Open AccessFirst-Occurrence Time of High-Level Crossings in a Continuous Random Process
Author(s) -
J. R. Rice,
Ferdinand P. Beer
Publication year - 1966
Publication title -
the journal of the acoustical society of america
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.619
H-Index - 187
eISSN - 1520-8524
pISSN - 0001-4966
DOI - 10.1121/1.1909893
Subject(s) - renewal theory , limiting , exponential function , simple (philosophy) , representation (politics) , mathematics , exponential distribution , process (computing) , gaussian , distribution (mathematics) , statistical physics , gaussian process , computer science , statistics , mathematical analysis , physics , mechanical engineering , philosophy , epistemology , quantum mechanics , politics , political science , law , engineering , operating system
This paper deals with the statistical distribution of the first‐occurrence and first‐recurrence times of the crossing of a given level in a continuous random process. Approximate forms of the first‐occurrence and first‐recurrence time densities are found by considering the successive crossings to form a renewal process. A relatively simple exponential distribution is found to give an appropriate representation of the limiting case when the crossings of the level under consideration are statistically rare events. Numerical examples are worked out for some stationary Gaussian processes. The method is of use in evaluating survival probabilities for randomly excited mechanical systems subject to failure upon occurrence of a sufficiently high load.
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