Most computational fluid dynamics simulations are, at present, performed in a body-fixed frame, for aeronautical purposes. With the advent of sharp manoeuvre, which may lead to transient effects originating in the acceleration of the centre of mass, there is a need to have a consistent formulation of the Navier-Stokes equations in an arbitrarily moving frame. These expressions should be in a form that allows terms to be transformed between non-inertial and inertial frames, and includes gravity, viscous terms, and linear and angular acceleration. Since no effects of body acceleration appear in the inertial frame Navier-Stokes equations themselves, but only in their boundary conditions, it is useful to investigate acceleration source terms in the non-inertial frame. In this paper, a derivation of the energy equation is provided in addition to the continuity and momentum equations previously published. Relevant dimensionless constants are derived which can be used to obtain an indication of the relative significance of acceleration effects. The necessity for using Computational Fluid Dynamics to capture non-linear effects remains and various implementation schemes for accelerating bodies are discussed. This theoretical treatment is intended to provide a foundation for interpretation of aerodynamic effects observed in manoeuvre, particularly for accelerating missiles.
Reference:
Gledhill, I.M.A., Roohani, H., Forsberg, K. et al. 2016. Theoretical treatment of fluid flow for accelerating bodies. Theoretical and Computational Fluid Dynamics, vol 30: 449-467. DOI 10.1007/s00162-016-0382-0
Gledhill, I. M., Roohani, H., Forsberg, K., Eliasson, P., Skews, B., & Nordström, J. (2016). Theoretical treatment of fluid flow for accelerating bodies. http://hdl.handle.net/10204/9040
Gledhill, Irvy MA, H Roohani, K Forsberg, P Eliasson, BW Skews, and J Nordström "Theoretical treatment of fluid flow for accelerating bodies." (2016) http://hdl.handle.net/10204/9040
Gledhill IM, Roohani H, Forsberg K, Eliasson P, Skews B, Nordström J. Theoretical treatment of fluid flow for accelerating bodies. 2016; http://hdl.handle.net/10204/9040.