Mathematics (Sep 2024)

A Principled Framework to Assess the Information-Theoretic Fitness of Brain Functional Sub-Circuits

  • Duy Duong-Tran,
  • Nghi Nguyen,
  • Shizhuo Mu,
  • Jiong Chen,
  • Jingxuan Bao,
  • Frederick H. Xu,
  • Sumita Garai,
  • Jose Cadena-Pico,
  • Alan David Kaplan,
  • Tianlong Chen,
  • Yize Zhao,
  • Li Shen,
  • Joaquín Goñi

DOI
https://doi.org/10.3390/math12192967
Journal volume & issue
Vol. 12, no. 19
p. 2967

Abstract

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In systems and network neuroscience, many common practices in brain connectomic analysis are often not properly scrutinized. One such practice is mapping a predetermined set of sub-circuits, like functional networks (FNs), onto subjects’ functional connectomes (FCs) without adequately assessing the information-theoretic appropriateness of the partition. Another practice that goes unchallenged is thresholding weighted FCs to remove spurious connections without justifying the chosen threshold. This paper leverages recent theoretical advances in Stochastic Block Models (SBMs) to formally define and quantify the information-theoretic fitness (e.g., prominence) of a predetermined set of FNs when mapped to individual FCs under different fMRI task conditions. Our framework allows for evaluating any combination of FC granularity, FN partition, and thresholding strategy, thereby optimizing these choices to preserve the important topological features of the human brain connectomes. By applying to the Human Connectome Project with Schaefer parcellations at multiple levels of granularity, the framework showed that the common thresholding value of 0.25 was indeed information-theoretically valid for group-average FCs, despite its previous lack of justification. Our results pave the way for the proper use of FNs and thresholding methods, and provide insights for future research in individualized parcellations.

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