On a Model of Nonlocal Continuum Mechanics Part I: Existence and Regularity

In this work we assume that the total stored energy functional for a body $\B$ depends not only on the local strain field, but also on the spatial average of the strain field over the body weighted with an influence kernel. We investigate the problem of minimizing the total stored energy subject to a given bulk displacement $\Delta\geq 0$. After the general setup for this problem is reviewed, we give sufficient conditions for an energy minimizing strain field $e(\cdot)$ to satisfy an integro-differential Euler--Lagrange equation. The result is general and applies to material energies that display a wide variety of singular behavior. Through analysis of this Euler--Lagrange equation for a special class of influence kernels, we arrive at a regularity theorem which ensures that energy minimizing strain fields must be periodic, piecewise smooth, and possess a finite number of simple discontinuities. We then combine this with a well-known existence result for relaxed minimization problems to arrive at a genera...

[1]  Kaushik Bhattacharya,et al.  Wedge-like microstructure in martensites , 1991 .

[2]  M. Gurtin,et al.  Structured phase transitions on a finite interval , 1984 .

[3]  Bernard D. Coleman,et al.  On the thermodynamics of periodic phases , 1992 .

[4]  Robert V. Kohn,et al.  Elastic Energy Minimization and the Recoverable Strains of Polycrystalline Shape‐Memory Materials , 1997 .

[5]  P. Sternberg The effect of a singular perturbation on nonconvex variational problems , 1988 .

[6]  Mitchell Luskin,et al.  On the computation of crystalline microstructure , 1996, Acta Numerica.

[7]  H. Ted Davis,et al.  Modified Van der Waals theory of fluid interfaces , 1975 .

[8]  J. Ball,et al.  Fine phase mixtures as minimizers of energy , 1987 .

[9]  L. Modica The gradient theory of phase transitions and the minimal interface criterion , 1987 .

[10]  Structure and Dynamical Stability of Gibbsian States , 1986 .

[11]  Stefan Müller,et al.  Singular perturbations as a selection criterion for periodic minimizing sequences , 1993 .

[12]  Richard D. James,et al.  Co-existent phases in the one-dimensional static theory of elastic bars , 1979 .

[13]  O. Penrose,et al.  Rigorous Treatment of the Van Der Waals-Maxwell Theory of the Liquid-Vapor Transition , 1966 .

[14]  Monotonicity and Invertibility Conditions in One-Dimensional Nonlinear Elasticity , 1973 .

[15]  J. Ericksen,et al.  Equilibrium of bars , 1975 .

[16]  Nicolas Triantafyllidis,et al.  On higher order gradient continuum theories in 1-D nonlinear elasticity. Derivation from and comparison to the corresponding discrete models , 1993 .

[17]  Tao Lin,et al.  Relaxed nonlocal models of hysteresis , 1994, Smart Structures.

[18]  Irene Fonseca,et al.  Variational methods for elastic crystals , 1987 .

[19]  J. Waals The thermodynamic theory of capillarity under the hypothesis of a continuous variation of density , 1979 .

[20]  David Kinderlehrer,et al.  Equilibrium configurations of crystals , 1988 .

[21]  L. Truskinovsky,et al.  Ericksen's bar revisited : Energy wiggles , 1996 .

[22]  S. Baldo Minimal interface criterion for phase transitions in mixtures of Cahn-Hilliard fluids , 1990 .

[23]  R. Fosdick,et al.  Single phase energy minimizers for materials with nonlocal spatial dependence , 1996 .

[24]  J. E. Dunn,et al.  The morphology and stability of material phases , 1980 .

[25]  R. Rogers,et al.  The coercivity paradox and nonlocal Ferromagnetism , 1992 .

[26]  B. Dacorogna Direct methods in the calculus of variations , 1989 .

[27]  Morton E. Gurtin,et al.  On a theory of phase transitions with interfacial energy , 1985 .

[28]  R. Rogers,et al.  On an order-parameter model for a binary liquid , 1995 .

[29]  R. D. James,et al.  Proposed experimental tests of a theory of fine microstructure and the two-well problem , 1992, Philosophical Transactions of the Royal Society of London. Series A: Physical and Engineering Sciences.