Mathematical Concepts in Insurance and Reinsurance: Some Moduli in Programming Environment MATHEMATICA - Couverture souple

Kyurkchiev, Nikolay

 
9783659969065: Mathematical Concepts in Insurance and Reinsurance: Some Moduli in Programming Environment MATHEMATICA
Couverture souple
ISBN 10 : 3659969060 ISBN 13 : 9783659969065
Editeur : LAP LAMBERT Academic Publishing, 2016

Synopsis

This monograph is based on lectures I gave in a graduate course at the FMI, Univ. of Plovdiv. One of the most significant goals of any insurance risk activity is to achieve a satisfactory model for the probability distribution of the total claim amount. When preparing the strategy “Risk in Persp.”, the actuary fix: the prob. distr. (based on accumulated statistics for the study insured event); number of damaged objects; probability of losses for this number of objects and total losses, depending on the number of damaged objects. In this strategy is essential that the analysis of cdf of accumulation with increasing number of damaged objects and the amount of compensation likely to happen (strategy “Ins. Persp.”). The study of this sigmoid function, which is an approximation of the cut function associated to the cdf gives information for the actuary with respect to the minimum sample of the general aggregation of the damaged objects, whose losses must be covered, and thus the percentage of the insured event that are occurred (strategy “Ins. Resp.”, according to the law of diminishing marginal returns), and at a later stage for the formation of a support plan for the formation policy.

Les informations fournies dans la section « Synopsis » peuvent faire référence à une autre édition de ce titre.

Présentation de l'éditeur

This monograph is based on lectures I gave in a graduate course at the FMI, Univ. of Plovdiv. One of the most significant goals of any insurance risk activity is to achieve a satisfactory model for the probability distribution of the total claim amount. When preparing the strategy “Risk in Persp.”, the actuary fix: the prob. distr. (based on accumulated statistics for the study insured event); number of damaged objects; probability of losses for this number of objects and total losses, depending on the number of damaged objects. In this strategy is essential that the analysis of cdf of accumulation with increasing number of damaged objects and the amount of compensation likely to happen (strategy “Ins. Persp.”). The study of this sigmoid function, which is an approximation of the cut function associated to the cdf gives information for the actuary with respect to the minimum sample of the general aggregation of the damaged objects, whose losses must be covered, and thus the percentage of the insured event that are occurred (strategy “Ins. Resp.”, according to the law of diminishing marginal returns), and at a later stage for the formation of a support plan for the formation policy.

Biographie de l'auteur

Prof. Nikolay Kyurkchiev works in Institute of Mathematics and Informatics at the Bulgarian Academy of Sciences. Up to now he has over 160 publications and is the author/coauthor of 7 scientific monographs. He works in the following areas: Numerical Analysis, Mathematical Modeling, Approximation Theory, Applied Financial and Insurance Mathematics.

Les informations fournies dans la section « A propos du livre » peuvent faire référence à une autre édition de ce titre.

Éditeur
LAP LAMBERT Academic Publishing
Date d'édition
2016
Langue
anglais
ISBN 10 
3659969060
ISBN 13 
9783659969065
Reliure
Broché
Nombre de pages
144
Coordonnées du fabricant
non disponible
Personne responsable
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