Multiple per-claim reinsurance based on maximizing the Lundberg exponent
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Publication:6072263
DOI10.1016/j.insmatheco.2023.05.009zbMath1529.91063MaRDI QIDQ6072263
Publication date: 12 October 2023
Published in: Insurance Mathematics \& Economics (Search for Journal in Brave)
bisection methodLundberg exponentper-claim reinsurancecombined premium principlemultiple reinsurance
Cites Work
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- Optimal investment and reinsurance strategies for insurers with generalized mean-variance premium principle and no-short selling
- Optimal insurance risk control with multiple reinsurers
- A note on optimal insurance risk control with multiple reinsurers
- Optimal non-proportional reinsurance control
- Optimal reinsurance under the mean-variance premium principle to minimize the probability of ruin
- Optimal reinsurance under VaR and CTE risk measures
- Measuring the effects of reinsurance by the adjustment coefficient
- Aspects of risk theory
- Measuring the effects of reinsurance by the adjustment coefficient in the Sparre Andersen model.
- Minimizing the probability of ruin: optimal per-loss reinsurance
- On minimizing the ruin probability by investment and reinsurance
- Optimal risk sharing under distorted probabilities
- Continuous-time optimal reinsurance strategy with nontrivial curved structures
- On the adjustment coefficient, drawdowns and Lundberg-type bounds for random walk
- Optimal reinsurance with multiple reinsurers: distortion risk measures, distortion premium principles, and heterogeneous beliefs
- Optimal reinsurance with multiple reinsurers: competitive pricing and coalition stability
- Optimal dividend and reinsurance in the presence of two reinsurers
- Finite-time ruin probabilities under large-claim reinsurance treaties for heavy-tailed claim sizes
- Upper bound for ruin probabilities under optimal investment and proportional reinsurance
- Optimal Risk Control for The Excess of Loss Reinsurance Policies
- Optimal Retention for a Stop-loss Reinsurance Under the VaR and CTE Risk Measures
- Risk Theory in a Periodic Environment: The Cramér-Lundberg Approximation and Lundberg's Inequality
- On the Maximisation of the Adjustment Coefficient under Proportional Reinsurance
- Quantile-Based Risk Sharing
- Affine Storage and Insurance Risk Models
- Optimal Dynamic Risk Control for Insurers with State-Dependent Income
- Asymptotics of ruin probabilities for controlled risk processes in the small claims case
- Equilibrium in a Reinsurance Market
- Optimal risk control and dividend distribution policies. Example of excess-of loss reinsurance for an insurance corporation
- Optimal dynamic risk sharing under the time‐consistent mean‐variance criterion
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