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The implantation of a coronary stent in human patients in the treatment of the stenosis is a common clinical procedure (El-Menyar et al., 2007; Goodney & Powell, 2008; Zeller, 2007). Stents are metallic cylindrical structures constituted of a cell-repeated pattern. Basing on cell pattern, stents can be classified as slotted tubes, coil or mesh types (Xia et al., 2007). These devices are rigid scaffolds used to maintain a diseased artery open after the implantation (Timmins, 2007). In order to foresee the mechanical behaviour of the structure and to quantify stresses and strains in the device after the application, computer simulations began to receive attention in the last years, when a number of software tools, based on the Finite Element Method (FEM) were developed. In mechanics, the FEM is the most diffused simulation method, employed to study and predict the physical behaviour of bodies undergoing various external forces that involve complex phenomena like great displacements, large deformation or plasticity.
A large number of studies in literature reports the analysis of the mechanical behaviour of stent devices (Chua et al., 2002; Chua et al., 2004; Etave et al., 2001). Finite Element (FE) models of the whole structure of the stent (Migliavacca et al., 2005; Lally et al., 2005), the half structure or a significant part were analyzed (Chua et al., 2002; Kajzer et al., 2005), taking or not into account the presence of the arterial wall. In addition, other computational models analysed effects of the stent on the blood flow (Lam et al., 2008; LaDisa et al., 2005, 2006; Fung et al., 2008).
FE computational analyses employ a mathematical model to describe the real behaviour of the structure being analyzed and a discrete model of the real structure by the use of finite elements. A FE analysis allows determining only an approximate numerical solution of the problem. In order to verify quality and reliability of the computational solution, the gathering of experimental and analytical data is required. However, FE packages generally report a great amount of warnings and errors that help the operator in the adjustment of the modelling process.
The choice of the mathematical model fulfilling to describe the object of the analysis depends on a theory that, in turn, is selected on object geometry, material properties constituting the object, as well as constraints and loads applied to the body. The accurate selection of the mathematical model minimizes the modelling error, or rather the error due to the difference between the mathematical function used to describe the theoretical behaviour and the physical property of the analyzed body. During the modelling process, a series of choices are generally made about, for example, the choice to model a thin structures with shell elements, to simplify a body considering symmetries and to delete features unessential with respect of the whole structure. In addition, a predefined structural model, based on a small number of parameters, can schematize the mechanical behaviour of the employed materials. Furthermore, another important factor concerning the modelling procedure is the schematization of constraints and loads. The modelling error depends on these factors but is independent from the FE dimensions.