Curriculum Vitae
Date and place of birth: 28. December 1984, Chlumec nad Cidlinou, Czech republic
Education: 
2003  2008 
Mgr., Comenius University in Bratislava  Mathematical Analysis, advisor – Michal Fečkan 

2011 
RNDr., Comenius University in Bratislava, Mathematics 

2008  … 
PhD., Mathematical Institute of Slovak Academy of Sciences, advisor – Michal Fečkan 
List of publications with citations
1. M. Fečkan, M. Pospíšil, On the bifurcation of periodic orbits in discontinuous systems, Communications in Mathematical Analysis 8 (2010), 87108.
· Z. Du, Y. Li, Bifurcation of periodic orbits with multiple crossings in a class of planar Filippov systems, Mathematical and Computer Modelling 55 (2012), 10721082.
2. M. Medved’, M. Pospíšil, L. Škripková, Stability and the nonexistence of blowingup solutions of nonlinear delay systems with linear parts defined by permutable matrices, Nonlinear Analysis: Theory, Methods & Applications, 74 (2011), 39033911.
· Boichuk, J. Diblík, D. Khusainov, M. Růžičková, Boundaryvalue problems for weakly nonlinear delay differential systems, Abstract and Applied Analysis, 2011 (2011), Article ID 631412, 19 pages.
· J. Baštinec, G. Piddubna, Solutions and stability of solutions of a linear differential matrix system with delay, Mathematical Models and Methods in Modern Science, WSEAS Press, Puerto De La Cruz, Spain 2011, 9499.
3. M. Fečkan, M. Pospíšil, Bifurcations of periodic orbits in discontinuous systems, Aplimat – Journal of Applied Mathematics, vol. 4, (2011), 8796.
4. M. Fečkan, M. Pospíšil, Bifurcation from family of periodic orbits in discontinuous systems, Differential Equations and Dynamical Systems, 2011, in press.
· Z. Du, Y. Li, Bifurcation of periodic orbits with multiple crossings in a class of planar Filippov systems, Mathematical and Computer Modelling 55 (2012), 10721082.
5. M. Fečkan, M. Pospíšil, Bifurcation from single periodic orbit in discontinuous autonomous systems, Applicable Analysis, 2011, accepted.
6. M. Fečkan, M. Pospíšil, Bifurcation of periodic orbits in periodically forced impact systems, Mathematica Slovaca, 2011, accepted.
7. M. Medved’, M. Pospíšil, Sufficient conditions for the asymptotic stability of nonlinear multidelay differential equations with linear parts defined by pairwise permutable matrices, Nonlinear Analysis: Theory, Methods & Applications, 75 (2012), 33483363.