Quaderni del Seminario Matematico: 2016
ISSN: 2039120X

[01/2016]
J.E. Munoz Rivera and
M.G. Naso

About the stability to Timoshenko system with one boundary dissipation,
Appl. Math. Lett.,
in press.

[02/2016]
A. Berti and
M.G. Naso

A contact problem of a thermoelastic rod with voids and microtemperatures,
ZAMM Z. Angew. Math. Mech. 97, no. 6
(2017), 670685.

[03/2016]
A. Galasso and M. Spera

Remarks on the geometric quantization of Landau levels.

[04/2016]
R. Rossi and M. Thomas

From Adhesive to Brittle Delamination in ViscoElastodynamics.

[05/2016]
R. Rossi

From visco to perfect plasticity in thermoviscoelastic materials.

[06/2016]
V. Agostiniani and R. Rossi

Singular vanishingviscosity limits of gradient flows: the finitedimensional case.

[07/2016]
A. Mielke, R. Rossi , and G. Savaré

Global existence results for viscoplasticity at finite strain.

[08/2016]
R. Rossi

Existence results for a coupled viscoplasticdamage model in thermoviscoelasticity.

[09/2016]
C. Giorgi

Phasefield models for transition phenomena in materials with hysteresis,
Discrete Contin. Dyn. Syst. Ser. S 8
(2015), 693–722.

[10/2016]
A. Berti and
C. Giorgi

Derivation of the LandauLifshitzBloch equation from continuum Thermodynamics,
Physica B 500
(2016), 142153.

[11/2016]
M. Conti, V. Danese,
C. Giorgi , and V. Pata

A model of viscoelasticity with timedependent memory kernels.

[12/2016]
M. Fabrizio,
C. Giorgi , and A. Morro

Two approaches to aging and fatigue models in viscoelastic solids.

[13/2016]
R.M. Colombo and E. Rossi

Stability of a Class of Non Autonomous Scalar Conservation Laws.

[14/2016]
R.M. Colombo and E. Rossi

Non Autonomous Scalar Conservation Laws in Traffic Modelling.
MP
Jun 18, 2018