Dr Kirill Cherednichenko
Overview
Position:
Senior Lecturer
Email:
CherednichenkoKD@Cardiff.ac.ukTelephone: +44(0)29 208 75540
Fax: +44(0)29 208 74199
Extension: 75540
Location: M/2.19
Research Group
Analysis and Differential Equations
Recent Significant Publications
Cherednichenko K D, Two-scale asymptotics for non-local effects in composites with highly anisotropic fibres, Asymptotic Analysis, 2006, 39-59, 49 (1-2).
Cherednichenko K D, Smyshlyaev V P and Zhikov V V, Non-local homogenised limits for composite media with highly anisotropic periodic fibres, Proceedings of the Royal Society of Edinburgh Section A Mathematics, 2006, 87-114, 136 (1).
Cherednichenko K D and Smyshlyaev V P, On full two-scale expansion of the solutions of nonlinear periodic rapidly oscillating problems and higher-order homogenised variational problems, Archive for Rational Mechanics and Analysis, 2004, 385-442, 174 (3).
Cherednichenko K D, On propagation of attenuated Rayleigh waves along a fluid-solid interface of arbitrary shape, The Quart.J. of Mech. and App. Math., 2006, 5-94 ,59 (1).
Teaching
Personal Website
Publications
Cherednichenko K D, Two-scale asymptotics for non-local effects in composites with highly anisotropic fibres, Asymptotic Analysis, 2006, 39-59, 49 (1-2).
Cherednichenko K D, Smyshlyaev V P and Zhikov V V, Non-local homogenised limits for composite media with highly anisotropic periodic fibres, Proceedings of the Royal Society of Edinburgh Section A Mathematics, 2006, 87-114, 136 (1).
Cherednichenko K D and Smyshlyaev V P, On full two-scale expansion of the solutions of nonlinear periodic rapidly oscillating problems and higher-order homogenised variational problems, Archive for Rational Mechanics and Analysis, 2004, 385-442, 174 (3).
Cherednichenko K D, On propagation of attenuated Rayleigh waves along a fluid-solid interface of arbitrary shape, The Quart.J. of Mech. and App. Math., 2006, 5-94 ,59 (1).
Research
My research interests are in the mathematical theory of homogenisation and the broader area of the analysis of problems in continuous mechanics and materials science. The analytical tools I use range from asymptotics to the calculus of variations, depending on the nature of the problem. The idea that gives a handle to treat the problem mathematically is to determine what length-scales are important in the behaviour of the material. After this, the main challenge is to develop mathematical tools that suitably capture the postulated length-scale interactions.
More details of my research can be found on my personal webpage.