Geometrical model for martensitic phase transitions: Understanding criticality and weak universality during microstructure growth

Torrents, Genís; Illa, Xavier; Vives, Eduard; Planes, Antoni

doi:10.1103/physreve.95.013001

Cited by 9 publications

(44 citation statements)

References 21 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…We conclude the article by comparing our findings with some related models. Here we in particular return to their relation to scaling laws and comment on their relation to the Ball-Planes model [BCH15,TIVP17]. 5.1.…”

Section: Discussion and Summarymentioning

confidence: 99%

“…This seemingly "simple" process is used to explain the lack of a fixed length scale, the experimentally observed fractal behaviour and the intermittency in the nucleation process of martensite [CMO + 98, ORC + 95, GMR + 10]. A certain "universality" of the distribution of the lengths of line segments is identified [BCH15,TIVP17]. However, compatibility considerations do not enter the model.…”

Section: Subschemes Of This)mentioning

confidence: 99%

See 1 more Smart Citation

Convex Integration Arising in the Modelling of Shape-Memory Alloys: Some Remarks on Rigidity, Flexibility and Some Numerical Implementations

2019

View full text Add to dashboard Cite

We study convex integration solutions in the context of the modelling of shape-memory alloys. The purpose of the article is two-fold, treating both rigidity and flexibility properties: Firstly, we relate the maximal regularity of convex integration solutions to the presence of lower bounds in variational models with surface energy. Hence, variational models with surface energy could be viewed as a selection mechanism allowing for or excluding convex integration solutions. Secondly, we present the first numerical implementations of convex integration schemes for the model problem of the geometrically linearised two-dimensional hexagonal-to-rhombic phase transformation. We discuss and compare the two algorithms from [RZZ16] and [RZZ17].

show abstract

Section: Discussion and Summarymentioning

confidence: 99%

Section: Subschemes Of This)mentioning

confidence: 99%

Convex Integration Arising in the Modelling of Shape-Memory Alloys: Some Remarks on Rigidity, Flexibility and Some Numerical Implementations

2019

View full text Add to dashboard Cite

show abstract

“…Since the fragmentation process (2) is symmetric with respect to the horizontal and the vertical direction, we expect S(m, n) = S(n, m). The average number of frozen sticks obeys the recursion [26] S(m, n)…”

Section: Fragmentation Of Rectanglesmentioning

confidence: 99%

“…We now substitute (26) into this expression and convert the sum over the discrete variable k into an integral over the continuous variable x by using k = e νx . With this transformation of variables, the moments are given by…”

Section: Fragmentation Of Rectanglesmentioning

confidence: 99%

Jamming and tiling in fragmentation of rectangles

Ben‐Naim

Krapivsky

2019

Phys. Rev. E

View full text Add to dashboard Cite

We investigate a stochastic process where a rectangle breaks into smaller rectangles through a series of horizontal and vertical fragmentation events. We focus on the case where both the vertical size and the horizontal size of a rectangle are discrete variables. Because of this constraint, the system reaches a jammed state where all rectangles are sticks, that is, rectangles with minimal width. Sticks are frozen as they can not break any further. The average number of sticks in the jammed state, S, grows as S ≃ A/ √ 2π ln A with rectangle area A in the large-area limit, and remarkably, this behavior is independent of the aspect ratio. The distribution of stick length has a power-law tail, and further, its moments are characterized by a nonlinear spectrum of scaling exponents. We also study an asymmetric breakage process where vertical and horizontal fragmentation events are realized with different probabilities. In this case, there is a phase transition between a weakly asymmetric phase where the length distribution is independent of system size, and a strongly asymmetric phase where this distribution depends on system size.

show abstract

“…once more the moving mask hypotheses in [DP19a]). Based on this, the models in [BCH15,CH18,TIVP17] roughly propose the following simplified, geometrically constrained nucleation mechanisms:…”

Section: Introductionmentioning

confidence: 99%

On a probabilistic model for martensitic avalanches incorporating mechanical compatibility

et al. 2021

View full text Add to dashboard Cite

Building on the work in [BCH15, CH18, TIVP17], in this article we propose and study a simple, geometrically constrained, probabilistic algorithm geared towards capturing some aspects of the nucleation in shape-memory alloys. As a main novelty with respect to the algorithms in [BCH15, CH18, TIVP17] we include mechanical compatibility. The mechanical compatibility here is guaranteed by using convex integration building blocks in the nucleation steps. We analytically investigate the algorithm's convergence and the solutions' regularity, viewing the latter as a measure for the fractality of the resulting microstructure. We complement our analysis with a numerical implemenation of the scheme and compare it to the numerical results in [BCH15, CH18, TIVP17].

show abstract

Geometrical model for martensitic phase transitions: Understanding criticality and weak universality during microstructure growth

Cited by 9 publications

References 21 publications

Convex Integration Arising in the Modelling of Shape-Memory Alloys: Some Remarks on Rigidity, Flexibility and Some Numerical Implementations

Convex Integration Arising in the Modelling of Shape-Memory Alloys: Some Remarks on Rigidity, Flexibility and Some Numerical Implementations

Jamming and tiling in fragmentation of rectangles

On a probabilistic model for martensitic avalanches incorporating mechanical compatibility

Contact Info

Product

Resources

About