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On a modified counter with prolonging dead time

  • A. Dvurečenskij (a1) and G. A. Ososkov (a1)

Abstract

Emitted particles arrive at the counter with prolonging dead time so that the interarrival times and the lengths of impulses in any dead time are independent but not necessarily identically distributed random variables, and whenever the counter is idle then the following evolution starts from the beginning. For this class of counters we derive the probability laws of the numbers of particles arriving at the counters during their dead times, and the Laplace transform of the cycle, respectively.

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Corresponding author

Postal address: Joint Institute for Nuclear Research, LCTA, Head Post Office, P.O. Box 79, 101000 Moscow, USSR.
Permanent address: Institute of Measurement and Measuring Techniques EPRC of the Slovak Academy of Sciences, 885 27 Bratislava, Czechoslovakia.

References

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