Frehse, Specovius-Neugebauer: Fractional Interior Differentiability of the Stress Velocities to Elastic Plastic Problems with Hardening

Frehse, Jens and Specovius-Neugebauer, Maria:
Fractional Interior Differentiability of the Stress Velocities to Elastic Plastic Problems with Hardening
Bollettino dell'Unione Matematica Italiana Serie 9 5 (2012), fasc. n.3, p. 469-494, (English)
pdf (376 Kb), djvu (227 Kb). | MR 3051733 | Zbl 1278.35242

Sunto

We consider classical variational inequalities modeling elastic plastic problems with kinematic and isotropic hardening. It is shown that the stress velocities have fractional derivatives of order $1/2 - \delta$ in $L^2$ in time direction on the whole existence interval. In space direction an analogous result holds in the interior of the domain. In the case of kinematic hardening, these results are also true for the strain velocity.

Referenze Bibliografiche

[1] H.-D. ALBER, Materials with memory, volume 1682 of Lecture Notes in Mathematics. Springer-Verlag, Berlin, 1998. Initial-boundary value problems for constitutive equations with internal variables. | fulltext (doi) | MR 1619546

[2] H.-D. ALBER - S. NESENENKO, Local $H^1$-regularity and $H^{1/3 - \delta}$-regularity up to the boundary in time dependent viscoplasticity. Asymptot. Anal., 63 (3) (2009),151-187. | MR 2541125

[3] J. FREHSE - D. LÖBACH, Hölder continuity for the displacements in isotropic and kinematic hardening with von Mises yield criterion. ZAMM Z. Angew. Math. Mech., 88 (8) (2008), 617-629. | fulltext (doi) | MR 2442283

[4] J. FREHSE - D. LÖBACH, Regularity results for three-dimensional isotropic and kinematic hardening including boundary differentiability. Math. Models Methods Appl. Sci., 19 (12) (2009), 2231-2262. | fulltext (doi) | MR 2599660 | Zbl 1248.35207

[5] J. FREHSE - D. LÖBACH, Improved $L^p$-estimates for the strain velocities in hardening problems. GAMM-Mitteilungen, 34 (2011), 10-20. | fulltext (doi) | MR 2843966

[6] J. FREHSE - M. SPECOVIUS-NEUGEBAUER, Fractional differentiability for the stress velocities to the solution of the Prandtl-Reuss problem. To appear in ZAMM Z. Angew. Math. Mech. | fulltext (doi) | MR 2897423 | Zbl 1380.74019

[7] P. GRUBER - D. KNEES - S. NESENENKO - M. THOMAS, Analytical and numerical aspects of time-dependent models with internal variables. ZAMM Z. Angew. Math. Mech., 90 (10-11, Special Issue: On the Occasion of Zenon Mroz' 80th Birthday) (2010), 861-902. | fulltext (doi) | MR 2760795

[8] C. JOHNSON, Existence theorems for plasticity problems. J. Math. Pures Appl. (9), 55 (4) (1976), 431-444. | MR 438867 | Zbl 0351.73049

[9] C. JOHNSON, On plasticity with hardening. J. Math. Anal. Appl., 62(2) (1978), 325- 336. | fulltext (doi) | MR 489198 | Zbl 0373.73049

[10] D. KNEES, On global spatial regularity and convergence rates for time dependent elasto-plasticity. M3AS, 20 (2010), 1823-1858. | fulltext (doi) | MR 2735915 | Zbl 1207.35083

[11] J.-L. LIONS - E. MAGENES, Non-homogeneous boundary value problems and applications. Vol. I. Springer-Verlag, New York, 1972. Translated from the French by P. Kenneth, Die Grundlehren der mathematischen Wissenschaften, Band 181. | MR 350177 | Zbl 0227.35001

[12] D. LÖBACH, On regularity for plasticity with hardening. Technical Report 388, Bonner Mathematische Schriften, 2008. | MR 2414270

[13] G. A. SERËGIN, Differential properties of solutions of evolution variational inequalities in the theory of plasticity. J. Math. Sci., 72 (6) (1994), 3449-3458. | fulltext (doi) | MR 1317379

bdim: Biblioteca Digitale Italiana di Matematica

Un progetto SIMAI e UMI

Referenza completa

Sunto

Referenze Bibliografiche