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How big is large?: A study of the limit for large insurance claims in case reserves
KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematical Statistics. (Matematisk Statistik)
2011 (English)Independent thesis Advanced level (degree of Master (One Year)), 20 credits / 30 HE creditsStudent thesis
##### Abstract [en]

A company issuing an insurance will provide, in return for a monetary premium, acceptance of the liability to make certain payments to the insured person or company if some beforehand specified event occurs. There will always be a delay between occurrence of this event and actual payment from the insurance company. It is therefore necessary for the company to put aside money for this liability. This money is called the reserve. When a claim is reported, a claim handler will make an estimate of how much the company will have to pay to the claimant. This amount is booked as a liability. This type of reserve is called; "case reserve". When making the estimate, the claim handler has the option of giving the claim a standard reserve or a manual reserve. A standard reserve is a statistically calculated amount based on historical claim costs. This type of reserve is more often used in small claims. A manual reserve is a reserve subjectively decided by the claim handler. This type of reserve is more often used in large claims. This thesis propose a theory to model and calculate an optimal limit above which a claim should be considered large. An application of the method is also applied to some different types of claims.

2011. , p. 81
##### Keywords [en]
Insurance claims, Monte Carlo simulation, large claims, small claims, case reserve, distributions for insurance claims, general insurance, non-life insurance
##### National Category
Probability Theory and Statistics
##### Identifiers
OAI: oai:DiVA.org:kth-102795DiVA, id: diva2:556631
##### Educational program
Master of Science in Engineering -Engineering Physics
##### Uppsok
Physics, Chemistry, Mathematics
##### Examiners
Available from: 2012-09-25 Created: 2012-09-25 Last updated: 2012-09-25Bibliographically approved

#### Open Access in DiVA

##### File information
File name FULLTEXT01.pdfFile size 1454 kBChecksum SHA-512
Type fulltextMimetype application/pdf
##### By organisation
Mathematical Statistics
##### On the subject
Probability Theory and Statistics

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Cite
Citation style
• apa
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