Hostname: page-component-586b7cd67f-tf8b9 Total loading time: 0 Render date: 2024-11-23T23:46:06.888Z Has data issue: false hasContentIssue false

Experimental and Modeling Analysis of the Cell-Wall Fracture of Nannochloropsis Oculata

Published online by Cambridge University Press:  29 June 2020

Wei-Hsuan Hsu
Affiliation:
Department of Mechanical Engineering, National United University, Miaoli, Taiwan R.O.C.
Yin-Hsuan Chien
Affiliation:
Department of Power Mechanical Engineering, National Tsing Hua University, Hsinchu, Taiwan R.O.C.
Hung-Yin Tsai*
Affiliation:
Department of Power Mechanical Engineering, National Tsing Hua University, Hsinchu, Taiwan R.O.C.
*
*Corresponding author ([email protected])
Get access

Abstract

In this study, a spherical indenter mounted on an atomic force microscope (AFM) was used to compress a Nannochloropsis oculata (N. oculata) cell on a poly-l-lysine coated slide. A mathematical model of the cell, which was derived by considering a fluid-filled spherical shell with axisymmetric compression between a sphere and an infinite flat plate, is proposed. In the construction of this mathematical model, the spherical shell was assumed to be a homogenous, isotropic, and elastic material. Thin-film theory was applicable to the spherical shell because the thickness of the shell was nearly negligible compared with its diameter. The governing equations of the contact and noncontact regions were converted from a boundary condition problem to an initial value problem. Then, the fourth-order Runge–Kutta method was applied to solve the transformed governing equations. The force curve obtained from the compression experiment was compared with the theoretical results derived from the proposed model. Furthermore, the numerical solution of the proposed model was verified to be consistent with the experimental data. The mechanical properties of cell walls were confirmed by applying the least square error method. Subsequently, the contact radius, inner pressure and tension distribution of the cell wall could be determined using the proposed model. The models proposed in other studies are suitable for analyzing the compression characteristics of cells whose size is of the order of tens of micrometers and millimeters. By contrast, the model proposed in this study can analyze the compression characteristics of N. oculata, which is only a few micrometers in diameter. Furthermore, a force curve that accurately describes the deformation behavior of N. oculata under strain levels of 25% was established.

Type
Research Article
Copyright
Copyright © 2020 The Society of Theoretical and Applied Mechanics

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

Lim, C. T., Zhou, E. H. and Quek, S. T., “Mechanical Models for Living Cells—A Review,” Journal of Biomechanics, 39, pp. 195216 (2006).CrossRefGoogle ScholarPubMed
Yeung, A. and Evans, E., “Cortical Shell–Liquid Core Model for Passive Flow of Liquid-Like Spherical Cells into Micropipets,” Biophysical Journal, 56, pp. 139149 (1989).CrossRefGoogle ScholarPubMed
Taber, L. A., “Large Deflection of a Fluid-Filled Spherical Shell Under a Point Load,” Journal of Applied Mechanics, 49, pp. 121128 (1982).CrossRefGoogle Scholar
Feng, W. W. and Yang, W. H., “On the Contact Problem of an Inflated Spherical Nonlinear Membrane,” Journal of Applied Mechanics, 40, pp. 209214 (1973).CrossRefGoogle Scholar
Lardner, T. J. and Pujara, P., “Compression of Spherical Cell,” Mechanics Today, 5, pp. 161176 (1980).CrossRefGoogle Scholar
Liu, K. K., Williams, D. R. and Briscoe, B. J., “Compressive deformation of a single microcapsule,” Physical Review E, 54, pp. 66736680 (1996).CrossRefGoogle ScholarPubMed
Wang, C. X, Wang, L. and Thomas, C. R., “Modelling the Mechanical Properties of Single Suspension-Cultured Tomato Cells,” Annals of Botany, 93, pp. 443453 (2004).CrossRefGoogle ScholarPubMed
Murakami, R. and Hashimoto, H., “Unusual Nuclear Divisionin in Nannochloropsis oculata (Eustigmatophyceae,Heterokonta) which May Ensure Faithful Transmission of Secondary Plastids,” Protist, 160, pp. 4149, (2009).Google Scholar
Cheng, L. Y., “Deformation Analyses in Cell and Developmental Biology Part I. Formal Methodology,” Journal of Biomedical Engineering, 109, pp. 1017, (1987).Google ScholarPubMed
Skalak, R., Tozeren, A., Zarda, R. P. and Chien, S., “Strain Energy Function of Red Blood Cell Membranes,” Biophysical Journal, 13, pp. 245264, (1973).CrossRefGoogle ScholarPubMed
Smith, A. E., Moxham, K. E. and Middelberg, A. P. J., “Wall Material Properties of Yeast Cells. Part II. Analysis,” Chemical Engineering Science, 55, pp. 20432053, (2000).CrossRefGoogle Scholar
Gindl, W. and Gupta, H. S., “Cell-Wall Hardness and Young’s Modulus of Melamine-Modified Spruce Wood by Nano-Indentation,” Composites Part A: Applied Science and Manufacturing, 33, pp. 11411145 (2002).CrossRefGoogle Scholar
Niklas, K. J., “Mechanical Behavior of Plant Tissues as Inferred from the Theory of Pressurized Cellular Solids,” American Journal of Botany, 76, pp. 929937 (1989).CrossRefGoogle Scholar
Hiller, S., Bruce, D. M. and Jeronimidis, G., “A Micro-Penetration Technique for Mechanical Testing of Plant Cell Walls,” Journal of Texture Studies, 27, pp. 559587 (1996).CrossRefGoogle Scholar
Shiah, Y. C. and Hematiyan, M. R., “Interlaminar Stresses Analysis of Three-Dimensional Composite Laminates by the Boundary Element Method,” Journal of Mechanics, 34, pp. 829837 (2018)CrossRefGoogle Scholar
Chang, S. Y. and Wu, T. H., “Assessments of Structure-Dependent Integration Methods with Explicit Displacement and Velocity Difference Equations,” Journal of Mechanics, 34, pp. 771778 (2018)CrossRefGoogle Scholar
Zhao, L., Schaefer, D., Xu, H., Modi, S. J., LaCourse, W. R. and Marten, M. R., “Elastic Properties of the Cell Wall of Aspergillus Nidulans Studied with Atomic Force Microscopy,” Biotechnology Progress, 21, pp. 292299 (2005).CrossRefGoogle ScholarPubMed
Davies, G. C., Hiller, S. and Bruce, D. M., “A Membrane Model for Elastic Deflection of Individual Plant Cell Walls,” Journal of Texture Studies, 29, pp. 645667 (1998).Google Scholar
Smith, A. E., Zhang, Z., Thomas, C. R., Moxham, K. E. and Middelberg, A. P. J., “The Mechanical Properties of Saccharomyces Cerevisiae,” Proceedings of the National Academy of Sciences of the United States of America, 97, pp. 98719874 (2000).CrossRefGoogle ScholarPubMed
Thwaites, J. J. and Suranat, U. C., “Mechanical Properties of Bacillus subtilis Cell Walls: Effects of Removing Residual Culture Medium,” Journal of Bacteriology, 173, pp. 197203 (1991).CrossRefGoogle ScholarPubMed
Toole, G. A., Gunning, P. A., Parker, M. L., Smith, A. C. and Waldron, K. W., “Fracture Mechanics of the Cell Wall of Chara Coralline,” Planta, 212, pp. 606611 (2001).CrossRefGoogle Scholar
Johnson, M., Shivkumar, S. and Berlowitz-Tarrant, L., “Structure and Properties of Filamentous Green Algae,” Materials Science and Engineering: B, 38, pp. 103108 (1996).CrossRefGoogle Scholar