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Lecture Objectives:. 1) Discuss HW3 problems 2) Define Relaxation (example) 3) Define boundary conditions for CFD Model Boundary conditions . Residual calculation for CFD. Residual for the cell R F ijk = F k ijk - F k-1 ijk Total residual for the simulation domain
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Lecture Objectives: 1) Discuss HW3 problems 2) Define Relaxation (example) 3) Define boundary conditions for CFD • Model Boundary conditions
Residual calculation for CFD • Residual for the cell RFijk=Fkijk-Fk-1ijk • Total residual for the simulation domain RFtotal=S|RFijk| • Scaled (normalized) residual RF=S|RFijk|/FF iteration cell position Variable: p,V,T,… For all cells Flux of variable F used for normalization Vary for different CFD software
Relaxation Relaxation with iterative solvers: When the equations are nonlinear it can happen that you get divergency in iterative procedure for solving considered time step divergence variable solution convergence Solution is Under-Relaxation: Y*=f·Y(n)+(1-f)·Y(n-1) Y – considered parameter , n –iteration , f – relaxation factor For our example Y*in iteration101=f·Y(100)+(1-f) ·Y(99) f = [0-1] – under-relaxation -stabilize the iteration f = [1-2] – over-relaxation - speed-up the convergence iteration Value which is should be used for the next iteration Under-Relaxation is often required when you have nonlinear equations!
Example of relaxation(example from homework 3 assignment) Example: Advection diffusion equation, 1-D, steady-state, 4 nodes 1) Explicit format: 4 3 1 2 2) Guess initial values: 3) Substitute and calculate: Substitute and calculate: 4) Substitute and calculate: ………………………….
Boundary Conditions CFD ACCURACYDepends on airflow in the vicinity of Boundary conditions 1) At air supply device 2) In the vicinity of occupant 3) At room surfaces • Detailed modeling • limited by • computer power
Define Boundary Conditions at: • Surfaces (wall functions) • Velocity • Temperature • Concentration • Inlets and outlets • Diffusers and outlets • Windows and cracks
Diffuser Types Valve diffuser swirl diffusers ceiling diffuser wall or ceiling floor
Diffuser Types Grill (side wall) diffusers Linear diffusers Vertical Horizontal one side
momentum sources Diffuser modeling Complex geometry - Δ~10-4m We can spend all our computing power for one small detail Momentum method
Diffuser Modeling Fine mesh or box method for diffuser modeling
Diffuser modeling High Aspiration diffuser D D L L Jet through one opening only
Jet parameters A0 - effective area of the diffuser V0 – initial jet velocity X - distance from the diffuser Vm – maximum jet velocity at distance x from the diffuser K – property of diffuser
20.4 ASHRAE method: Diffuser properties (ASHRAE) Fig. 1 Airflow patterns of different diffusers
Surface boundarieswall functions Wall surface Use wall functions to model the micro-flow in the vicinity of surface Using relatively large mesh (cell) size.
Surface boundary conditions and log-wall functions E is the integration constant and y* is a length scale y*- thickness of boundary layer The assumption of ‘constant shear stress’ is used here. Constants k = 0.41 and E = 8.43 fit well to a range of boundary layer flows. Surface cell Turbulent profile Laminar sub-layer
