A two-sided exit problem for a difference of a compound poisson process   and a compound renewal process with a discrete phase space

Please use this identifier to cite or link to this item: http://hdl.handle.net/1942/8016

Title:	A two-sided exit problem for a difference of a compound poisson process and a compound renewal process with a discrete phase space
Authors:	Kadankov, V. KADANKOVA, Tetyana
Issue Date:	2008
Publisher:	TAYLOR & FRANCIS INC
Source:	STOCHASTIC MODELS, 24(1). p. 152-172
Abstract:	A two-sided exit problem is solved for a difference of a compound Poisson process and a compound renewal process. The Laplace transforms of the joint distribution of the first exit time, the value of the overshoot, and the value of a linear component at this instant are determined. The results obtained are applied to solve the two-sided exit problem for a particular case of this process, namely, the difference of the compound Poisson process and the renewal process whose jumps are geometrically distributed. The advantage is that these results are in a closed form, in terms of resolvent sequences of the process.
Notes:	Natl Acad Sci Ukraine, Inst Math, UA-01601 Kiev 4, Ukraine. Hasselt Univ, Ctr Stat, Diepenbeek, Belgium.Kadankov, V, Natl Acad Sci Ukraine, Inst Math, 3 Tereschenkivska St, UA-01601 Kiev 4, Ukraine.kadankov@voliacable.com
Keywords:	difference of renewal processes; first exit time; linear component; resolvent sequence; value of the overshoot
Document URI:	http://hdl.handle.net/1942/8016
ISSN:	1532-6349
e-ISSN:	1532-4214
DOI:	10.1080/15326340701828340
ISI #:	000253456300009
Category:	A1
Type:	Journal Contribution
Validations:	ecoom 2009
Appears in Collections:	Research publications

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