Model Petri Net Alur Pelayanan Resep Rumah Sakit X di Kota Malang
Abstract
The phenomenon of queues that we often see is hospital service queues. Considering the current unpredictable weather, many patients are seeking treatment at hospitals. Queues at hospitals occur not only during the registration and doctor's examination processes but also while waiting for medication. This article will model the general patient prescription service system at X hospital in Malang City. The goal is to understand how the service sistem works, which will be modeled using Petri nets. Petri nets are discrete event systems that can model queues. In this study, 11 places and 11 transitions were obtained after modifying the flow to save waiting time. It is hoped that this research will be one of the considerations to improve services, especially for general patient prescription services, so that patients do not have to wait too long to receive their medication. A system or application is needed between the hospital pharmacy and the examining doctor so that prescriptions can be confirmed in real-time. The petri net model was simulated using Petri Net Simulator. The resulting Petri net model is also represented in forward, backward, and incidence matrices to obtain its max-plus algebra for further research
References
[2] Lesnussa, Y. A. & Tutupary, F. S, Aplikasi Petri Net pada Sistem Pelayanan Pasien Rawat Jalan Peserta Askes di Rumah Sakit Umum Daerah Dr. Haulussy Ambon, Gamatika Vol. III No.2, 2013.
[3] Subiono & Nurwan, Model Petri Net Antrian Klinik Kesehatan Serta Kajian Dalam Aljabar Max Plus, Jurnal Matematika FMIPA ITS, Surabaya, 2014.
[4] Pertiwi, Ruvita I, Aplikasi timed petri net pada sistem pelayana IGD Rumah Sakit Umum Daerah DR. Saiful Anwar Malang bagi peserta BPJS dengan menerapkan aljabar maxplus, Science Tech, 2018.
[5] Noertjanyo, JA, SH, 64 tahun Rumah Sakit Panti Nirmala, https://rspantinirmala.com/profile/sejarah, 2024.
[6] Murata, T. Petri Nets: Properties, Analysis and Applications. Proceding of The IEEE, (hal. 541-580), 1989.
[7] Cassandras, C. G., & Lafortune, S, Introduction to Discrete Event Sistems Second Edition, New York: Springer, 2008.
[8] Subiono, Aljabar Min-Max Plus dan Terapannya, Institut Teknologi Sepuluh Nopember, Surabaya, 2015.
[9] Pertiwi, Ruvita I, Pembelajaran matematika terapan dengan petri net dan matriks, Edu sains, 2018
This work is licensed under a Creative Commons Attribution-ShareAlike 4.0 International License.
Authors who publish in UJMC (Unisda Journal of Mathematics and Computer Science) agree to the following terms:
1.Authors retain copyright and grant the journal right of first publication with the work simultaneously licensed under a Creative Commons Attribution License (CC BY-SA 4.0) that allows others to share the work with an acknowledgment of the work's authorship and initial publication in this journal.
2.Authors are able to enter into separate, additional contractual arrangements for the non-exclusive distribution of the journal's published version of the work (e.g., post it to an institutional repository or publish it in a book), with an acknowledgment of its initial publication in this journal.
3.Authors are permitted and encouraged to post their work online (e.g., in institutional repositories or on their website) prior to and during the submission process, as it can lead to productive exchanges, as well as earlier and greater citation of published work.