Innovation, Green, Humanity, Moderate, Impact, & Sustainability
Muhammad Manaqib, M.Sc.
Name | Muhammad Manaqib, M.Sc. |
Post | Pure and Applied Mathematics Laboratory |
Academic Career | Graduate degree: Master of Science in Mathematics, UGM-Yogyakarta, 2015 Undergraduate degree: Bachelor of Mathematics, UNY-Yogyakarta, 2013 |
Employment | Assistant Professor |
Research and Development Project over the last 5 years | Population Dynamics.Dual Reciprocity Boundary Element Method (DRBEM)Vehicle Routing Problem |
Industry Collaboration over the last 5 years | |
Patents and Proprietary Rights | Computer Program Prediction And Simulation For The Dynamic Epidemiological Model In Controlling Dengue Transmission In Indonesia (202 |
Important Publication over the last 5 years | [1] M. Manaqib and R. D. Pantoro, “MULTI-OBJECTIVE VEHICLE ROUTING PROBLEM WITH TIME WINDOWS USING GOAL PROGRAMMING APPROACH TO SOLVE TOURIST BUS ROUTE OPTIMIZATION PROBLEM” Sainstek: Journal of Science and Technology, vol. 9, no. 1, pp. 76–84, 2018. [2] M. Manaqib, “Solving Boundary Conditions Problem Using the Dual Reciprocity Boundary Element Method” ,no. 2, pp. 115–132, 2018. [3] M. Manaqib, I. Fauziah, and M. Mujiyanti, “Mathematical Model for MERS-COV Disease Transmission with Medical Mask Usage and Vaccination,” InPrime: Indonesian Journal of Pure and Applied Mathematics, vol. 1, no. 2, pp. 30–42, 2019, doi: 10.15408/inprime.v1i2.13553. [4] N. Inayah, M. Manaqib, N. Fitriyati, and I. Yupinto, “Mathematical Model of the Spread of Pulmonary Tuberculosis with the Use of Medical Masks,” BAREKENG: Journal of Mathematics and Applied Sciences”, vol. 14, no. 3, pp. 461–472, 2020, doi: 10.30598/barekengvol14iss3pp461-472. [5] A. Nurhasanah, M. Manaqib, and I. Fauziah, “Analysis Infiltration Waters in Various Forms of Irrigation Channels by Using Dual Reciprocity Boundary ElementMethod,”Mathematics journal“MANTIK,” vol. 6, no. 1, pp. 52–65,2020,doi:10.15642/mantik.2020.6.1.52-65. [6] N. Inayah, M. Manaqib, and W. N. Majid, “Furrow irrigation infiltration in various soil types using dual reciprocity boundary element method,” in AIP Conference Proceedings, Feb. 2021, vol. 2329. doi: 10.1063/5.0042682. [7] M. Manaqib, M. Azizah, E. Hartati S., S. Pratiwi, and R. A. Maulana, “Analysis of Mathematical Model for the Spread of COVID-19 with Lockdown and Quarantine,” BAREKENG: Journal of Mathematics and Applied Sciences, vol. 15, no. 3, pp. 479–492, Sep. 2021, doi: 10.30598/barekengvol15iss3pp479-492. [8] M. Manaqib, I. Fauziah, and E. Hartati, “Mathematical Model of COVID-19 Spread with the Use of Health Masks and Quarantine,” Jambura Journal of Biomathematics (JJBM), vol. 2, no. 2, pp. 68–79, Oct. 2021, doi: 10.34312/jjbm.v2i2.10483. [9] W. Irawan, M. Manaqib, and N. Fitriyati, “Implementation of the Model Capacited Vehicle Routing Problem with Time Windows with a Goal Programming Approach in Determining the Best Route for Goods Distribution,”Journal of Mathematics, Statistics, and Computing, vol. 17, no. 2, pp. 231–239, Dec. 2020, doi: 10.20956/jmsk.v17i2.11107. [10] M. Manaqib, I. Fauziah, and W. T. Asih, “Mathematical Model of Human Papillomavirus (HPV) Transmission in Cervical Cancer Disease” Jurnal Matematika UNAND, vol. 11, no. 4, pp. 230–245, 2022. [11] Suma’inna, M. Manaqib, and N. Farhana, “Mathematical model of cholera disease through individuals contact, water resources, fly and fish vectors,” 2022, p. 020009. doi: 10.1063/5.0082967. [12] Suma’inna, M. Manaqib, and M. A. Silvani, “Mathematical Model of Ebola Virus Disease through Human Transmission and Bat Transmission,” in AIP Conference Proceedings, Aug. 2022, vol. 2498. doi: 10.1063/5.0083006. [13] M. Manaqib, S. Suma’inna, and A. Zahra, “MATHEMATICAL MODEL OF THREE SPECIES FOOD CHAIN WITH INTRASPECIFIC COMPETITION AND HARVESTING ON PREDATOR,” BAREKENG: Jurnal Ilmu Matematika dan Terapan, vol. 16, no. 2, pp. 551–562, Jun. 2022, doi: 10.30598/barekengvol16iss2pp551-562. [14] N. Inayah, M. Manaqib, and M. F. Fadillah, “Mathematics Model of COVID-19 with Two-Stage Vaccination, Symptomatic, Asymptomatic, and Quarantine Individuals,” CAUCHY: Jurnal Matematika Murni dan Aplikasi, vol. 7, no. 3, pp. 370–383, Oct. 2022, doi: 10.18860/ca.v7i3.15188. [15] M. Manaqib, F. Irma, and B. F. Apriyanto, “Mathematical Model of Cholera Transmission through Individual Contacts, Water Sources, and Flies” Vygotsky, vol. 4, no. 2, p. 79, Aug. 2022, doi: 10.30736/voj.v4i2.539.Suma Inna, Dina Mariana, Mahmudi Mahmudi, Muhammad Manaqib”Ordinal Logistic Regression Analysis of Factors Influencing the Waiting Time for Employment of Mathematics Alumni at FST UIN Syarif Hidayatullah Jakarta”, Vol 8, No 2 (2023)Suma Suma Inna, I Fauziah, M Manaqib, PM Putri,”Solution Operator of Compressible Fluid Model of Korteweg Type with Slip Boundary Conditions in Half-Space: A Case of Coefficient ((μ + ν)/(2 κ))^2 -(1/κ) > 0, κ =μ ν , μ≠ν”, Journal of Mathematics and Its Application, Volume 20, Issue 2 M Manaqib, Mahmudi, G Prayoga, “Mathematical Model Simulation of the Spread of COVID-19 with Vaccination, Implementation of Health Protocols, and Treatment” Jambura Journal of Biomathematics (JJBM), Volume 4, Issue 1 W Irawan, M Manaqib, W Irawan, N Fitriyati. (2021). Implementation of the model capacited vehicle routing problem with time windows with a goal programming approach in determining the best route for goods distribution.Journal of Mathematics,Statistics,and Computing17(2). https://doi.org/10.20956/jmsk.v17i2.11107 |