@article{zu228514,
          volume = {12},
           title = {Quaternionic G?Monogenic Mappings in Em},
          author = {V. S. Shpakivskyi and T. S. Kuzmenko},
       publisher = {SciPress Ltd., Switzerland},
            year = {2018},
           pages = {1--34},
         journal = {International Journal of Advanced Research in Mathematics},
        keywords = {complex quaternions algebra, G{\^a}teaux derivative, G-monogenic mappings, constructive
description, integral theorems, Taylor?s and Laurent?s expansions, singular points, H-monogenic
mappings.},
             url = {http://eprints.zu.edu.ua/28514/},
        abstract = {We consider a class of so-called quaternionic G-monogenic mappings associated with m-dimensional (m 2 f2; 3; 4g) partial differential equations and propose a description of all mappings
from this class by using four analytic functions of complex variable. For G-monogenic mappings we
generalize some analogues of classical integral theorems of the holomorphic function theory of the
complex variable (the surface and the curvilinear Cauchy integral theorems, the Cauchy integral formula,
the Morera theorem), and Taylor?s and Laurent?s expansions. Moreover, we investigated the
relation between G-monogenic and H-monogenic (differentiable in the sense of Hausdorff) quaternionic
mappings.}
}