Publication record · 18.cifr/2018.bajpai.resilient-distribution-choquet

A Novel Metric to Quantify and Enable Resilient Distribution System Using Graph Theory and Choquet Integral

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Prabodh Bajpai (IIT Kharagpur), Sayonsom Chanda (Idaho National Laboratory), Anurag K. Srivastava (Washington State University)

RAI18.cifr/2018.bajpai.resilient-distribution-choquet

IEEE Transactions on Smart Grid· 2018· doi:10.1109/TSG.2016.2623818

This paper proposes a novel metric to quantify and enable resilience of electric distribution systems using graph theory and Choquet integral. Graph-theoretic sub-metrics capturing connectivity, load served, critical load prioritization, and restoration ease are aggregated via a Choquet integral over a lambda-fuzzy measure to yield a single composite resilience score in [0,1].

distribution system resiliencegraph theoryChoquet integralfuzzy measureextreme events

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Distribution operators lack a rigorous scalar metric that captures non-linearly interacting resilience dimensions under extreme events. Simple weighted averages ignore synergies, leading to suboptimal investment and operational decisions. This metric provides a defensible, expert-calibrated single score for resilience.

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Introduces a composite resilience metric combining graph-theoretic connectivity analysis with the Choquet integral and lambda-fuzzy measure, capturing non-additive synergies among resilience sub-dimensions. Unlike weighted-sum approaches, the Choquet integral models interdependencies between connectivity, load-serving, critical-load, and restoration-ease sub-metrics.

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