Multivariate Mixed Poisson Processes / Multivariate gemischte Poisson-Prozesse

Zocher, Mathias

19 November 2005

Multivariate mixed Poisson processes are special multivariate counting processes whose coordinates are, in general, dependent. The first part of this thesis is devoted to properties which multivariate counting processes may possess. Such properties are, for example, the Markov property, the multinomial property and regularity. With regard to regularity we study the properties of transition probabilities and intensities. The second part of this thesis restricts the class of all multivariate counting processes by additional assumptions leading to different types of multivariate mixed Poisson processes which, however, are connected with each other. Using a multivariate version of the Bernstein-Widder theorem, it is shown that multivariate mixed Poisson processes are characterized by the multinomial property. Furthermore, regularity of multivariate mixed Poisson processes and properties of their moments are studied in detail. Throughout this thesis, two types of stability of properties of multivariate counting processes are studied: It is shown that most properties of a multivariate counting process are stable under certain linear transformations including the selection of single coordinates and summation of all coordinates. It is also shown that the different types of multivariate mixed Poisson processes under consideration are in a certain sense stable in time.

Intensitäten

Multinomialeigenschaft

Multivariate erzeugende Funktion

Multivariater Zählprozess

Multivariater gemischter Poisson-Prozess

Multivariates Bernstein-Widder Theorem

Regularität

Intensities

Multinomial property

Multivariate Bernstein-Widder Theorem

Multivariate Counting Process

Multivariate Generating Function

Multivariate Mixed Poisson Process

Regularity

ddc:510

rvk:SK 820

Erzeugende Funktion

Poisson-Prozess

Regularität

Zählprozess

Multivariate Mixed Poisson Processes

Zocher, Mathias

02 December 2005

Multivariate mixed Poisson processes are special multivariate counting processes whose coordinates are, in general, dependent. The first part of this thesis is devoted to properties which multivariate counting processes may possess. Such properties are, for example, the Markov property, the multinomial property and regularity. With regard to regularity we study the properties of transition probabilities and intensities. The second part of this thesis restricts the class of all multivariate counting processes by additional assumptions leading to different types of multivariate mixed Poisson processes which, however, are connected with each other. Using a multivariate version of the Bernstein-Widder theorem, it is shown that multivariate mixed Poisson processes are characterized by the multinomial property. Furthermore, regularity of multivariate mixed Poisson processes and properties of their moments are studied in detail. Throughout this thesis, two types of stability of properties of multivariate counting processes are studied: It is shown that most properties of a multivariate counting process are stable under certain linear transformations including the selection of single coordinates and summation of all coordinates. It is also shown that the different types of multivariate mixed Poisson processes under consideration are in a certain sense stable in time.

info:eu-repo/classification/ddc/510

ddc:510

Residual density validation and the structure of Labyrinthopeptin A2 / Residualdichtevalidierung und die Struktur von Labyrinthopeptin A2

Meindl, Katharina Anna Christina

30 October 2008

No description available.

540 Chemie

Mathematics and Computer Science

residual density analysis

jnk2RDA

fractal dimension

gross residual electrons

labyrinthopeptin A2

lantibiotic

<i>cis</i> peptide bonds

Residualdichteanalyse

jnk2RDA

fraktale Dimension

Bruttoresidualelektronen

Labyrinthopeptin A2

Lantibiotikum

<i>cis</i>-Peptidbindungen

35.06

35.11

35.25

35.62

35.76

SXL 300: Peptide

Polypeptide

Peptone {Biochemie}

SP 000: Strukturchemie