We are interested in general homogenization theory for fourth-order elliptic equation describing the Kirchhoff model for pure bending of a thin solid symmetric plate under a transverse load. Such theory is well-developed for second-order elliptic problems, while some results for general elliptic equations were established by Zhikov, Kozlov, Oleinik and Ngoan (1979). We push forward an approach of Antoni´c and Balenovi´c (1999, 2000) by proving a number of properties of H-convergence for stationary plate equation
In this second paper, we consider again a set of elastic rods periodically distributed over an elast...
International audienceIn this paper we prove a H-convergence type result for the homogenization of s...
The paper considers the method suggested by Papkovich for rectangular plates and its application for...
In this PhD thesis we prove some properties of elliptic equations in connection with periodic homoge...
Abstract. We carry out the spatially periodic homogenization of nonlinear bending theory for plates....
We rigorously derive a homogenized von-Kármán plate theory as a Γ-limit from nonlinear three-dimensi...
International audienceWe present a novel Hybrid High-Order (HHO) discretization of fourth-order elli...
We derive, via simultaneous homogenization and dimension reduction, the (Formula presented.)-limit f...
summary:The homogenization problem (i.e. the approximation of the material with periodic structure b...
: In this paper we consider the problem of homogenization of equations describing linear thin plates...
ABSTRACT: In this paper we consider the problem of homogenization of equations describing linear thi...
International audienceThis book gives new insight on plate models in the linear elasticity framework...
In this second paper, we consider again a set of elastic rods periodically distributed over an elast...
International audienceIn this paper we prove a H-convergence type result for the homogenization of s...
The paper considers the method suggested by Papkovich for rectangular plates and its application for...
In this PhD thesis we prove some properties of elliptic equations in connection with periodic homoge...
Abstract. We carry out the spatially periodic homogenization of nonlinear bending theory for plates....
We rigorously derive a homogenized von-Kármán plate theory as a Γ-limit from nonlinear three-dimensi...
International audienceWe present a novel Hybrid High-Order (HHO) discretization of fourth-order elli...
We derive, via simultaneous homogenization and dimension reduction, the (Formula presented.)-limit f...
summary:The homogenization problem (i.e. the approximation of the material with periodic structure b...
: In this paper we consider the problem of homogenization of equations describing linear thin plates...
ABSTRACT: In this paper we consider the problem of homogenization of equations describing linear thi...
International audienceThis book gives new insight on plate models in the linear elasticity framework...
In this second paper, we consider again a set of elastic rods periodically distributed over an elast...
International audienceIn this paper we prove a H-convergence type result for the homogenization of s...
The paper considers the method suggested by Papkovich for rectangular plates and its application for...