eprintid: 842 rev_number: 2 eprint_status: archive userid: 1 dir: disk0/00/00/08/42 datestamp: 2023-11-09 15:48:59 lastmod: 2023-11-09 15:48:59 status_changed: 2023-11-09 15:38:35 type: conference_item metadata_visibility: show creators_name: Oumer, A.N. creators_name: Ali, A.M.S. creators_name: Mamat, O.B. title: Three dimensional simulation of suspension flow in a mold cavity ispublished: pub keywords: Cross model; Dilute suspensions; Evolution equations; Fiber orientation distribution; Fiber orientation equations; Fiber suspension; Fiber suspension flow; Finite volume; Fourth order; Governing equations; Hybrid closure model; Immiscible phasis; Injection molding process; Liquid suspension; Mold cavities; Non-newtonian; Non-Newtonian fluids; Nonisothermal; Numerical algorithms; Numerical results; Numerical simulation models; Open-source code; Orientation tensor; Rectangular cavity; Second-order tensors; Shear-thinning behavior; Suspension flows; Test case; Three dimensional cavity; Three dimensional simulations; Volume of fluid method, Air; Algorithms; Computational fluid dynamics; Fibers; Finite volume method; Flow measurement; Injection molding; Microchannels; Molds; Non Newtonian flow; Non Newtonian liquids; Numerical analysis; Open systems; Rheology; Shear flow; Tensors; Three dimensional; Three dimensional computer graphics; Velocity measurement; Viscous flow, Suspensions (fluids) note: cited By 0; Conference of ASME 2010 3rd Joint US-European Fluids Engineering Summer Meeting, FEDSM 2010 Collocated with 8th International Conference on Nanochannels, Microchannels, and Minichannels ; Conference Date: 1 August 2010 Through 5 August 2010; Conference Code:87044 abstract: This paper presents three-dimensional simulation of fiber suspension flows in a cavity using the Finite Volume Method (FVM). The numerical simulation model described makes it possible to predict the propagation of the fiber-polymer solution and fiber orientation during the filling phase. Therefore, the objective of the work is to develop a Computational Fluid Dynamics (CFD) model to simulate and characterize the fiber suspension flow in three dimensional cavities. The model is intended to describe the fiber orientation distribution in three dimensional mold cavities. The continuity, momentum, energy and the fiber orientation equations are solved using the FVM. The flow is considered to be incompressible, non-isothermal, transient, and to behave as non-Newtonian fluid. A numerical analysis is presented to illustrate the application of the FVM to dilute suspension flows in injection molding processes. The volume-of-fluid method is employed to describe the flow of the two incompressible, immiscible phases, i.e., liquid suspension and air. Since the flow is a non-Newtonian, the Cross model is used to describe the shear-thinning behavior of the suspension. The governing equations of the flow and the fiber are implemented and solved by means of the open source code OpenFOAM. The evolution equation of the fiber orientation contains a fourth order orientation tensor which is approximated in terms of second order tensor through the use of appropriate closure rules. In this study the Hybrid closure model of Advani and Tucker is used to approximate the fourth order orientation tensor. To validate the numerical algorithm, test cases of suspension flow in a rectangular cavity are modeled for different fiber-polymer matrices. The numerical results are compared with available experimental findings and with those of Newtonian flows. Copyright © 2010 by ASME. date: 2010 official_url: https://www.scopus.com/inward/record.uri?eid=2-s2.0-80054995094&doi=10.1115%2fFEDSM-ICNMM2010-30355&partnerID=40&md5=e0bf02a5028b05f511bc850e875faa8a id_number: 10.1115/FEDSM-ICNMM2010-30355 full_text_status: none publication: American Society of Mechanical Engineers, Fluids Engineering Division (Publication) FEDSM volume: 1 number: PARTS place_of_pub: Montreal, QC pagerange: 195-200 refereed: TRUE isbn: 9780791849484 issn: 08888116 citation: Oumer, A.N. and Ali, A.M.S. and Mamat, O.B. (2010) Three dimensional simulation of suspension flow in a mold cavity. In: UNSPECIFIED.