Continuous Time r.p.@ m.p.p.

  • Tomasz Rolski
Part of the Lecture Notes in Statistics book series (LNS, volume 5)


In continuous-time theory we use the same notations as we did in the discrete-case. This chapter starts with the definition of an r.p.@ m.p.p.. One component of an r.p.@ m.p.p. is a p.p. and we define it now. Since points are not always homogeneous we shall deal with so called m.p.p.’s. Let K be a Polish space. The space K is called a space of marks and elements of it are called marks. Define
$${N_K} = N(R \times K)$$
where N(R × K) were introduced in Section 1.2. We write simply N if K consists of a single point.


Radon Summing 


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Copyright information

© Springer-Verlag New York Inc. 1981

Authors and Affiliations

  • Tomasz Rolski
    • 1
  1. 1.Mathematical InstituteWroclaw UniversityWroclawPoland

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