Publications
[2005-11] Projected Wallpaper Patterns .Edit
Stability of equilibria in equations of Hodgkin-Huxley type. In: Real and complex singularities. Vol 354. Amer. Math. Soc., Providence, RI; 2004. 1. p. 137-143p. (Contemp. Math.; vol 354).Edit
Note on the unfolding of degenerate Hopf bifurcation germs. J. Differential Equations. 1985;57:436-439.
Dense heteroclinic tangencies near a Bykov cycle. Journal of Differential Equations. 2015; 259(11):5875-5902.
Invariants for bifurcations. Houston J. Math.. 2006;32:445-458.Edit
Global bifurcations close to symmetry. Journal of Mathematical Analysis and Applications. 2016;444(1):648-671.Edit
Singularities of equations of Hodgkin-Huxley type. Dynam. Stability Systems. 1996;11:91-108.Edit
[2015-23] Limit cycles for a class of $\mathbb{Z}_{2n}-$equivariant systems without infinite equilibria .Edit
[2004-28] Symmetries of projected wallpaper patterns .Edit
Degenerate Hopf bifurcation and nerve impulse. SIAM J. Math. Anal.. 1985;16:1121-1133.
[2015-10] Global bifurcations close to symmetry .Edit
Symmetries of projected wallpaper patterns. Math. Proc. Cambridge Philos. Soc.. 2006;141:421-441.Edit
On Takens Last Problem: tangencies and time averages near heteroclinic networks. Nonlinearity . 2017;30(5):1876-1910.Edit
The Arrhenius plot of a physiological rate process is never linear. Ciência e Cultura. 1991;43(5):363-369.Edit
Descriptional Complexity of Formal Systems, 14th International Workshop (DCFS 2012). Vol 7386. Kutrib M, Moreira N, Reis R, editors Springer 2012.Edit
Computing maximal error-detecting capabilities and distances of regular languages. Fund. Inform.. 2010;101:257-270.Edit
Generating Error Control Codes With Automata and Transducers. In: Bordihn H, Freund R, Nagy B, Vaszil G, editors. Eighth Workshop on Non-Classical Models of Automata and Applications (NCMA 2016). Österreichische Computer Gesellschaft; 2016. 2. p. 211-226p. Edit
Maximal error-detecting capabilities of formal languages. J. Autom. Lang. Comb.. 2008;13:55-71.Edit