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@ARTICLE{,
            author = {Bul{\'{\i}}{\v c}ek, Miroslav and Burczak, Jan},
             month = feb,
             title = {Existence and smoothness for a class of $n$D models in elasticity theory of small deformations},
           journal = {ZAMP},
            volume = {69},
              year = {2018},
             pages = {20},
               doi = {10.1007/s00033-018-0917-x},
          abstract = {We consider a model for deformations of a homogeneous isotropic body, whose shear modulus remains constant, but its bulk modulus can be a highly nonlinear function. We show that for a general class of such models, in an arbitrary space dimension, the respective PDE problem has a unique solution. Moreover, this solution enjoys interior smoothness. This is the first regularity result for elasticity problems that covers the most natural space dimension $3$ and that captures behaviour of many typical elastic materials (considered in the small deformations) like rubber, polymer gels or concrete.},
  Preprint project = {MORE},
     Preprint year = {2016},
   Preprint number = {22},
       Preprint ID = {MORE/2016/22}
}