A Laplace-based perspective on conditional mean risk sharing
Abstract
The conditional mean risk-sharing (CMRS) rule is an important tool for distributing aggregate losses across individual risks, but its implementation in continuous multivariate models typically requires complicated multidimensional integrals. We develop a framework to compute CMRS allocations from the joint Laplace--Stieltjes transform of the risk vector. The LSTs of the allocation measures i(B)=E[Xi1\S∈ B\] are expressed as partial derivatives of the joint LST evaluated on the diagonal t1=·s=tn. When densities exist, this yields one-dimensional Laplace inversions for fS and i, and hence hi(s)=i(s)/fS(s) on the absolutely continuous part, providing closed-form or semi-analytic solutions for a broad class of distributions. We also develop numerical inversion methods for cases where analytic inversion is unavailable. We introduce an exponential tilting procedure to stabilize numerical inversion in low-probability aggregate events. We provide several examples to illustrate the approach, including in some high-dimensional settings where existing approaches are infeasible.
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