Numerical solution of partial differential equations in random domains: an application to wind engineering. (English) Zbl 1364.76153
Summary: An application of recent uncertainty quantification techniques to Wind Engineering is presented. In particular, the study of the effects of small geometric changes in the Sunshine Skyway Bridge deck on its aerodynamic behavior is addressed. This results in the numerical solution of a proper PDE posed in a domain affected by randomness, which is handled through a mapping approach. A non-intrusive Polynomial Chaos expansion allows to transform the stochastic problem into a deterministic one, in which a commercial code is used as a black-box for the solution of a number of Reynolds-Averaged Navier-Stokes simulations. The use of proper Gauss-Patterson nested quadrature formulas with respect to a Truncated Weibull probability density function permits to limit the number of these computationally expensive simulations, though maintaining a sufficient accuracy. Polynomial Chaos approximations, statistical moments and probability density functions of time-independent quantities of interest for the engineering applications are obtained.
MSC:
76M25 | Other numerical methods (fluid mechanics) (MSC2010) |
76G25 | General aerodynamics and subsonic flows |
65M99 | Numerical methods for partial differential equations, initial value and time-dependent initial-boundary value problems |
65C20 | Probabilistic models, generic numerical methods in probability and statistics |
35Q35 | PDEs in connection with fluid mechanics |
86-08 | Computational methods for problems pertaining to geophysics |