CD Skripsi
Model Penyebaran Mers-Cov Dengan Konsentrasi Dipeptidyl Peptidase 4
This final project discusses the MERS-CoV Spread Model with a concentration
of Dipeptidyl Peptidase 4 (DPP4). This model uses a system of nonlinear
differential equations with four compartments, namely virus-free cells, virusinfected
cells, free virus and DPP4. The observed model consists of two
equilibrium points, namely the free point and the infected equilibrium
point. The stability analysis is determined from the basic exprimental number
R0. If R0 < 1 then the system will go to a disease-free equilibrium point which
means the infection will be under control, but if R0 > 1 then the system will go
to an equilibrium point, which means the infection will continue.
Keywords: MERS-CoV, DPP4, system of nonlinear differential equations,
equilibrium point, basic reproduction number
Ketersediaan
Informasi Detail
- Judul Seri
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- No. Panggil
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03 03. 121 (0044)
- Penerbit
- Pekanbaru : Universitas Riau – FMIPA – Matematika., 2021
- Deskripsi Fisik
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xiii, 39 hlm.: ill.: 29 cm
- Bahasa
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Indonesia
- ISBN/ISSN
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- Klasifikasi
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03 03. 121 (0044)
- Tipe Isi
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- Tipe Media
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- Tipe Pembawa
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- Edisi
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- Subjek
- Info Detail Spesifik
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- Pernyataan Tanggungjawab
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ELFITRA
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