Dr Danila Prikazchikov

Title: Senior Lecturer
Phone: 01782 733414
Email: d.prikazchikov@keele.ac.uk
Location: MacKay Building Room 2.34
Role:
Contacting me:
Danila Prikazchikov

I graduated from Saratov State University, Russia, in 2000 and was awarded a PhD in Theoretical Solid Mechanics from the University of Salford in 2004. After my PhD I spent two years as a postdoc at the Russian State Technical University of Railways (Moscow), working on train dynamics, and was then appointed a Lecturer in Applied Mathematics within the same University. In 2007 I moved to the famous Bauman Moscow State Technical University, where I spent six years before coming to Keele in 2013.

My research interests are mainly focussed around vibrations and wave propagation in continuum mechanics; more specifically I am interested in surface, interfacial and edge waves in elastic solids. Another recent aspect of my research is mechanics of strongly inhomogeneous solids.

Selected Publications

  • Kolpakov A, Andrianov I, Prikazchikov D. 2018. Asymptotic strategy for matching homogenized structures. Conductivity problem. Quarterly Journal of Mechanics and Applied Mathematics. full text>
  • Prikazchikov D, Prikazchikova LA, Khajiyeva L. 2018. Hyperbolic-elliptic model for surface wave in a pre-stressed incompressible elastic half-space. Mechanics Research Communications. doi> full text>
  • Mikhasev G, Avdeichik E, Prikazchikov D. 2018. Free vibrations of nonlocally elastic rods. Mathematics and Mechanics of Solids. full text>
  • Kaplunov J, Prikazchikov D, Sultanova L. Justification and refinement of Winkler-Fuss hypothesis. ZAMP. full text>
  • Prikazchikov D and Nobili A. 2018. Explicit formulation for the Rayleigh wave field induced by surface stresses in an orthorhombic half-plane. European Journal of Mechanics - A/Solids, vol. 70, 86-94. doi> link> full text>

Full Publications List show

Journal Articles

  • Kolpakov A, Andrianov I, Prikazchikov D. 2018. Asymptotic strategy for matching homogenized structures. Conductivity problem. Quarterly Journal of Mechanics and Applied Mathematics. full text>
  • Prikazchikov D, Prikazchikova LA, Khajiyeva L. 2018. Hyperbolic-elliptic model for surface wave in a pre-stressed incompressible elastic half-space. Mechanics Research Communications. doi> full text>
  • Mikhasev G, Avdeichik E, Prikazchikov D. 2018. Free vibrations of nonlocally elastic rods. Mathematics and Mechanics of Solids. full text>
  • Kaplunov J, Prikazchikov D, Sultanova L. Justification and refinement of Winkler-Fuss hypothesis. ZAMP. full text>
  • Prikazchikov D and Nobili A. 2018. Explicit formulation for the Rayleigh wave field induced by surface stresses in an orthorhombic half-plane. European Journal of Mechanics - A/Solids, vol. 70, 86-94. doi> link> full text>
  • Kaplunov J, Prikazchikov DA, Prikazchikova LA. 2017. Dispersion of elastic waves in laminated glass. X INTERNATIONAL CONFERENCE ON STRUCTURAL DYNAMICS (EURODYN 2017), vol. 199, 1489-1494. link> doi> full text>
  • Ege N, Erbas B, Chorozoglou A, Kaplunov J, Prikazchikov DA. 2017. On surface wave fields arising in soil-structure interaction problems. Procedia Engineering, vol. 199, 2366-2371. doi> link> full text>
  • Kaplunov J and Prikazchikov D. 2017. Asymptotic Theory for Rayleigh and Rayleigh-Type Waves. Advances in Applied Mechanics. doi> full text>
  • Kaplunov J, Prikazchikov DA, Prikazchikova LA. 2017. Dispersion of elastic waves in a strongly inhomogeneous three-layered plate. INTERNATIONAL JOURNAL OF SOLIDS AND STRUCTURES, vol. 113, 169-179. link> doi> full text>
  • Kaplunov J, Prikazchikov DA, Rogerson GA. 2016. Edge bending wave on a thin elastic plate resting on a Winkler foundation. PROCEEDINGS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, vol. 472(2190), Article ARTN 20160178. link> doi> full text>
  • Althobaiti S and Prikazchikov D. 2016. Edge bending waves on an orthotropic elastic plate resting on the Winkler-Fuss foundation. Proceedings of National Academy of Sciences of Armenia. full text>
  • Kaplunov J, Prikazchikov D, Sergushova O. 2016. Multi-parametric analysis of the lowest natural frequencies of strongly inhomogeneous elastic rods. JOURNAL OF SOUND AND VIBRATION, vol. 366, 264-276. link> doi> full text>
  • Evkin A, Kolesnikov M, Prikazchikov D. 2016. Buckling of a spherical shell under external pressure and inward concentrated load: asymptotic solution. Mathematics and Mechanics of Solids. doi> link> full text>
  • Ege N, Erbas B, Prikazchikov DA. 2015. On the 3D Rayleigh wave field on an elastic half-space subject to tangential surface loads. ZAMM-ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND MECHANIK, vol. 95(12), 1558-1565. link> doi>
  • Pichugin AV and Prikazchikov D. 2015. Remarks on explicit strong ellipticity conditions for anisotropic or pre-stressed incompressible solids. Quarterly Journal of Mechanics and Applied Mathematics. doi> full text>
  • Kaplunov J, Prikazchikov DA, Rogerson GA, Lashab MI. 2014. The edge wave on an elastically supported Kirchhoff plate. Journal of the Acoustical Society of America, vol. 136(4), 1487-1490. link> doi> full text>
  • Erbas B, Kaplunov J, Prikazchikov D, Sahin O. The near-resonant regimes of a moving load in a three-dimensional problem for a coated elastic half-space. Mathematics and Mechanics of Solids. doi> full text>
  • Prikazchikov DA. 2013. Rayleigh waves of arbitrary profile in anisotropic media. MECHANICS RESEARCH COMMUNICATIONS, vol. 50, 83-86. link> doi> full text>
  • Kaplunov, J, Prikazchikov D, Erbas, B, Sahin, O. 2012. On a 3D moving load problem for an elastic half space. Wave Motion, 1229-1238. doi>
  • Erbas, B, Kaplunov, J, Prikazchikov D. 2012. The Rayleigh wave field in mixed problems for a half-plane. IMA Journal of Applied Mathematics, 1078-1086. doi>
  • Kaplunov J, Nolde E, Prikazchikov DA. 2010. A revisit to the moving load problem using an asymptotic model for the Rayleigh wave. WAVE MOTION, vol. 47(7), 440-451. link> doi>
  • Dai H-H, Kaplunov J, Prikazchikov DA. 2010. A long-wave model for the surface elastic wave in a coated half-space. PROCEEDINGS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, vol. 466(2122), 3097-3116. link> doi>
  • Destrade M, Gilchrist MD, Prikazchikov DA, Saccomandi G. 2008. Surface instability of sheared soft tissues. J Biomech Eng, vol. 130(6), 061007. link> doi>
  • Prikazchikov DA, Rogerson GA, Sandiford KJ. 2007. On localised vibrations in incompressible pre-stressed transversely isotropic elastic solids. JOURNAL OF SOUND AND VIBRATION, vol. 301(3-5), 701-717. link> doi>
  • Kaplunov J, Zakharov A, Prikazchikov D. 2006. Explicit models for elastic and piezoelastic surface waves. IMA JOURNAL OF APPLIED MATHEMATICS, vol. 71(5), 768-782. link> doi>
  • Kaplunov J, Prikazchikov DA, Rogerson GA. 2005. On three-dimensional edge waves in semi-infinite isotropic plates subject to mixed face boundary conditions. JOURNAL OF THE ACOUSTICAL SOCIETY OF AMERICA, vol. 118(5), 2975-2983. link> doi>
  • Kaplunov JD, Prikazchikov DA, Rogerson GA. 2004. Edge vibration of a pre-stressed semi-infinite strip with tractionfree edge and mixed face boundary conditions. ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND PHYSIK, vol. 55(4), 701-719. link> doi>
  • Prikazchikov DA and Rogerson GA. 2004. On surface wave propagation in incompressible, transversely isotropic, pre-stressed elastic half-spaces. INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE, vol. 42(10), 967-986. link> doi>
  • Prikazchikov DA and Rogerson GA. 2003. Some comments on the dynamic properties of anisotropic and strongly anisotropic pre-stressed elastic solids. INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE, vol. 41(2), 149-171. link> doi>

Chapters

  • Kaplunov J, Prikazchikov D, Sergushova O. Lowest Vibration Modes of Strongly Inhomogeneous Elastic Structures. In Mechanics for Materials and Technologies. Springer International Publishing.
  • Kaplunov J and Prikazchikov DA. 2013. Explicit models for surface, interfacial and edge waves in elastic solids. In Dynamic Localization Phenomena in Elasticity, Acoustics and Electromagnetism. Springer Science & Business Media. full text>
  • Kaplunov J and Prikazchikov DA. 2013. Explicit models for surface, interfacial and edge waves in elastic solids. In Dynamic Localization Phenomena in Elasticity, Acoustics and Electromagnetism. Springer Science & Business Media. full text>

Other

  • Althobaiti S, Kaplunov J, Prikazchikov D. 2017. An edge moving load on an orthotropic plate resting on a Winkler foundation. Procedia Engineering (vol. 199, pp. 2579-2584). Elsevier. full text>

MAT-20004: Complex Variable I & Vector Calculus
MAT-20008: Differential Equations
MAT-40005: Linear Elasticity