Erratum - Some Characterizations of Mixed Poisson Processes

Lyberopoulos, Demetrios P.; Macheras, N. D.

doi:10.1007/s13171-013-0040-1

Cited by 4 publications

(5 citation statements)

References 0 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Since tP θ u θPD is a rcp of P over µ consistent with Θ by (b), applying [12], Lemma 4.1, along with [13], we obtain that W and X are P -conditionally independent, i.e. P satisfies condition (a1).…”

Section: The Characterizationmentioning

confidence: 94%

A characterization of progressively equivalent probability measures preserving the structure of a compound mixed renewal process

Tzaninis¹,

Macheras²

2020

Preprint

View full text Add to dashboard Cite

Generalizing earlier works of Delbaen & Haezendonck [5] as well as of [18] and [16] for given compound mixed renewal process S under a probability measure P , we characterize all those probability measures Q on the domain of P such that Q and P are progressively equivalent and S remains a compound mixed renewal process under Q with improved properties. As a consequence, we prove that any compound mixed renewal process can be converted into a compound mixed Poisson process through a change of measures. Applications related to the ruin problem and to the computation of premium calculation principles in an insurance market without arbitrage opportunities are discussed in [26] and [27], respectively.

show abstract

Section: The Characterizationmentioning

confidence: 94%

A characterization of progressively equivalent probability measures preserving the structure of a compound mixed renewal process

Tzaninis¹,

Macheras²

2020

Preprint

View full text Add to dashboard Cite

show abstract

“…Since S has Q θ -stationary independent increments for any θ / ∈ C ( * ) , it follows by [12], Corollary 4.2 together with [14] that it has Q-conditionally stationary independent increments, implying for all s, t ∈ R + with s ≤ t that S t − S s is Q-conditionally independent of F S s ; hence of F s (see [12], Lemma 4.7). The latter together with [3], Section 7.3, Theorem 1 implies that condition…”

Section: Compound Mixed Poisson Processes and Martingalesmentioning

confidence: 98%

“…[18], Theorem 2.1.1 and Lemma 2.1.2). The equivalence (a) ⇐⇒ (c) follows by [12], Lemma 4.1 together with [14] Ad (ii): Assume that (a2) holds true. Then X is P -independent if and only if it is Pconditionally independent.…”

Section: A Characterization Of Compound Mixed Poisson Processesmentioning

confidence: 99%

See 1 more Smart Citation

A characterization of martingale-equivalent compound mixed Poisson process

Lyberopoulos,

Macheras

2019

Preprint

View full text Add to dashboard Cite

If a given aggregate process S is a compound mixed Poisson process under a probability measure P , a characterization of all probability measures Q on the domain of P , such that P and Q are progressively equivalent and S remains a compound mixed Poisson process with improved properties, is provided. This result generalizes earlier work of Delbaen & Haezendonck (1989). Implications related to the computation of premium calculation principles in an insurance market possessing the property of no free lunch with vanishing risk are also discussed.

show abstract

“…Since {P θ } θ∈D is a rcp of P over µ consistent with Θ by (b), applying Lyberopoulos and Macheras (2012) Lemma 4.1 along with Lyberopoulos and Macheras (2014), we obtain that W and X are P -conditionally independent, i.e., P satisfies condition (a1). Furthermore, condition (A.3.1) again together with the fact that {P θ } θ∈D is a rcp of P over µ consistent with Θ by (b), implies that P Xn = R and condition (a2) is satisfied by P .…”

Section: Appendix Amentioning

confidence: 93%

A characterization of progressively equivalent probability measures preserving the structure of a compound mixed renewal process

Tzaninis¹,

Macheras²

2023

ALEA

View full text Add to dashboard Cite

Generalizing earlier work of Delbaen & Haezendonck for given compound mixed renewal process S under a probability measure P , we characterize all those probability measures Q on the domain of P such that Q and P are progressively equivalent and S remains a compound mixed renewal process under Q with improved properties. As a consequence, we prove that any compound mixed renewal process can be converted into a compound mixed Poisson one through a change of measures.

show abstract

Erratum - Some Characterizations of Mixed Poisson Processes

Cited by 4 publications

References 0 publications

A characterization of progressively equivalent probability measures preserving the structure of a compound mixed renewal process

A characterization of progressively equivalent probability measures preserving the structure of a compound mixed renewal process

A characterization of martingale-equivalent compound mixed Poisson process

A characterization of progressively equivalent probability measures preserving the structure of a compound mixed renewal process

Contact Info

Product

Resources

About