@article{oai:kanazawa-u.repo.nii.ac.jp:00056442,
 author = {Tsuda, Takeaki and Hasegawa, Tomiichi and Narumi, Takatune and 津田, 武明 and 長谷川, 富市 and 鳴海, 敬倫},
 issue = {4},
 journal = {日本レオロジー学会誌, Journal of the Society of Rheology, Japan},
 month = {},
 note = {One-dimensional flow model for non-Newtonian fluids in a dual cavity slot die is presented. The viscosity of non-Newtonian fluids is treated as the Ellis model. The conservation equations of mass and momentum in a dual-cavity slot die are one-dimensionally simplified by assuming an appropriate mean flow over the cross section of the flow. The flow field in the slot is assumed to be fully developed. The equations of flow for the cavity and the slot are derived separately and then coupled. We use a finite difference method to solve these governing equations. Using this model, we find that the location and the cross-section area of a secondary cavity have large effects on the distribution of outlet flow. It is concluded that the dual cavity die can effectively reduce the flow non-uniformity., 金沢大学先端科学・社会共創推進機構},
 pages = {179--185},
 title = {2段分配室付押出し金型内の流れに関する研究},
 volume = {30},
 year = {2002}
}