Core-Periphery Dynamics in Market-Conditioned Financial Networks: A Conditional P-Threshold Mutual Information Approach
ArXiv ID: 2601.00395 “View on arXiv”
Authors: Kundan Mukhia, Imran Ansari, S R Luwang, Md Nurujjaman
Abstract
This study investigates how financial market structure reorganizes during the COVID-19 crash using a conditional p-threshold mutual information (MI) based Minimum Spanning Tree (MST) framework. We analyze nonlinear dependencies among the largest stocks from four diverse QUAD countries: the US, Japan, Australia, and India. Crashes are identified using the Hellinger distance and Hilbert spectrum; a crash occurs when HD = mu_H + 2*sigma_H, segmenting data into pre-crash, crash, and post-crash periods. Conditional p-threshold MI filters out common market effects and applies permutation-based significance testing. Resulting validated dependencies are used to construct MST networks for comparison across periods. Networks become more integrated during the crash, with shorter path lengths, higher centrality, and lower algebraic connectivity, indicating fragility. Core-periphery structure declines, with increased periphery vulnerability, and disassortative mixing facilitates shock transmission. Post-crash networks show only partial recovery. Aftershock analysis using the Gutenberg-Richter law indicates higher relative frequency of large volatility events following the crash. Results are consistent across all markets, highlighting the conditional p-threshold MI framework for capturing nonlinear interdependencies and systemic vulnerability.
Keywords: Mutual Information, Minimum Spanning Tree (MST), Network Analysis, Systemic Vulnerability, Nonlinear Dependencies, Equities
Complexity vs Empirical Score
- Math Complexity: 7.0/10
- Empirical Rigor: 6.5/10
- Quadrant: Holy Grail
- Why: The paper employs advanced nonlinear dependency measures (conditional p-threshold mutual information), statistical significance testing via permutations, and complex network topology metrics (algebraic connectivity, core-periphery analysis) alongside robust empirical crash identification (Hellinger distance, Hilbert spectrum) applied to multi-market financial data.
flowchart TD
A["Research Goal<br>Dynamics of market structure during<br>COVID-19 crash across QUAD markets"] --> B["Data Input<br>Stock prices from US, Japan, Australia, India"]
B --> C["Crash Identification<br>Hellinger Distance (HD) &<br>Hilbert Spectrum Analysis"]
C --> D["Period Segmentation<br>Pre-crash / Crash / Post-crash"]
D --> E["Network Construction<br>Conditional p-threshold MI MST"]
E --> F["Network Analysis<br>Centrality, Algebraic Connectivity,<br>Core-Periphery, Aftershocks"]
F --> G["Key Findings<br>Increased Integration & Fragility<br>Core-Periphery Decline<br>Partial Post-Crash Recovery"]