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Andrea N. Ceretani
Researcher at National Scientific and Technical Research Council
Publications - 34
Citations - 176
Andrea N. Ceretani is an academic researcher from National Scientific and Technical Research Council. The author has contributed to research in topics: Boundary value problem & Stefan problem. The author has an hindex of 6, co-authored 32 publications receiving 125 citations. Previous affiliations of Andrea N. Ceretani include National University of Rosario & Humboldt University of Berlin.
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An exact solution to a Stefan problem with variable thermal conductivity and a Robin boundary condition
TL;DR: In this article, the authors proved the existence of similarity solutions for a one-phase Stefan problem with temperature-dependent thermal conductivity and a Robin condition at the fixed face, where the temperature distribution is obtained through a generalized modified error function which is defined as the solution to a nonlinear ordinary differential problem of second order.
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Modeling peristaltic flow in vessels equipped with valves: Implications for vasomotion in bat wing venules
TL;DR: In this article, the authors studied the flow of a Newtonian fluid through a vessel provided with valves ensuring a unidirectional motion and whose walls are animated by periodic peristaltic waves.
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The Boussinesq system with mixed non-smooth boundary conditions and do-nothing boundary flow
TL;DR: In this article, a stationary Boussinesq system for an incompressible viscous fluid in a bounded domain with a nontrivial condition at an open boundary is studied.
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Existence and uniqueness of the modified error function
TL;DR: In this article, the existence and uniqueness of the modified error function introduced in Cho and Sunderland (1974) was proved. But it was not shown that this function has a unique analytic solution when the parameter assumes small positive values.
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Existence and uniqueness of the modified error function
TL;DR: It is proved that the modified error function introduced in Cho and Sunderland (1974) has a unique non-negative analytic solution when the parameter assumes small positive values.