FILIPAN, Veljko ;VIRAG, Zdravko ;BERGANT, Anton . Mathematical Modelling of a Hydraulic Ram Pump System. Strojniški vestnik - Journal of Mechanical Engineering, [S.l.], v. 49, n.3, p. 137-149, july 2017. ISSN 0039-2480. Available at: <https://www.sv-jme.eu/article/mathematical-modelling-of-a-hydraulic-ram-pump-system/>. Date accessed: 19 nov. 2024. doi:http://dx.doi.org/.
Filipan, V., Virag, Z., & Bergant, A. (2003). Mathematical Modelling of a Hydraulic Ram Pump System. Strojniški vestnik - Journal of Mechanical Engineering, 49(3), 137-149. doi:http://dx.doi.org/
@article{.,
author = {Veljko Filipan and Zdravko Virag and Anton Bergant},
title = {Mathematical Modelling of a Hydraulic Ram Pump System},
journal = {Strojniški vestnik - Journal of Mechanical Engineering},
volume = {49},
number = {3},
year = {2003},
keywords = {hydraulic rams; pumping systems; water hammer; method of characteristics - MOC; },
abstract = {In this paper we present the mathematical modelling of a hydraulic ram rump (HRP) system and an explanation of the simplified working cycle of its action. The flow in the HRP system is unsteady; therefore, unsteady pipe-flow equations and the method of characteristics (MOC) are given. The mathematical modelling of particular components of the HRP system is explained in detail. The drive and delivery pipes are modelled by a fixed grid MOC, and the supply and delivery tanks are the boundary conditions open reservoirs with a constant water level. The HRP is modelled as a unit boundary condition describing the physics of its action. This boundary condition consists of 11 equations with 11 dependent variables and is solved by an iterative procedure for each time step of the computational run. The derived model is programmed for a digital computer. A computer simulation using input data from the literature is made and the results are presented in the form of pressure and velocity vs. time graphs.},
issn = {0039-2480}, pages = {137-149}, doi = {},
url = {https://www.sv-jme.eu/article/mathematical-modelling-of-a-hydraulic-ram-pump-system/}
}
Filipan, V.,Virag, Z.,Bergant, A. 2003 July 49. Mathematical Modelling of a Hydraulic Ram Pump System. Strojniški vestnik - Journal of Mechanical Engineering. [Online] 49:3
%A Filipan, Veljko %A Virag, Zdravko %A Bergant, Anton %D 2003 %T Mathematical Modelling of a Hydraulic Ram Pump System %B 2003 %9 hydraulic rams; pumping systems; water hammer; method of characteristics - MOC; %! Mathematical Modelling of a Hydraulic Ram Pump System %K hydraulic rams; pumping systems; water hammer; method of characteristics - MOC; %X In this paper we present the mathematical modelling of a hydraulic ram rump (HRP) system and an explanation of the simplified working cycle of its action. The flow in the HRP system is unsteady; therefore, unsteady pipe-flow equations and the method of characteristics (MOC) are given. The mathematical modelling of particular components of the HRP system is explained in detail. The drive and delivery pipes are modelled by a fixed grid MOC, and the supply and delivery tanks are the boundary conditions open reservoirs with a constant water level. The HRP is modelled as a unit boundary condition describing the physics of its action. This boundary condition consists of 11 equations with 11 dependent variables and is solved by an iterative procedure for each time step of the computational run. The derived model is programmed for a digital computer. A computer simulation using input data from the literature is made and the results are presented in the form of pressure and velocity vs. time graphs. %U https://www.sv-jme.eu/article/mathematical-modelling-of-a-hydraulic-ram-pump-system/ %0 Journal Article %R %& 137 %P 13 %J Strojniški vestnik - Journal of Mechanical Engineering %V 49 %N 3 %@ 0039-2480 %8 2017-07-07 %7 2017-07-07
Filipan, Veljko, Zdravko Virag, & Anton Bergant. "Mathematical Modelling of a Hydraulic Ram Pump System." Strojniški vestnik - Journal of Mechanical Engineering [Online], 49.3 (2003): 137-149. Web. 19 Nov. 2024
TY - JOUR AU - Filipan, Veljko AU - Virag, Zdravko AU - Bergant, Anton PY - 2003 TI - Mathematical Modelling of a Hydraulic Ram Pump System JF - Strojniški vestnik - Journal of Mechanical Engineering DO - KW - hydraulic rams; pumping systems; water hammer; method of characteristics - MOC; N2 - In this paper we present the mathematical modelling of a hydraulic ram rump (HRP) system and an explanation of the simplified working cycle of its action. The flow in the HRP system is unsteady; therefore, unsteady pipe-flow equations and the method of characteristics (MOC) are given. The mathematical modelling of particular components of the HRP system is explained in detail. The drive and delivery pipes are modelled by a fixed grid MOC, and the supply and delivery tanks are the boundary conditions open reservoirs with a constant water level. The HRP is modelled as a unit boundary condition describing the physics of its action. This boundary condition consists of 11 equations with 11 dependent variables and is solved by an iterative procedure for each time step of the computational run. The derived model is programmed for a digital computer. A computer simulation using input data from the literature is made and the results are presented in the form of pressure and velocity vs. time graphs. UR - https://www.sv-jme.eu/article/mathematical-modelling-of-a-hydraulic-ram-pump-system/
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author = {Filipan, V., Virag, Z., Bergant, A.},
title = {Mathematical Modelling of a Hydraulic Ram Pump System},
journal = {Strojniški vestnik - Journal of Mechanical Engineering},
volume = {49},
number = {3},
year = {2003},
doi = {},
url = {https://www.sv-jme.eu/article/mathematical-modelling-of-a-hydraulic-ram-pump-system/}
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TY - JOUR AU - Filipan, Veljko AU - Virag, Zdravko AU - Bergant, Anton PY - 2017/07/07 TI - Mathematical Modelling of a Hydraulic Ram Pump System JF - Strojniški vestnik - Journal of Mechanical Engineering; Vol 49, No 3 (2003): Strojniški vestnik - Journal of Mechanical Engineering DO - KW - hydraulic rams, pumping systems, water hammer, method of characteristics - MOC, N2 - In this paper we present the mathematical modelling of a hydraulic ram rump (HRP) system and an explanation of the simplified working cycle of its action. The flow in the HRP system is unsteady; therefore, unsteady pipe-flow equations and the method of characteristics (MOC) are given. The mathematical modelling of particular components of the HRP system is explained in detail. The drive and delivery pipes are modelled by a fixed grid MOC, and the supply and delivery tanks are the boundary conditions open reservoirs with a constant water level. The HRP is modelled as a unit boundary condition describing the physics of its action. This boundary condition consists of 11 equations with 11 dependent variables and is solved by an iterative procedure for each time step of the computational run. The derived model is programmed for a digital computer. A computer simulation using input data from the literature is made and the results are presented in the form of pressure and velocity vs. time graphs. UR - https://www.sv-jme.eu/article/mathematical-modelling-of-a-hydraulic-ram-pump-system/
Filipan, Veljko, Virag, Zdravko, AND Bergant, Anton. "Mathematical Modelling of a Hydraulic Ram Pump System" Strojniški vestnik - Journal of Mechanical Engineering [Online], Volume 49 Number 3 (07 July 2017)
Strojniški vestnik - Journal of Mechanical Engineering 49(2003)3, 137-149
© The Authors, CC-BY 4.0 Int. Change in copyright policy from 2022, Jan 1st.
In this paper we present the mathematical modelling of a hydraulic ram rump (HRP) system and an explanation of the simplified working cycle of its action. The flow in the HRP system is unsteady; therefore, unsteady pipe-flow equations and the method of characteristics (MOC) are given. The mathematical modelling of particular components of the HRP system is explained in detail. The drive and delivery pipes are modelled by a fixed grid MOC, and the supply and delivery tanks are the boundary conditions open reservoirs with a constant water level. The HRP is modelled as a unit boundary condition describing the physics of its action. This boundary condition consists of 11 equations with 11 dependent variables and is solved by an iterative procedure for each time step of the computational run. The derived model is programmed for a digital computer. A computer simulation using input data from the literature is made and the results are presented in the form of pressure and velocity vs. time graphs.