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Mass Conservation in Numerical Simulation of Resin Flow”. 2000 [23] Tucker CL, Dessenberger RB. Governing equations for flow and heat transfer in stationary fiber beds. In: Advani SG, editor. Flow and rheology in polymer composites manufacturing. Amsterdam: Elsevier; p. 257–323. 1994. [24] Lin M, Hahn HT, Huh H. A finite element simulation of resin transfer molding based on partial nodal saturation and implicit time integration. Composites Part A 1998;29:541–50. [25] B. Delaunay: Sur la sphère vide, Izvestia Akademii Nauk SSSR, Otdelenie Matematicheskikh i Estestvennykh Nauk, 7:793–800, 1934 [26] F.

R. “Permeability of Unidirectional Reinforcements for RTM”, Journal of Composite Materials, 26(8): 1100–1133. 1992. V. G. A “Finite Element/Control Volume Approach to Mold Filling in Anisotropic Porous Media”, Polymer Composites, 11(6): 398–405. 1990. D. K. Microscale “Permeability Predictions of Porous Fibrous Media”, International Journal of Heat and Mass Transfer, 44(16): 3135–3145. 2001. M. C. “Liquid Flow Through Aligned Fiber Beds”, Polymer Engineering and Science, 14(6): 413–419. 1974. J.

Amsterdam: Elsevier; p. 257–323. 1994. [24] Lin M, Hahn HT, Huh H. A finite element simulation of resin transfer molding based on partial nodal saturation and implicit time integration. Composites Part A 1998;29:541–50. [25] B. Delaunay: Sur la sphère vide, Izvestia Akademii Nauk SSSR, Otdelenie Matematicheskikh i Estestvennykh Nauk, 7:793–800, 1934 [26] F. P. Preparata and M. I. Shamos. Computational Geometry An Introduction. Texts and Monographs in Computer Science. Springer-Verlag, 1985. [27] H.

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