Abstract
Suitable, yet general enough, choices of functional grading along the radius and the thickness of axisymmetric circular plates may lead to closed-form solutions for the linear elastic direct problem. The plates are modeled according to the usual Kirchhoff—Love theory, because they are supposed to be thin; to abstract from actual values of geometric and material parameters, the governing equations are dealt with in nondimensional form. Some instances are presented, along with thorough comments.
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