Litcius/Paper detail

Laplace-Domain Fluid–Structure Interaction Solutions for Water Hammer Waves in a Pipe

Alexandre Bayle, Franck Plouraboué

2023Journal of Hydraulic Engineering15 citationsDOIOpen Access PDF

Abstract

Numerical methods generally need analytical solutions as test cases and validations in simplified problems. This work provides Laplace-domain explicit analytic solutions for fluid–structure interaction (FSI) water hammer waves within a pipe. Rather than applying the transfer matrix method (TMM) to the FSI four equations, it is transposed to the equivalent two-wave propagating problem considered instead. Using the classical wave matrix diagonalization approach permits decoupling the waves’ propagation while at the same time coupling boundary conditions in the diagonal base. This approach permits the transfer matrix for coupled waves boundary conditions to be provided so as to obtain a Laplace-domain solution for the pressure/stress vector solution. This solution is written in a general framework that can be adapted for general applied boundary conditions for a single pipe. Three sets of boundary conditions are considered as examples and illustrations from solving the inverse Laplace transform of the considered explicit solutions. Consistent results with recently proposed time-domain solutions are found, and a one-to-one mapping between Laplace-domain and time-domain approaches is also established. This permits finding the discrete spectrum of FSI water hammer wave mode decomposition from TMM solutions.

Topics & Concepts

Water hammerLaplace transformMathematical analysisBoundary value problemMathematicsTransfer matrixMechanicsPhysicsComputer scienceComputer visionGeotechnical Engineering and Underground StructuresWater Systems and OptimizationSeismic Waves and Analysis
Laplace-Domain Fluid–Structure Interaction Solutions for Water Hammer Waves in a Pipe | Litcius