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1. Existence and rigidity of the vectorial Peierls–Nabarro model for dislocations in high dimensions

   https://doi.org/10.1088/1361-6544/ac24e3  

   Gao, Yuan ; Liu, Jian-Guo ; Liu, Zibu ( October 2021 , Nonlinearity)

   Abstract We focus on the existence and rigidity problems of the vectorial Peierls–Nabarro (PN) model for dislocations. Under the assumption that the misfit potential on the slip plane only depends on the shear displacement along the Burgers vector, a reduced non-local scalar Ginzburg–Landau equation with an anisotropic positive (if Poisson ratio belongs to (−1/2, 1/3)) singular kernel is derived on the slip plane. We first prove that minimizers of the PN energy for this reduced scalar problem exist. Starting from H 1/2 regularity, we prove that these minimizers are smooth 1D profiles only depending on the shear direction, monotonically and uniformly converge to two stable states at far fields in the direction of the Burgers vector. Then a De Giorgi-type conjecture of single-variable symmetry for both minimizers and layer solutions is established. As a direct corollary, minimizers and layer solutions are unique up to translations. The proof of this De Giorgi-type conjecture relies on a delicate spectral analysis which is especially powerful for nonlocal pseudo-differential operators with strong maximal principle. All these results hold in any dimension since we work on the domain periodic in the transverse directions of the slip plane. The physical interpretation of this rigidity result is that the equilibrium dislocation on the slip plane only admits shear displacements and is a strictly monotonic 1D profile provided exclusive dependence of the misfit potential on the shear displacement. 

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2. Existence and regularity of minimizers for nonlocal energy functionals

   Foss, Mikil D. ; Radu, Petronela ; Wright, Cory ( November 2019 , Differential and integral equations)

   In this paper, we consider minimizers for nonlocal energy functionals generalizing elastic energies that are connected with the theory of peridynamics [19] or nonlocal diffusion models [1]. We derive nonlocal versions of the Euler-Lagrange equations under two sets of growth assumptions for the integrand. Existence of minimizers is shown for integrands with joint convexity (in the function and nonlocal gradient components). By using the convolution structure, we show regularity of solutions for certain Euler-Lagrange equations. No growth assumptions are needed for the existence and regularity of minimizers results, in contrast with the classical theory. 

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3. Optimal Regularity and Structure of the Free Boundary for Minimizers in Cohesive Zone Models

   https://doi.org/10.1007/s00205-020-01509-3  

   Caffarelli, L. ; Cagnetti, F. ; Figalli, A. ( July 2020 , Archive for Rational Mechanics and Analysis)

   null (Ed.)

   Abstract We study optimal regularity and free boundary for minimizers of an energy functional arising in cohesive zone models for fracture mechanics. Under smoothness assumptions on the boundary conditions and on the fracture energy density, we show that minimizers are $$C^{1, 1/2}$$ C 1 , 1 / 2 , and that near non-degenerate points the fracture set is $$C^{1, \alpha }$$ C 1 , α , for some $$\alpha \in (0, 1)$$ α ∈ ( 0 , 1 ) . 

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4. Quantitative homogenization of principal Dirichlet eigenvalue shape optimizers

   https://doi.org/10.1002/cpa.22184  

   Feldman, William M. ( November 2023 , Communications on Pure and Applied Mathematics)

   We apply new results on free boundary regularity to obtain a quantitative convergence rate for the shape optimizers of the first Dirichlet eigenvalue in periodic homogenization. We obtain a linear (with logarithmic factors) convergence rate for the optimizing eigenvalue. Large scale Lipschitz free boundary regularity of almost minimizers is used to apply the optimal homogenization theory in Lipschitz domains of Kenig et al. A key idea, to deal with the hard constraint on the volume, is a combination of a large scale almost dilation invariance with a selection principle argument.

    

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5. Well-posedness and regularity for a polyconvex energy

   https://doi.org/10.1051/cocv/2023041  

   Gangbo, Wilfrid ; Jacobs, Matt ; Kim, Inwon ( January 2023 , ESAIM: Control, Optimisation and Calculus of Variations)

   We prove the existence, uniqueness, and regularity of minimizers of a polyconvex functional in two and three dimensions, which corresponds to theH¹-projection of measure-preserving maps. Our result introduces a new criteria on the uniqueness of the minimizer, based on the smallness of the lagrange multiplier. No estimate on the second derivatives of the pressure is needed to get a unique global minimizer. As an application, we construct a minimizing movement scheme to constructL^r-solutions of the Navier–Stokes equation (NSE) for a short time interval.

    

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