration
Source: Calibration‑Contradiction Paradox#
Definition
A computational model requires calibration constants that contradict physical measurements.
Diagnostic Markers
- calibration mismatch
- measurement conflict
- medium drift sensitivity
Onset Conditions
- model‑measurement divergence
- unstable calibration envelope
Example Signature
R2 model ↔ R3 measurement
2. Gradient Paradox Sources#
Source: Coherence‑Gradient Opposition#
Definition
Two regimes exhibit coherence gradients that oppose each other.
Diagnostic Markers
- coherence ridge inversion
- gradient opposition
- medium‑high intensity
Onset Conditions
- conceptual coherence ↑
- dimensional coherence ↓
Example Signature
R1 coherence ↑ ↔ R4 coherence ↓
Source: Drift‑Gradient Inversion#
Definition
Drift decreases in one regime while increasing in another.
Diagnostic Markers
- drift curvature
- instability ridge
- high paradox basin depth
Onset Conditions
- computational drift ↓
- physical drift sensitivity ↑
Example Signature
R2 drift ↓ ↔ R3 drift sensitivity ↑
3. Boundary Paradox Sources#
Source: Abstraction‑Measurement Paradox#
Definition
An abstract conceptual model predicts behavior that contradicts physical measurement.
Diagnostic Markers
- abstraction boundary curvature
- measurement conflict
- medium intensity
Onset Conditions
- conceptual model → physical implementation
- measurement deviation
Example Signature
R1 abstraction ↔ R3 measurement
Source: Gradient‑Boundary Paradox#
Definition
A gradient alignment across regimes produces contradictory outcomes.
Diagnostic Markers
- aligned gradients
- contradictory outputs
- medium‑high intensity
Onset Conditions
- computational gradient ↔ dimensional gradient
- outcome divergence
Example Signature
R2 gradient ↔ R4 gradient
4. Tensor Paradox Sources#
Source: Coherence Tensor Paradox#
Definition
A multi‑regime coherence tensor binds regimes, but one regime violates tensor constraints.
Diagnostic Markers
- tensor curvature
- coherence dependency
- high intensity
Onset Conditions
- tensor binding
- coherence violation
Example Signature
R1 ↔ R2 ↔ R3 coherence tensor
Source: Dimensional Tensor Paradox#
Definition
Dimensional tensors constrain computational pathways, but computational coherence violates tensor alignment.
Diagnostic Markers
- tensor constraint
- coherence misalignment
- medium‑high intensity
Onset Conditions
- dimensional tensor
- computational violation
Example Signature
R2 ↔ R4 dimensional tensor
5. Drift‑Induced Paradox Sources#
Source: Drift‑Amplification Paradox#
Definition
Drift in one regime amplifies drift curvature in another, forming a paradox basin.
Diagnostic Markers
- drift amplification
- basin formation
- high intensity
Onset Conditions
- physical drift ↑
- dimensional drift curvature ↑
Example Signature
R3 drift ↑ ↔ R4 drift curvature ↑
Source: Drift‑Coherence Paradox#
Definition
Drift reduces coherence in one regime while increasing coherence sensitivity in another.
Diagnostic Markers
- coherence curvature
- drift‑coherence conflict
- medium‑high intensity
Onset Conditions
- computational drift ↓
- physical coherence sensitivity ↑
Example Signature
R2 drift ↓ ↔ R3 coherence sensitivity ↑
6. Canonical PGA Output Pattern#
{
"paradox_source": "coherence-gradient-opposition",
"regime": "R1-R4",
"gradient_magnitude": 0.83,
"gradient_direction": "R1↔R4",
"intensity": 0.77,
"field_curvature": 0.51,
"basin_depth": 0.69,
"stability_rating": 0.46
}Status#
- Version: 1.0
- Status: canon‑stable
- Category: rtt‑structural
- Module Path:
/docs/rtt/Paradox_Gradient_Analyzer/# Paradox Gradient Examples — RTT/1
Example Dictionary for the Paradox Gradient Analyzer (PGA)#
These examples illustrate how the Paradox Gradient Analyzer (PGA) detects, computes, and maps paradox gradients across conceptual, computational, physical, and dimensional regimes.
Each example demonstrates one or more PGA operators:
- PGA‑Detect
- PGA‑Gradient
- PGA‑Intensity
- PGA‑Source
- PGA‑Field
- PGA‑Resolve
Examples are grouped by paradox type.
1. Structural Paradox Examples#
Example 1 — Structural Constraint Contradiction (R1 ↔ R2)#
Paradox:
A conceptual invariant (“symmetry must be preserved”) conflicts with a computational algorithm that introduces asymmetry during iteration.
PGA Output:
{
"paradox_source": "symmetry-violation",
"regime": "R1-R2",
"gradient_magnitude": 0.72,
"gradient_direction": "R1→R2",
"intensity": 0.81,
"field_curvature": 0.44,
"basin_depth": 0.63,
"stability_rating": 0.52
}Example 2 — Structural Calibration Paradox (R2 ↔ R3)#
Paradox:
A computational model requires calibration constants that contradict physical measurements.
PGA Output:
{
"paradox_source": "calibration-contradiction",
"regime": "R2-R3",
"gradient_magnitude": 0.68,
"gradient_direction": "R3→R2",
"intensity": 0.74,
"field_curvature": 0.39,
"basin_depth": 0.57,
"stability_rating": 0.49
}2. Gradient Paradox Examples#
Example 3 — Opposing Coherence Gradients (R1 ↔ R4)#
Paradox:
Conceptual coherence increases while dimensional coherence decreases.
PGA Output:
{
"paradox_source": "coherence-gradient-opposition",
"regime": "R1-R4",
"gradient_magnitude": 0.83,
"gradient_direction": "R1↔R4",
"intensity": 0.77,
"field_curvature": 0.51,
"basin_depth": 0.69,
"stability_rating": 0.46
}Example 4 — Drift Gradient Inversion (R2 ↔ R3)#
Paradox:
Computational drift decreases while physical drift sensitivity increases.
PGA Output:
{
"paradox_source": "drift-gradient-inversion",
"regime": "R2-R3",
"gradient_magnitude": 0.79,
"gradient_direction": "R3→R2",
"intensity": 0.82,
"field_curvature": 0.58,
"basin_depth": 0.72,
"stability_rating": 0.41
}3. Boundary Paradox Examples#
Example 5 — Abstraction‑Measurement Paradox (R1 ↔ R3)#
Paradox:
An abstract conceptual model predicts behavior that contradicts physical measurement.
PGA Output:
{
"paradox_source": "abstraction-measurement",
"regime": "R1-R3",
"gradient_magnitude": 0.67,
"gradient_direction": "R1→R3",
"intensity": 0.71,
"field_curvature": 0.33,
"basin_depth": 0.55,
"stability_rating": 0.62
}Example 6 — Gradient‑Boundary Paradox (R2 ↔ R4)#
Paradox:
A computational gradient aligns with a dimensional gradient but produces contradictory outcomes.
PGA Output:
{
"paradox_source": "gradient-boundary",
"regime": "R2-R4",
"gradient_magnitude": 0.88,
"gradient_direction": "R2↔R4",
"intensity": 0.79,
"field_curvature": 0.47,
"basin_depth": 0.66,
"stability_rating": 0.58
}4. Tensor Paradox Examples#
Example 7 — Coherence Tensor Paradox (R1 ↔ R2 ↔ R3)#
Paradox:
A multi‑regime coherence tensor binds conceptual, computational, and physical coherence, but one regime violates tensor constraints.
PGA Output:
{
"paradox_source": "coherence-tensor",
"regime": "R1-R2-R3",
"gradient_magnitude": 0.94,
"gradient_direction": "tensor",
"intensity": 0.91,
"field_curvature": 0.63,
"basin_depth": 0.78,
"stability_rating": 0.57
}Example 8 — Dimensional Tensor Paradox (R2 ↔ R4)#
Paradox:
Dimensional tensors constrain computational pathways, but computational coherence violates tensor alignment.
PGA Output:
{
"paradox_source": "dimensional-tensor",
"regime": "R2-R4",
"gradient_magnitude": 0.88,
"gradient_direction": "R4→R2",
"intensity": 0.84,
"field_curvature": 0.55,
"basin_depth": 0.73,
"stability_rating": 0.63
}5. Drift‑Induced Paradox Examples#
Example 9 — Drift Amplification Paradox (R3 ↔ R4)#
Paradox:
Physical drift amplifies dimensional drift curvature, creating a paradox basin.
PGA Output:
{
"paradox_source": "drift-amplification",
"regime": "R3-R4",
"gradient_magnitude": 0.91,
"gradient_direction": "R3→R4",
"intensity": 0.89,
"field_curvature": 0.71,
"basin_depth": 0.82,
"stability_rating": 0.44
}Example 10 — Drift‑Coherence Paradox (R2 ↔ R3)#
Paradox:
Computational drift reduces coherence while physical drift increases coherence sensitivity.
PGA Output:
{
"paradox_source": "drift-coherence",
"regime": "R2-R3",
"gradient_magnitude": 0.86,
"gradient_direction": "R2↔R3",
"intensity": 0.83,
"field_curvature": 0.62,
"basin_depth": 0.77,
"stability_rating": 0.48
}6. Example Matrix Snippet#
{
"paradox_source": "coherence-gradient-opposition",
"regime": "R1-R4",
"gradient_magnitude": 0.83,
"gradient_direction": "R1↔R4",
"intensity": 0.77,
"field_curvature": 0.51,
"basin_depth": 0.69,
"stability_rating": 0.46
}Status#
- Version: 1.0
- Status: canon‑stable
- Category: rtt‑structural
- Module Path:
/docs/rtt/Paradox_Gradient_Analyzer/# PGA Operators — RTT/1
Operator Grammar for the Paradox Gradient Analyzer (PGA)#
The Paradox Gradient Analyzer (PGA) uses a deterministic operator grammar to detect paradox sources, compute paradox gradients, map paradox fields, measure paradox intensity, and propose structural resolutions.
These operators form the backbone of paradox‑layer intelligence and feed directly into:
- CTE (Coherence Tensor Engine)
- DS (Drift Sentinel)
- SFD (Structural Faultline Detector)
- SBC (Stability Basin Cartographer)
- TRS‑Temporal (Temporal Regime Sequencer)
- CW (Cross‑Domain Causality Weaver)
- DRS (Dimensional Resonance Scanner)
1. PGA‑Detect#
Detect paradox sources and contradictions#
Purpose
Identify paradox sources across conceptual, computational, physical, and dimensional regimes.
Capabilities
- detects structural contradictions
- detects gradient opposition
- detects boundary paradoxes
- detects tensor paradox violations
- detects drift‑induced paradoxes
Output Fields
paradox_sourceregimeonset_conditioncoherence_dependency
2. PGA‑Source#
Classify paradox origin and onset conditions#
Purpose
Determine the origin, type, and structural signature of a paradox.
Capabilities
- classifies paradox type
- identifies onset conditions
- identifies structural invariants
- identifies tensor constraints
- identifies drift envelopes
Output Fields
paradox_sourcesource_classonset_conditionstructural_signature
3. PGA‑Gradient#
Compute paradox gradient vectors#
Purpose
Calculate paradox gradient magnitude, direction, and coherence curvature.
Capabilities
- computes gradient magnitude
- computes gradient direction
- computes coherence curvature
- computes drift curvature
- computes tensor curvature
Output Fields
gradient_magnitudegradient_directioncoherence_curvaturedrift_curvaturetensor_curvature
4. PGA‑Intensity#
Measure paradox intensity and stability#
Purpose
Quantify paradox intensity and evaluate stability across regimes.
Capabilities
- computes paradox intensity
- computes stability rating
- computes basin depth
- computes field curvature
- computes coherence dependency
Output Fields
intensitystability_ratingbasin_depthfield_curvature
5. PGA‑Field#
Map paradox fields and basin topology#
Purpose
Generate paradox field maps showing curvature, basin geometry, and paradox ridges.
Capabilities
- maps paradox fields
- maps basin geometry
- maps curvature topology
- maps gradient flows
- maps tensor paradox topology
Output Fields
field_mapbasin_mapcurvature_mapgradient_flow_map
6. PGA‑Resolve#
Suggest structural decompositions or paradox routing#
Purpose
Provide stabilization pathways or structural decompositions for paradoxes.
Capabilities
- suggests structural decompositions
- suggests coherence alignment
- suggests drift reduction
- suggests tensor rebalancing
- suggests paradox routing
Output Fields
resolution_strategystabilization_pathwaycoherence_alignmentdrift_reduction
7. Operator Interaction Grammar#
Detection → Source Classification → Gradient Computation → Field Mapping → Intensity Analysis → Resolution#
-
PGA‑Detect
Finds paradox sources and contradictions. -
PGA‑Source
Classifies paradox origin and onset conditions. -
PGA‑Gradient
Computes gradient vectors and curvature. -
PGA‑Field
Maps paradox fields and basin geometry. -
PGA‑Intensity
Measures intensity and stability. -
PGA‑Resolve
Produces stabilization or decomposition strategies.
This grammar ensures deterministic paradox‑layer behavior.
8. Operator Matrix Snippet#
{
"operator": "PGA-Gradient",
"gradient_magnitude": 0.83,
"gradient_direction": "R1↔R4",
"coherence_curvature": 0.51,
"drift_curvature": 0.27,
"tensor_curvature": 0.44
}Status#
- Version: 1.0
- Status: canon‑stable
- Category: rtt‑structural
- Module Path:
/docs/rtt/Paradox_Gradient_Analyzer/# PGA Prompts — RTT/1
Prompt Library for the Paradox Gradient Analyzer#
These prompts are designed for AI systems using the Paradox Gradient Analyzer (PGA).
Each prompt invokes one or more canonical PGA operators:
- PGA‑Detect
- PGA‑Gradient
- PGA‑Intensity
- PGA‑Source
- PGA‑Field
- PGA‑Resolve
Prompts are grouped by paradox type and operator class.
1. Structural Paradox Prompts#
Prompt: Detect Structural Paradox Sources#
Use PGA‑Detect to identify all structural paradox sources, including symmetry‑violation, calibration‑contradiction, and invariant‑break conditions.
Prompt: Map Structural Paradox Fields#
Apply PGA‑Field to generate a structural paradox field map showing curvature, basin geometry, and paradox ridges.
Prompt: Compute Structural Paradox Gradients#
Use PGA‑Gradient to compute gradient magnitude, direction, and coherence dependency for structural paradoxes.
2. Gradient Paradox Prompts#
Prompt: Identify Opposing Gradients#
Use PGA‑Detect to find all coherence‑gradient and drift‑gradient oppositions across R1–R4.
Prompt: Compute Gradient Vectors#
Apply PGA‑Gradient to compute paradox gradient vectors, including magnitude, direction, and inversion signatures.
Prompt: Analyze Gradient Intensity#
Use PGA‑Intensity to measure paradox intensity for all gradient‑aligned or gradient‑opposed paradoxes.
3. Boundary Paradox Prompts#
Prompt: Detect Boundary Paradox Conditions#
Use PGA‑Source to identify paradoxes arising at regime boundaries, including abstraction‑measurement and gradient‑boundary contradictions.
Prompt: Map Boundary Curvature#
Apply PGA‑Field to generate boundary curvature maps showing paradox onset and basin formation.
Prompt: Evaluate Boundary Stability#
Use PGA‑Intensity to compute stability ratings for all boundary paradoxes.
4. Tensor Paradox Prompts#
Prompt: Detect Tensor Paradox Violations#
Use PGA‑Detect to identify coherence‑tensor and dimensional‑tensor paradox sources across multi‑regime interactions.
Prompt: Map Tensor Paradox Fields#
Apply PGA‑Field to generate tensor paradox topology diagrams showing multi‑regime curvature and basin geometry.
Prompt: Compute Tensor Gradient Strength#
Use PGA‑Gradient to compute tensor gradient magnitude, direction, and coherence curvature.
5. Drift‑Induced Paradox Prompts#
Prompt: Identify Drift‑Amplification Paradoxes#
Use PGA‑Detect to find paradoxes where drift in one regime amplifies drift curvature in another.
Prompt: Map Drift‑Induced Paradox Basins#
Apply PGA‑Field to generate drift‑amplification basin maps showing instability ridges and drift wells.
Prompt: Analyze Drift‑Coherence Paradox Intensity#
Use PGA‑Intensity to compute intensity and stability ratings for drift‑coherence paradoxes.
6. Full‑Matrix Prompts#
Prompt: Generate Full Paradox Gradient Matrix#
Use all PGA operators to produce a complete
paradox_gradient_matrix.jsoncontaining structural, gradient, boundary, tensor, and drift‑induced paradox entries.
Prompt: Analyze Paradox Field Topology#
Apply PGA‑Field to generate a full paradox topology map showing paradox fields, basins, curvature, and gradient flows.
Prompt: Stability Overview#
Use PGA‑Intensity to compute stability ratings for every paradox type and produce a paradox stability summary.
7. AI‑Ready Meta‑Prompts#
Prompt: Explain Paradox Classification#
Provide a detailed explanation of how PGA classifies paradoxes into structural, gradient, boundary, tensor, and drift‑induced categories.
Prompt: Operator‑Level Summary#
Summarize the role of each PGA operator and how they interact to produce paradox‑layer intelligence.
Prompt: Cross‑Engine Integration#
Explain how PGA outputs feed into CTE, DS, SFD, SBC, TRS‑Temporal, CW, and DRS.
Status#
- Version: 1.0
- Status: canon‑stable
- Category: rtt‑structural
- Module Path:
/docs/rtt/Paradox_Gradient_Analyzer/