Buckling transitions and soft-phase invasion of two-component icosahedral shells
- What is the optimal distribution of two types of crystalline phases on the surface of icosahedral shells, such as of many viral capsids? We here investigate the distribution of a thin layer of soft material on a crystalline convex icosahedral shell. We demonstrate how the shapes of spherical viruses can be understood from the perspective of elasticity theory of thin two-component shells. We develop a theory of shape transformations of an icosahedral shell upon addition of a softer, but still crystalline, material onto its surface. We show how the soft component "invades" the regions with the highest elastic energy and stress imposed by the 12 topological defects on the surface. We explore the phase diagram as a function of the surface fraction of the soft material, the shell size, and the incommensurability of the elastic moduli of the rigid and soft phases. We find that, as expected, progressive filling of the rigid shell by the soft phase starts from the most deformed regions of the icosahedron. With a progressively increasingWhat is the optimal distribution of two types of crystalline phases on the surface of icosahedral shells, such as of many viral capsids? We here investigate the distribution of a thin layer of soft material on a crystalline convex icosahedral shell. We demonstrate how the shapes of spherical viruses can be understood from the perspective of elasticity theory of thin two-component shells. We develop a theory of shape transformations of an icosahedral shell upon addition of a softer, but still crystalline, material onto its surface. We show how the soft component "invades" the regions with the highest elastic energy and stress imposed by the 12 topological defects on the surface. We explore the phase diagram as a function of the surface fraction of the soft material, the shell size, and the incommensurability of the elastic moduli of the rigid and soft phases. We find that, as expected, progressive filling of the rigid shell by the soft phase starts from the most deformed regions of the icosahedron. With a progressively increasing soft-phase coverage, the spherical segments of domes are filled first (12 vertices of the shell), then the cylindrical segments connecting the domes (30 edges) are invaded, and, ultimately, the 20 flat faces of the icosahedral shell tend to be occupied by the soft material. We present a detailed theoretical investigation of the first two stages of this invasion process and develop a model of morphological changes of the cone structure that permits noncircular cross sections. In conclusion, we discuss the biological relevance of some structures predicted from our calculations, in particular for the shape of viral capsids.…
Author details: | Marc D. EmanuelORCiD, Andrey G. CherstvyORCiD, Ralf MetzlerORCiDGND, Gerhard GompperORCiDGND |
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DOI: | https://doi.org/10.1103/PhysRevE.102.062104 |
ISSN: | 2470-0045 |
ISSN: | 2470-0053 |
ISSN: | 2470-0061 |
ISSN: | 1538-4519 |
Pubmed ID: | https://pubmed.ncbi.nlm.nih.gov/33465945 |
Title of parent work (English): | Physical review / publ. by The American Physical Society. E, Statistical, nonlinear, and soft matter physics |
Publisher: | Woodbury |
Place of publishing: | New York |
Publication type: | Article |
Language: | English |
Date of first publication: | 2020/12/02 |
Publication year: | 2020 |
Release date: | 2023/11/16 |
Volume: | 102 |
Issue: | 6 |
Article number: | 062104 |
Number of pages: | 26 |
Funding institution: | Deutsche Forschungsgemeinschaft (DFG)German Research Foundation (DFG); [CH 707/2-2, CH 707/5-1, ME 1535/7-1]; Foundation for Polish Science; (Fundacja na rzecz Nauki Polskiej, FNP) within an Alexander von Humboldt; Honorary Polish Research Scholarship |
Organizational units: | Mathematisch-Naturwissenschaftliche Fakultät / Institut für Physik und Astronomie |
DDC classification: | 5 Naturwissenschaften und Mathematik / 53 Physik / 530 Physik |
Peer review: | Referiert |