A dynamic viscosity function plays an important role in water hammer modeling. It is responsible for dispersion and decay of pressure and velocity histories. In this paper, a novel method for inverse Laplace transform of this complicated function being the square root of the ratio of Bessel functions of zero and second order is presented. The obtained time domain solutions are dependent on infinite exponential series and Calogero–Ahmed summation formulas. Both of these functions are based on zeros of Bessel functions. An analytical inverse will help in the near future to derive a complete analytical solution of this unsolved mathematical problem concerning the water hammer phenomenon. One can next present a simplified approximate form of th...
AbstractIn this paper, a new fast and efficient algorithm, Chebyshev super spectral viscosity (SSV) ...
Finite Element codes used for solving the mechanical equilibrium equations in transient problems ass...
Simplified flood propagation models are often employed in practical applications for hydraulic and h...
A dynamic viscosity function plays an important role in water hammer modeling. It is responsible for...
A transient or water hammer event is initiated whenever a steady-state condition in a pipeline is di...
Laplace transform represents one of the most used transforms in time domain. There exist two possibl...
The presence of a leak within a single line system alters the dynamic behavior of the system when su...
The transient modelling of pipeline systems is typically performed by discrete nonlinear partial dif...
The Laplace transform analytic element method (LT-AEM), applies the traditionally steady-state analy...
Application of numerical inversion of the Laplace transform to the inverse problem in transient heat...
The pressure surge that results from a step change of flow in liquid pipelines, commonly known as wa...
The Laplace transform is powerful method for solving differential equations. This paper presents the...
In this paper, a new fast and efficient algorithm, Chebyshev super spectral viscosity (SSV) method, ...
This dissertation involves mathematical models of water flow in a pipeline system. The topic has bee...
An analytical solution with high accuracy which holds for any values of epsilon for fluid-dynamics m...
AbstractIn this paper, a new fast and efficient algorithm, Chebyshev super spectral viscosity (SSV) ...
Finite Element codes used for solving the mechanical equilibrium equations in transient problems ass...
Simplified flood propagation models are often employed in practical applications for hydraulic and h...
A dynamic viscosity function plays an important role in water hammer modeling. It is responsible for...
A transient or water hammer event is initiated whenever a steady-state condition in a pipeline is di...
Laplace transform represents one of the most used transforms in time domain. There exist two possibl...
The presence of a leak within a single line system alters the dynamic behavior of the system when su...
The transient modelling of pipeline systems is typically performed by discrete nonlinear partial dif...
The Laplace transform analytic element method (LT-AEM), applies the traditionally steady-state analy...
Application of numerical inversion of the Laplace transform to the inverse problem in transient heat...
The pressure surge that results from a step change of flow in liquid pipelines, commonly known as wa...
The Laplace transform is powerful method for solving differential equations. This paper presents the...
In this paper, a new fast and efficient algorithm, Chebyshev super spectral viscosity (SSV) method, ...
This dissertation involves mathematical models of water flow in a pipeline system. The topic has bee...
An analytical solution with high accuracy which holds for any values of epsilon for fluid-dynamics m...
AbstractIn this paper, a new fast and efficient algorithm, Chebyshev super spectral viscosity (SSV) ...
Finite Element codes used for solving the mechanical equilibrium equations in transient problems ass...
Simplified flood propagation models are often employed in practical applications for hydraulic and h...