Circular and annular two-phase plates of minimal compliance

  • Krzysztof Kolanek Institute of Fundamental Technological Research, Polish Academy of Sciences
  • Tomasz Lewiński Warsaw University of Technology

Abstract

The paper deals with optimal design of thin plates. The plate thickness assumes two possible values: h2 and hl and the plate volume is given. The problem of minimizing the plate compliance needs relaxation. The relaxed formulation was found by Gibiansky and Cherkaev in 1984 [13] . In the present paper a finite element approximation of this problem is presented in the framework of rotationally symmetric bending of circular and annular plates. The problem is composed of a nonlinear equilibrium problem coupled with a minimum compliance problem. The aim of the present paper is to analyze the forms of the optimal solutions, in particular, to look into the underlying microstructures. It is proved that in some solutions a ribbed microstructure occurs with ribs non-coinciding with both the radial and circumferential directions. Due to non-uniqueness of the sign of an angle of inclination of ribs the appearance of this microstructure does not contrasts with the radial symmetry of the problem. In the degenerated problem when the smallest thickness hl vanishes the above interpretation of the inclined ribbed microstructure becomes incorrect; in these regions one can assume that the plate is solid but with a varying thickness. The degenerated case of h1 = 0 was considered in the papers by Rozvany et al. [26] and Ong et al. [25] but there such a microstructure was not taken into account. One of the aims of the paper is to re-examine these classical and frequently cited results.

Keywords

References

[1] G. Allaire, R.V. Kohn. Explicit optimal bounds on the elastic energy of a two-phase composite in two space dimensions. Q. Appl. Math., 51: 675- 699, 1993.
[2] G. Allaire, R.V. Kohn. Optimal design for minimum weight and compliance in plane stress using extremal microstructures, Eur. J. Mech., A/ Solids, 12: 839- 878, 1993.
[3] F. Belblidia, S.M. Afonso, E. Hinton, G.C.R. Antonino. Integrated design optimization of stiffened plate structures. Eng. Computations, 16: 934- 951, 1999.
[4] M.P. Bendsøe. Optimization of Structural Topology, Shape and Material. Springer, Berlin, 1995.
[5] M.P. Bendsøe, O. Sigmund. Material interpolation schemes in topology optimization. Arch. Appl. Mech. , 69: 635- 654, 1999.
Published
Jan 27, 2023
How to Cite
KOLANEK, Krzysztof; LEWIŃSKI, Tomasz. Circular and annular two-phase plates of minimal compliance. Computer Assisted Methods in Engineering and Science, [S.l.], v. 10, n. 2, p. 177-199, jan. 2023. ISSN 2956-5839. Available at: <https://cames.ippt.pan.pl/index.php/cames/article/view/1086>. Date accessed: 23 dec. 2024.
Section
Articles