Alessandra Borrelli
University of Ferrara
56 Papers
292 Citations
Alessandra Borrelli is an academic researcher from University of Ferrara. The author has contributed to research in topics: Flow (mathematics) & Boundary value problem. The author has an hindex of 13, co-authored 55 publications.
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Papers
Saint-Venant's Principle for Antiplane Shear Deformations of Linear Piezoelectric Materials
TL;DR: This paper examines the decay of Saint-Venant end effects in the context of antiplane shear deformations for linear homogeneous piezoelectric solids.
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Numerical simulations of three-dimensional MHD stagnation-point flow of a micropolar fluid
TL;DR: In this paper the steady three-dimensional stagnation-point flow of an incompressible, homogeneous, electrically conducting micropolar fluid over a flat plate is numerically investigated and indicates that the thickness of the boundary layer decreases when the magnetic field increases.
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An exact solution for the 3D MHD stagnation-point flow of a micropolar fluid
TL;DR: It is proved that this flow is possible only in the axisymmetric case, and the governing nonlinear partial differential equations are reduced to a system of ordinary differential equations by a similarity transformation, before being solved numerically.
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Energy bounds in dynamical problems for a semi-infinite magnetoelastic beam
TL;DR: In this paper, the authors investigated the behavior of the total energy of a magnetoelastic conductor occupying a semi-infinite prismatic cylinder in dynamical conditions, and deduced some estimates for the energy of the portion of the medium at distance greater than 3 from the base in terms of the data.
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Exponential decay of end effects in anti-plane shear for functionally graded piezoelectric materials
TL;DR: In this paper, the authors investigated the effect of material inhomogeneity on the decay of Saint-Venant end effects in functionally graded linear piezoelectric solids.
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