Add to ORKGNumerical methods for mechanical problems involving contact have developed significantly in the recent past. For the geometrical representation in these methods, a standard finite element mesh is very often the basis for the considered solids. In contrast to this practice, our work relies on structured meshes built of voxels, which considerably reduces the effort required to handle geometrical problems. Based on this voxel grid, we introduce implicit boundary representations by level sets as alternative to conventional finite element approximations. By adapting the description of boundary movements using level set functions, we show how a novel kind of contact surface makes it possible to elegantly enforce the contact conditions. In this co...
In this work, we present a new methodology for the treatment of the contact interaction between rigi...
We propose a new explicit contact algorithm for finite element discretized solids and shells with sm...
© 2014 O. A. Sachenkov, V. I. Mitryaikin, T. A. Zaitseva and Yu. G. Konoplev. The paper presents a t...
Numerical methods operating on structured grids have become popular since they offer good run time p...
Fast solvers performing on a regular grid are often used for problems in elasticity, in order to avo...
Abstract. A new contact algorithm designed for multibody dynamics is presented. It is based on repre...
When bodies come into contact, the contact surface is a priori unknown. This necessitates the additi...
This work aims at improving implicit representation of complex industrial work-pieces by reducing t...
This article is devoted to shape optimisation of contact problems in linearised elasticity, thanks t...
Contact mechanics of rough surfaces is becoming increasingly important in understanding the real beh...
A finite element formulation for three dimensional (3D) contact mechanics using a mortar algorithm c...
Recent developments [1, 2] in the finite element software Z-set [3, 4] allows to solve efficiently m...
International audienceThe book covers all basic ingredients of contact and computational contact mec...
International audienceBy introducing unknown Level-Sets fields on contact interface, the Signorini-M...
This paper presents a general procedure for solving 3D contact problems with implicit finite element...
In this work, we present a new methodology for the treatment of the contact interaction between rigi...
We propose a new explicit contact algorithm for finite element discretized solids and shells with sm...
© 2014 O. A. Sachenkov, V. I. Mitryaikin, T. A. Zaitseva and Yu. G. Konoplev. The paper presents a t...
Numerical methods operating on structured grids have become popular since they offer good run time p...
Fast solvers performing on a regular grid are often used for problems in elasticity, in order to avo...
Abstract. A new contact algorithm designed for multibody dynamics is presented. It is based on repre...
When bodies come into contact, the contact surface is a priori unknown. This necessitates the additi...
This work aims at improving implicit representation of complex industrial work-pieces by reducing t...
This article is devoted to shape optimisation of contact problems in linearised elasticity, thanks t...
Contact mechanics of rough surfaces is becoming increasingly important in understanding the real beh...
A finite element formulation for three dimensional (3D) contact mechanics using a mortar algorithm c...
Recent developments [1, 2] in the finite element software Z-set [3, 4] allows to solve efficiently m...
International audienceThe book covers all basic ingredients of contact and computational contact mec...
International audienceBy introducing unknown Level-Sets fields on contact interface, the Signorini-M...
This paper presents a general procedure for solving 3D contact problems with implicit finite element...
In this work, we present a new methodology for the treatment of the contact interaction between rigi...
We propose a new explicit contact algorithm for finite element discretized solids and shells with sm...
© 2014 O. A. Sachenkov, V. I. Mitryaikin, T. A. Zaitseva and Yu. G. Konoplev. The paper presents a t...