G. Ayyappan
According to our database1,
G. Ayyappan
authored at least 14 papers
between 2019 and 2023.
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Bibliography
2023
Detection for melanoma skin cancer through ACCF, BPPF, and CLF techniques with machine learning approach.
BMC Bioinform., December, 2023
Analysis of MAP/PH/1 queueing system with catastrophic delay action, standby server, balking, working vacation and vacation interruption under N-policy.
Int. J. Math. Model. Numer. Optimisation, 2023
2022
Analysis of <i>MAP</i>/<i>PH</i><sub>1</sub><i><sup>E</sup></i>, <i>PH</i><sub>2</sub><i><sup>O</sup></i>/1 queue with standby server, second optional service, variant arrival rate, Bernoulli schedule vacation, impatient behaviour of customers, breakdown, essential and optional repair.
Int. J. Math. Oper. Res., 2022
Analysis of <i>MAP</i><sub>1</sub><sup><i>I</i></sup>, <i>PH</i><sub>2</sub><sup><i>O</i></sup>/<i>PH</i><sub>1</sub><sup><i>I</i></sup>, <i>PH</i><sub>2</sub><sup><i>O</i></sup>/1 retrial queue with two-way communication, optional service, single vacation, closedown, setup and balking.
Int. J. Math. Oper. Res., 2022
A MAP/PH<sub>1</sub>, PH<sub>2</sub>/1 system with two types of heterogeneous service, setup, closedown, vacation, immediate feedback, breakdown and repair.
Int. J. Math. Oper. Res., 2022
2021
Analysis of MAP, PH<sub>2</sub><sup>OA</sup>/PH<sub>1</sub><sup>I</sup>, PH<sub>2</sub><sup>O</sup>/1 retrial queue with vacation, feedback, two-way communication and impatient customers.
Soft Comput., 2021
Analysis of MAP/PH/1 queueing model with immediate feedback, starting failures, single vacation, standby server, delayed repair, breakdown and impatient customers.
Int. J. Math. Oper. Res., 2021
Machine learning analysis of queues with MAP, Reneging, Phase Type services, vacations and repairs.
Proceedings of the DSMLAI '21: International Conference on Data Science, Machine Learning and Artificial Intelligence, Windhoek Namibia, August 9, 2021
2020
Analysis of non-pre-emptive priority retrial queueing system with two-way communication, Bernoulli vacation, collisions, working breakdown, immediate feedback and reneging.
Int. J. Math. Oper. Res., 2020
An <i>M</i><sup>[<i>X</i>]</sup>/<i>G</i>(<i>a</i>, <i>b</i>)/1 queue with unreliable server, second optional service, closedown, setup with N-policy and multiple vacation.
Int. J. Math. Oper. Res., 2020
Analysis of a bulk service queue with unreliable server, multiple vacation, overloading and stand-by server.
Int. J. Math. Oper. Res., 2020
Analysis of bulk queue with unreliable service station, second optional repair, N-policy multiple vacation, loss and immediate feedback in production system.
Int. J. Comput. Sci. Math., 2020
2019
An <i>M</i><sup>[<i>X</i>]</sup>/<i>G</i>(<i>a</i>, <i>b</i>)/1 queueing system with server breakdown and repair, stand-by server and single vacation.
Int. J. Math. Oper. Res., 2019
Analysis of batch arrival bulk service queue with additional optional service multiple vacation and setup time.
Int. J. Math. Oper. Res., 2019