mttr: Mean Time To Repair (MTTR) Function
In smmR: Simulation, Estimation and Reliability of Semi-Markov Models
Description
Usage
Arguments
Details
Value
References
Description
Consider a system S_{ystem} that has just failed at time
k = 0. The mean time to repair (MTTR) is defined as the mean of the
repair duration.
Usage
1
mttr(x, upstates = x$states, level = 0.95, klim = 10000)
Arguments
x
An object of S3 class smmfit or smm.
upstates
Vector giving the subset of operational states U.
level
Confidence level of the asymptotic confidence interval. Helpful
for an object x of class smmfit.
klim
Optional. The time horizon used to approximate the series in the
computation of the mean sojourn times vector m (cf.
meanSojournTimes function) for the asymptotic variance.
Details
Consider a system (or a component) S_{ystem} whose possible
states during its evolution in time are E = \{1,…,s\}.
Denote by U = \{1,…,s_1\} the subset of operational states of
the system (the up states) and by D = \{s_1 + 1,…,s\} the
subset of failure states (the down states), with 0 < s_1 < s
(obviously, E = U \cup D and U \cap D = \emptyset,
U \neq \emptyset,\ D \neq \emptyset). One can think of the states
of U as different operating modes or performance levels of the
system, whereas the states of D can be seen as failures of the
systems with different modes.
We are interested in investigating the mean time to repair of a
discrete-time semi-Markov system S_{ystem}. Consequently, we suppose
that the evolution in time of the system is governed by an E-state space
semi-Markov chain (Z_k)_{k \in N}. The system has just failed at
instant 0 and the state of the system is given at each instant
k \in N by Z_k: the event \{Z_k = i\}, for a certain
i \in U, means that the system S_{ystem} is in operating mode
i at time k, whereas \{Z_k = j\}, for a certain
j \in D, means that the system is not operational at time k
due to the mode of failure j or that the system is under the
repairing mode j.
Let T_U denote the first passage time in subset U, called the
duration of repair or repair time, i.e.,
T_U := \textrm{inf}\{ n \in N;\ Z_n \in U\}\ \textrm{and}\ \textrm{inf}\ \emptyset := ∞.
The mean time to repair (MTTR) is defined as the mean of the repair
duration, i.e., the expectation of the hitting time to up set U,
MTTR = E[T_{U}]
Value
A matrix with \textrm{card}(U) = s_{1} rows, and with columns
giving values of the mean time to repair for each state i \in U,
variances, lower and upper asymptotic confidence limits (if x is an
object of class smmfit).
References
V. S. Barbu, N. Limnios. (2008). Semi-Markov Chains and Hidden Semi-Markov
Models Toward Applications - Their Use in Reliability and DNA Analysis.
New York: Lecture Notes in Statistics, vol. 191, Springer.
I. Votsi & A. Brouste (2019) Confidence interval for the mean time to
failure in semi-Markov models: an application to wind energy production,
Journal of Applied Statistics, 46:10, 1756-1773
smmR documentation built on Aug. 3, 2021, 5:07 p.m.
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Description Usage Arguments Details Value References
Description
Consider a system S_{ystem} that has just failed at time k = 0. The mean time to repair (MTTR) is defined as the mean of the repair duration.
Usage
1 | mttr(x, upstates = x$states, level = 0.95, klim = 10000)
|
Arguments
x |
An object of S3 class |
upstates |
Vector giving the subset of operational states U. |
level |
Confidence level of the asymptotic confidence interval. Helpful
for an object |
klim |
Optional. The time horizon used to approximate the series in the computation of the mean sojourn times vector m (cf. meanSojournTimes function) for the asymptotic variance. |
Details
Consider a system (or a component) S_{ystem} whose possible states during its evolution in time are E = \{1,…,s\}. Denote by U = \{1,…,s_1\} the subset of operational states of the system (the up states) and by D = \{s_1 + 1,…,s\} the subset of failure states (the down states), with 0 < s_1 < s (obviously, E = U \cup D and U \cap D = \emptyset, U \neq \emptyset,\ D \neq \emptyset). One can think of the states of U as different operating modes or performance levels of the system, whereas the states of D can be seen as failures of the systems with different modes.
We are interested in investigating the mean time to repair of a discrete-time semi-Markov system S_{ystem}. Consequently, we suppose that the evolution in time of the system is governed by an E-state space semi-Markov chain (Z_k)_{k \in N}. The system has just failed at instant 0 and the state of the system is given at each instant k \in N by Z_k: the event \{Z_k = i\}, for a certain i \in U, means that the system S_{ystem} is in operating mode i at time k, whereas \{Z_k = j\}, for a certain j \in D, means that the system is not operational at time k due to the mode of failure j or that the system is under the repairing mode j.
Let T_U denote the first passage time in subset U, called the duration of repair or repair time, i.e.,
T_U := \textrm{inf}\{ n \in N;\ Z_n \in U\}\ \textrm{and}\ \textrm{inf}\ \emptyset := ∞.
The mean time to repair (MTTR) is defined as the mean of the repair duration, i.e., the expectation of the hitting time to up set U,
MTTR = E[T_{U}]
Value
A matrix with \textrm{card}(U) = s_{1} rows, and with columns
giving values of the mean time to repair for each state i \in U,
variances, lower and upper asymptotic confidence limits (if x is an
object of class smmfit).
References
V. S. Barbu, N. Limnios. (2008). Semi-Markov Chains and Hidden Semi-Markov Models Toward Applications - Their Use in Reliability and DNA Analysis. New York: Lecture Notes in Statistics, vol. 191, Springer.
I. Votsi & A. Brouste (2019) Confidence interval for the mean time to failure in semi-Markov models: an application to wind energy production, Journal of Applied Statistics, 46:10, 1756-1773
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