"On interpolation of homogenized coefficients for analysis of large deformation"@en . "homogenization;deformation;hy perelasticity;sensitivity analysis;interpolation"@en . . . . "6"^^ . "RIV/49777513:23520/03:00000108!RIV/2004/MSM/235204/N" . "On interpolation of homogenized coefficients for analysis of large deformation" . "On interpolation of homogenized coefficients for analysis of large deformation"@en . "1"^^ . . "80-86246-18-3" . . "2003-05-12+02:00"^^ . "On interpolation of homogenized coefficients for analysis of large deformation" . "Svratka" . "1-6" . "[E840F34345CB]" . "\u00DAstav teoretick\u00E9 a aplikovan\u00E9 mechaniky AV \u010CR" . . "0"^^ . "1"^^ . "RIV/49777513:23520/03:00000108" . "0"^^ . . "The paper deals with the method of interpolation of the homogenized effective material parameters which are computed by solving local microscopic boundary value problems. These coefficients constitute the tangent operator employed to linearize the probl em of finite deformation. Due to finite deformations, the microscopic problems are only locally periodic and the effective coefficients as well. The proposed interpolation scheme enables to reduce wisely the number of microscopic problems that have to b e solved to recover the macroscopic domain with relevant effective coefficients." . "Prague" . "Z(MSM 235200003)" . . "Rohan, Eduard" . . . . . . "23520" . . . "619373" . "The paper deals with the method of interpolation of the homogenized effective material parameters which are computed by solving local microscopic boundary value problems. These coefficients constitute the tangent operator employed to linearize the probl em of finite deformation. Due to finite deformations, the microscopic problems are only locally periodic and the effective coefficients as well. The proposed interpolation scheme enables to reduce wisely the number of microscopic problems that have to b e solved to recover the macroscopic domain with relevant effective coefficients."@en . . . . "Engineering Mechanics 2003" .