Second-order asymptotics for the ruin probability in the case of very large claims

A. Baltrunas

doi:10.1007/bf02677526

journal article Nov 01, 1999

Second-order asymptotics for the ruin probability in the case of very large claims

A. Baltrunas

Siberian Mathematical Journal Vol. 40 No. 6 pp. 1034-1043 · Springer Science and Business Media LLC

View at Publisher Save 10.1007/bf02677526

Topics

No keywords indexed for this article. Browse by subject →

References

17

[1]

H. Cramer, “On some questions connected with mathematical risk,” Univ. California Publ. Statist.,2, 99–125 (1954).

[2]

W. Feller, An Introduction to Probability Theory and Its Applications. Vol. 2 [Russian translation], Mir, Moscow (1967).

[3]

A. A. Borovkov, Stochastic Processes in Queueing Theory [in Russian], Nauka, Moscow (1972).

[4]

K. B. Athreya and P. E. Ney, Branching Processes, Springer-Verlag, Berlin, Heidelberg, and new York (1972). 10.1007/978-3-642-65371-1

[5]

A. G. Pakes, “On the tails of waiting-time distributions,” J. Appl. Probab.,15, 555–564 (1975). 10.2307/3212870

[6]

J. L. Teugels, “The class of subexponential distributions,” Ann. Probab.,3, 1000–1011 (1975). 10.1214/aop/1176996225

[7]

N. Veraverbeke, “Asymptotic behaviour of Wiener-Hopf factors of a random walk,” Stochastic Process Appl.,5, 27–37 (1977). 10.1016/0304-4149(77)90047-3

[8]

P. Embrechts and N. Veraverbeke, “Estimates for the ruin probability with special emphasis on the possibility of large claims,” Insurance Math. Econom.,1, 55–72 (1982). 10.1016/0167-6687(82)90021-x

[9]

B. A. Rogozin, “An estimate of the remainder term in limit theorems of renewal theory,” Teor. Veroyatnost. i Primenen,18, No. 4, 703–717 (1973).

[10]

E. Omey and E. Willekens, “Second-order behaviour of the tail of a subordinated probability distribution,” Stochastic Process Appl.,21, 339–353 (1986). 10.1016/0304-4149(86)90105-5

[11]

E. Omey and E. Willekens, “Second-order behaviour of distributions subordinate to a distribution with finite mean,” Comm. Statist. Stochastic Models, No, 3, 311–342 (1987). 10.1080/15326348708807059

[12]

E. Willekens, Hogere Orde Theorie Voor Subexponentiele Verdelingen, Ph. D. Thesis, K. U. Leuven (1986).

[13]

E. Willekens and J. L. Teugels, “Asymptotic expansions for waiting time probabilities inM|G|1 queue with long-tailed service time,” Queueing Systems Theory Appl.,10, No. 4, 295–311 (1992). 10.1007/bf01193324

[14]

A. Baltrūnas and E. Omey, “The rate of convergence for subexponential distribution,” Liet. Mat. Rink.,38, 1–18 (1998).

[15]

I. F. Pinelis, “On asymptotic equivalence of large deviation probabilities of the sum and maximum of independent random variables,” in: Limits Theorems [in Russian], Nauka Novosibirsk, 1985.

[16]

E. Willekens, “The structure of the class of subexponential distributions,” Probab. Theory Related Fields,77, 567–581 (1988). 10.1007/bf00959618

[17]

E. Omey, “On the difference between the product and the convolution product of distribution functions,” Publ. Inst. math. (Beograd) (N. S.),55, 111–145 (1994).

Metrics

3

Citations

17

References

Details

Published: Nov 01, 1999
Vol/Issue: 40(6)
Pages: 1034-1043
License: View

Authors

A

A. Baltrunas

Cite This Article

A. Baltrunas (1999). Second-order asymptotics for the ruin probability in the case of very large claims. Siberian Mathematical Journal, 40(6), 1034-1043. https://doi.org/10.1007/bf02677526

Second-order asymptotics for the ruin probability in the case of very large claims

You May Also Like