Systemic risk measures with markets volatility

Abstract

Systemic risk measures are crucial for the stability of financial markets, yet classical formulations fail to capture the complexity of market volatility. We propose a new framework for systemic risk measurement on the variable-exponent Bochner-Lebesgue space Lp(·), where the exponent p(·) is a random variable rather than a deterministic constant parameter, thereby inherently encoding latent market volatility. By constructing suitable deterministic auxiliary functions and single-firm risk measures, we decompose the quantification of systemic risk in Lp(·) into two sequential steps, ultimately deriving its dual representations. Several examples are provided to illustrate the theoretical results.