Mechanical instability at finite temperature

Mao, Xiaoming; Souslov, Anton; Mendoza, Carlos I.; Lubensky, T. C.

doi:10.1038/ncomms6968

Cited by 43 publications

(56 citation statements)

References 54 publications

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“…38 If the structural ground state of black phosphorene (BP), black arsenene, and monochalco- Figure 1: (a) The elastic energy landscape E(a 1 , a 2 ) as a function of lattice parameters a 1 and a 2 is generic to all monolayers with a Pnma structure, and it is exemplified on a GeS monolayer at zero temperature. A dashed white curve joins points A and B at two degenerate minima (E A = E B = 0).…”

Section: Introductionmentioning

confidence: 99%

Two-Dimensional Disorder in Black Phosphorus and Monochalcogenide Monolayers

et al. 2016

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Ridged, orthorhombic two-dimensional atomic crystals with a bulk Pnma structure such as black phosphorus and monochalcogenide monolayers are an exciting and novel material platform for a host of applications. Key to their crystallinity, monolayers of these materials have a four-fold degenerate structural ground state, and a single energy scale E C (representing the * To whom correspondence should be addressed † Department of Physics. elastic energy required to switch the longer lattice vector along the x− or y−direction) determines how disordered these monolayers are at finite temperature. Disorder arises when nearest neighboring atoms become gently reassigned as the system is thermally excited beyond a critical temperature T c that is proportional to E C /k B . E C is tunable by chemical composition and it leads to a classification of these materials into two categories: (i) Those for which E C ≥ k B T m , and (ii) those having k B T m > E C ≥ 0, where T m is a given material's melting temperature. Black phosphorus and SiS monolayers belong to category (i): these materials do not display an intermediate order-disorder transition and melt directly. All other monochalcogenide monolayers with E C > 0 belonging to class (ii) will undergo a two-dimensional transition prior to melting. E C /k B is slightly larger than room temperature for GeS and GeSe, and smaller than 300 K for SnS and SnSe monolayers, so that these materials transition near room temperature. The onset of this generic atomistic phenomena is captured by a planar Potts model up to the orderdisorder transition. The order-disorder phase transition in two dimensions described here is at the origin of the Cmcm phase being discussed within the context of bulk layered SnSe.

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Section: Introductionmentioning

confidence: 99%

Two-Dimensional Disorder in Black Phosphorus and Monochalcogenide Monolayers

et al. 2016

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“…This indicates that, while sublinear scaling is not confined to lattice models, the exponent does depend on the topology of the network. Indeed, in a recent paper [30] it was found that a square-lattice network with nextnearest-neighbor interactions, which is at the isostatic point when the next-nearest-neighbor interactions are zero, showed a critical regime where G ∝ T α with α ∼ 0.66, different from the α ∼ 0.5 observed both in Ref. [29] for a diluted-triangularlattice network at the isostatic point and in the random-bond networks presented here (see Fig.…”

Section: Discussion and Implicationmentioning

confidence: 99%

“…Indeed, in Ref. [30] a square lattice (which is at the isostatic point) with next-nearestneighbor interactions was found to stiffen with a different critical exponent than a randomly diluted triangular lattice also at the isostatic point [29].…”

Section: Introductionmentioning

confidence: 99%

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Stability and anomalous entropic elasticity of subisostatic random-bond networks

2015

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We study the elasticity of thermalized spring networks under an applied bulk strain. The networks considered are sub-isostatic random-bond networks that, in the athermal limit, are known to have vanishing bulk and linear shear moduli at zero bulk strain. Above a bulk strain threshold, however, these networks become rigid, although surprisingly the shear modulus remains zero until a second, higher, strain threshold. We find that thermal fluctuations stabilize all networks below the rigidity transition, resulting in systems with both finite bulk and shear moduli. Our results show a T 0.66 temperature dependence of the moduli in the region below the bulk strain threshold, resulting in networks with anomalously high rigidity as compared to ordinary entropic elasticity. Furthermore we find a second regime of anomalous temperature scaling for the shear modulus at its zero-temperature rigidity point, where it scales as T 0.5 , behavior that is absent for the bulk modulus since its athermal rigidity transition is discontinuous.

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“…In the topologically nontrivial phase all floppy modes localize on the top edge leaving the bottom edge rigid. This physics of the Maxwell lattices make them both an interesting topic for theoretical study [21][22][23][24][25][26][27] and good candidates for the design of novel mechanical metamaterials where the edges can change stiffness by orders of magnitude reversibly [17].…”

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confidence: 99%

Topological Edge Floppy Modes in Disordered Fiber Networks

2018

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Disordered fiber networks are ubiquitous in a broad range of natural (e.g., cytoskeleton) and manmade (e.g., aerogels) materials. In this paper, we discuss the emergence of topological floppy edge modes in these fiber networks as a result of deformation or active driving. It is known that a network of straight fibers exhibits bulk floppy modes which only bend the fibers without stretching them. We find that, interestingly, with a perturbation in geometry, these bulk modes evolve into edge modes. We introduce a topological index for these edge modes and discuss their implications in biology.

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Mechanical instability at finite temperature

Cited by 43 publications

References 54 publications

Two-Dimensional Disorder in Black Phosphorus and Monochalcogenide Monolayers

Two-Dimensional Disorder in Black Phosphorus and Monochalcogenide Monolayers

Stability and anomalous entropic elasticity of subisostatic random-bond networks

Topological Edge Floppy Modes in Disordered Fiber Networks

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