English

Isometric Incompatibility in Growing Elastic Sheets

Soft Condensed Matter 2026-03-24 v1 Materials Science Mathematical Physics math.MP Applied Physics

Abstract

Geometric incompatibility, the inability of a material's rest state to be realized in Euclidean space, underlies shape formation in natural and synthetic thin sheets. Classical Gauss and Mainardi-Codazzi-Peterson (MCP) incompatibilities explain many patterns in nature, but they do not exhaust the mechanisms that frustrate thin elastic sheets. We identify a new incompatibility that forbids any stretching-free configuration, even when the rest state of the elastic sheet locally satisfies the Gauss and MCP compatibility conditions. We demonstrate this principle in a model of surface growth with positive Gaussian curvature, where a geometric horizon forms, leading to the onset of frustration. Experiments, simulations, and theory show that the sheet responds by nucleating periodic d-cone-like dimples. We show that this obstruction to stretching-free configurations is topological, and we point to open questions concerning the origin of frustration.

Keywords

Cite

@article{arxiv.2603.21112,
  title  = {Isometric Incompatibility in Growing Elastic Sheets},
  author = {Yafei Zhang and Michael Moshe and Eran Sharon},
  journal= {arXiv preprint arXiv:2603.21112},
  year   = {2026}
}

Comments

7 pages; 4 figures

R2 v1 2026-07-01T11:31:59.639Z