Other
Part of my past research activity does not belong to any of my current research lines:
(i) Pattern formation in excitable (e.g. herat tissue) and bistable media.
(ii) Transitions to high-dimensional chaos.
(iii) Nontwist phenomena in reversible (but non-Hamiltonian) systems.
(iv) Recurrence plots, a method for time-series analysis.
Publications
D. Pazó and E. M. Nicola, Breaking chirality in nonequilibrium systems on the lattice, Europhys. Lett. 81, 10009 (2008).
Y. Zou, D. Pazó, M. C. Romano, M. Thiel, and J. Kurths, Distinguishing quasiperiodic dynamics from chaos in short-time series, Phys. Rev. E 76, 016210 (2007).
E. G. Altmann, G. Cristadoro, and D. Pazó, Nontwist non-Hamiltonian systems, Phys. Rev. E 73, 056201 (2006).
G. Izús, D. Pazó, R.R. Deza, and V. Pérez-Muñuzuri, Anomalous nonequilibrium Ising-Bloch bifurcation in discrete systems, Phys. Rev. E 72, 045205(R) (2005).
D. Pazó and M. A. Matías, Direct transition to high-dimensional chaos through a global bifurcation, Europhys. Lett. 72, 176-182 (2005).
D. Pazó, R.R. Deza, and V. Pérez-Muñuzuri, Parity-breaking front bifurcation in bistable media: link between discrete and continuous versions, Phys. Lett. A 340, 132-138 (2005).
D. Pazó, L. Kramer, A. Pumir, S. Kanani, I. Efimov, and V. Krinsky, Pinning force in active media, Phys. Rev. Lett. 93, 168303 (2004).
S. Takagi, A. Pumir, D. Pazó, I. Efimov, V. Nikolski, and V. Krinsky, A physical approach to remove anatomical reentries: a bidomain study, J. Theor. Biol. 230, 489-497 (2004).
S. Takagi, A. Pumir, D. Pazó, I. Efimov, V. Nikolski, and V. Krinsky, Unpinning and removal of a rotating wave in cardiac muscle, Phys. Rev. Lett. 93, 058101 (2004). [Featured in Phys. Rev. Focus].
D. Pazó and V. Pérez-Muñuzuri, Traveling fronts in an array of coupled symmetric bistable units, Chaos 13, 812-823 (2003).
D. Pazó and V. Pérez-Muñuzuri, Onset of wave fronts in a discrete bistable medium, Phys. Rev. E 64, 065203(R) (2001). [pdf]
D. Pazó, E. Sánchez and M. A. Matías, Transition to high-dimensional chaos through quasiperiodic motion, Int. J. of Bifurcation and Chaos 11, 2683-2688 (2001). [pdf]