On an approach to solving the problems of interface cracks originated at the corner points of a piecewise homogeneous body ^{1}Kipnis AL. On an approach to solving the problems of interface cracks originated at the corner points of a piecewise homogeneous body. 2014 ;(10):51-55.

Generation of self-excited jet oscillations at a wedge ^{1}Vovk IV, ^{1}Malyuga VS. Generation of self-excited jet oscillations at a wedge. 2015 ;(12):41-48.

Green's function of the three-dimensional convective wave equation for an infinite straight pipe ^{1}Borysyuk AO. Green's function of the three-dimensional convective wave equation for an infinite straight pipe. 2015 ;(12):33-40.

A base of the iterative methodology for a refined determination of electromechanical coupling factors in piezoceramic resonators ^{1}Bezverkhyi OI, ^{1}Zinchuk LP, ^{1}Karlash VL. A base of the iterative methodology for a refined determination of electromechanical coupling factors in piezoceramic resonators. 2015 ;(12):25-32.

On the effect of a viscous fluid on quasi-Lamb waves in an elastic layer that interacts with a liquid layer ^{1}Bahno OM. On the effect of a viscous fluid on quasi-Lamb waves in an elastic layer that interacts with a liquid layer. 2016 ;(4):41-48.

On quasi–Lamb waves in the system "a layer of ideal fluid – a compressible elastic layer with initial stresses" ^{1}Bahno OM. On quasi–Lamb waves in the system "a layer of ideal fluid – a compressible elastic layer with initial stresses". 2016 ;(3):38-47.

On the interaction of a spherical radiator with viscous compressible liquid in a cylindrical vessel ^{1}Kubenko VD. On the interaction of a spherical radiator with viscous compressible liquid in a cylindrical vessel. 2016 ;(2):47-53.

On the localization of quasi–Lamb waves in the layer of ideal fluid — elastic layer system ^{1}Bahno OM. On the localization of quasi–Lamb waves in the layer of ideal fluid — elastic layer system. 2016 ;(2):38-46.

Modeling of a nonlinear deformation of orthotropic cylindrical shells with a hole with regard for the eccentricity of its reinforcement ^{1}Chernyshenko IS, ^{1}Komarchuk SM, ^{1}Maksimyuk VA, ^{1}Storozhuk EA. Modeling of a nonlinear deformation of orthotropic cylindrical shells with a hole with regard for the eccentricity of its reinforcement. 2016 ;(1):34-40.

On the limiting equilibrium state of a nonlinear anisotropic body with a crack ^{1}Kaminsky AA, ^{1}Kurchakov EE. On the limiting equilibrium state of a nonlinear anisotropic body with a crack. Reports of the National Academy of Sciences of Ukraine. 2015 ;(11):52-60.