Strategic Risk Reduction: Self-Protection and Self-Insurance

This paper studies how a risk holder should combine self-protection and self-insurance when market insurance is absent.

In a Bernoulli loss model, self-protection reduces the residual loss probability, while self-insurance reduces the residual loss severity.

The risk holder evaluates residual risk using either Value-at-Risk or Tail Value-at-Risk and incurs a joint risk-reduction cost that allows technological interaction between the two activities.

We show that Value-at-Risk leads to a threshold-driven solution that the optimal strategy is either no risk reduction, pure self-protection, or pure self-insurance.

By contrast, Tail Value-at-Risk creates a direct interaction between residual frequency and residual severity, making the problem non-convex even in the Bernoulli setting.

We solve it using an isoquant geometry method based on the marginal-balance curves for self-protection and self-insurance.

The analysis identifies when optimal strategies lie on boundaries, extreme constrained candidates, touching components, or crossing components, and shows how the confidence level and the cost technology determine whether self-protection and self-insurance behave as substitutes or complements.