<mods:mods version="3.3" xsi:schemaLocation="http://www.loc.gov/mods/v3 http://www.loc.gov/standards/mods/v3/mods-3-3.xsd" xmlns:mods="http://www.loc.gov/mods/v3" xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance"><mods:titleInfo><mods:title>Generalized integral theorems for the quaternionic G-monogenic mappings</mods:title></mods:titleInfo><mods:name type="personal"><mods:namePart type="given">T. S.</mods:namePart><mods:namePart type="family">Kuzmenko</mods:namePart><mods:role><mods:roleTerm type="text">author</mods:roleTerm></mods:role></mods:name><mods:name type="personal"><mods:namePart type="given">V. S.</mods:namePart><mods:namePart type="family">Shpakivskyi</mods:namePart><mods:role><mods:roleTerm type="text">author</mods:roleTerm></mods:role></mods:name><mods:abstract>For G-monogenic mappings taking values in the algebra of&#13;
complex quaternions we generalize some analogues of classical integral&#13;
theorems of the holomorphic function theory of a complex variable (the&#13;
surface and the curvilinear Cauchy integral theorems).</mods:abstract><mods:classification authority="lcc">Mathematical Analysis</mods:classification><mods:originInfo><mods:dateIssued encoding="iso8061">2016</mods:dateIssued></mods:originInfo><mods:genre>Article</mods:genre></mods:mods>