Modes of growth of counting processes with increasing arrival rates
- 1 June 1974
- journal article
- research article
- Published by Cambridge University Press (CUP) in Journal of Applied Probability
- Vol. 11 (02) , 237-247
- https://doi.org/10.1017/s002190020003669x
Abstract
Jumping processes which grow by unit jumps, with decreasing sojourn times between successive jumps, are studied. Markovian birth processes, non-Markovian branching processes, and some generalizations of these are special cases. Three classes are described, in one of which growth is explosive, in the second asymptotically continuous, and in the third oscillatory. A theorem is proved which gives an explicit functional expression in the asymptotically continuous case, and borderline cases between the classes are investigated.Keywords
This publication has 4 references indexed in Scilit:
- Asymptotic growth of a class of size-and-age-dependent birth processesJournal of Applied Probability, 1974
- Taboo extinction, sojourn times, and asymptotic growth for the Markovian birth and death processJournal of Applied Probability, 1972
- ON THE ROLE OF VARIABLE GENERATION TIME IN THE DEVELOPMENT OF A STOCHASTIC BIRTH PROCESSBiometrika, 1948
- The general form of the so-called law of the iterated logarithmTransactions of the American Mathematical Society, 1943