Publications (full list)
2024
D. Pazó, Quasi-integrable arrays: The family grows, Physics 17, 12 (2024).
2023
D. Pazó and R. Gallego, Volcano transition in populations of phase oscillators with random nonreciprocal interactions, Phys. Rev. E 108, 014202 (2023).
2022
I. León and D. Pazó, Efficient moment-based approach to the simulation of infinitely many heterogeneous phase oscillators, Chaos 32, 063124 (2022).
I. León and D. Pazó, Enlarged Kuramoto model: Secondary instability and transition to collective chaos, Phys. Rev. E 105, L042201 (2022).
2021
D. Velasco, J. M. López and D. Pazó, Nonuniversal large-size asymptotics of the Lyapunov exponent in turbulent globally coupled maps, Phys. Rev. E 104, 034216 (2021).
D. Pazó and R. Gallego, Comment on "The Winfree model with non-infinitesimal phase-response curve: Ott-Antonsen theory" [Chaos 30, 073139 (2020)], Chaos 31, 018101 (2021).
2020
E. Montbrió and D. Pazó, Exact mean-field theory explains the dual role of electrical synapses in collective synchronization, Phys. Rev. Lett. 125, 248101 (2020).
I. León and D. Pazó, Quasi phase reduction of all-to-all strongly coupled λ-ω oscillators near incoherent states Phys. Rev. E 102, 042203 (2020).
D. Pazó and R. Gallego, The Winfree model with non-infinitesimal phase-response curve: Ott-Antonsen theory, Chaos 30, 073139 (2020).
C. E. Graafland, J. M. Gutiérrez, J. M. López, D. Pazó, and M. A. Rodríguez, The probabilistic backbone of data-driven complex networks: An example in climate, Sci. Rep. 10, 11484 (2020).
2019
I. León and D. Pazó, Phase reduction beyond the first order: The case of the mean-field complex Ginzburg-Landau equation, Phys. Rev. E 100, 012211 (2019).
D. Pazó, E. Montbrió and R. Gallego, The Winfree model with heterogeneous phase-response curves: Analytical results, J. Phys. A: Math. Theor. 52, 154001 (2019).
2018
F. Devalle, E. Montbrió and D. Pazó, Dynamics of a large system of spiking neurons with synaptic delay, Phys. Rev. E 98, 042214 (2018).
E. Montbrió and D. Pazó, Kuramoto model for excitation-inhibition-based oscillations, Phys. Rev. Lett. 120, 244101 (2018).
2017
R. Gallego, E. Montbrió, and D. Pazó, Synchronization scenarios in the Winfree model of coupled oscillators, Phys. Rev. E 96, 042208 (2017).
2016
D. Pazó, J. M. López, and A. Politi, Diverging fluctuations of the Lyapunov exponents, Phys. Rev. Lett. 117, 034101 (2016).
D. Pazó and E. Montbrió, From quasiperiodic partial synchronization to collective chaos in populations of inhibitory neurons with delay, Phys. Rev. Lett. 116, 238101 (2016).
D. Pazó, A. Carrassi, and J. M. López, Data-assimilation by delay-coordinate nudging, Q. J. R. Meteorol. Soc. 142, 1290-1299 (2016).
2015
E. Montbrió, D. Pazó, and A. Roxin, Macroscopic description for networks of spiking neurons, Phys. Rev. X 5, 021028 (2015).
2014
D. Pazó, J. M. López, R. Gallego, and M. A. Rodríguez, Synchronizing spatio-temporal chaos with imperfect models: a stochastic surface growth picture, Chaos 24, 043115 (2014).
D. Pazó and E. Montbrió, Low-dimensional dynamics of populations of pulse-coupled oscillators, Phys. Rev. X 4, 011009 (2014). [Featured in Physics]
2013
D. Pazó, J. M. López, and M. A. Rodríguez, The geometric norm improves ensemble forecasting with the breeding method, Q. J. R. Meteorol. Soc. 139, 2021-2032 (2013).
D. Pazó, J. M. López, and A. Politi, Universal scaling of Lyapunov-exponent fluctuations in space-time chaos, Phys. Rev. E 87, 062909 (2013).
D. Pazó, J. M. López, and M. A. Rodríguez, On the angle between the first and the second Lyapunov vectors in spatio-temporal chaos, J. Phys. A: Math. Theor. 46, 254014 (2013).
2012
M. Romero-Bastida, D. Pazó, and J. M. López, Covariant hydrodynamic Lyapunov modes and strong stochasticity threshold in Hamiltonian lattices, Phys. Rev. E 85, 026210 (2012).
2011
E. Montbrió and D. Pazó, Collective synchronization in the presence of reactive coupling and shear diversity, Phys. Rev. E 84, 046206 (2011). [pdf]
S. Herrera, D. Pazó, J. Fernández, and M. A. Rodríguez, The role of large-scale patterns in the chaotic amplification of perturbations in a Lorenz'96 model, Tellus 63A, 978-990 (2011).
D. Pazó and E. Montbrió, The Kuramoto model with distributed shear, EPL (Europhys. Lett.) 95, 60007 (2011).
D. Pazó, J. M. López, and M. A. Rodríguez, Maximizing the statistical diversity of an ensemble of bred vectors using the geometric norm, J. Atmos. Sci. 68, 1507 (2011).
E. Montbrió and D. Pazó, Shear diversity prevents collective synchronization, Phys. Rev. Lett. 106, 254101 (2011). [pdf]
2010
D. Pazó and J. M. López, Characteristic Lyapunov vectors in chaotic time-delayed systems, Phys. Rev. E 82, 056201 (2010). [pdf]
M. Romero-Bastida, D. Pazó, J. M. López, and M. A. Rodríguez, Structure of characteristic Lyapunov vectors in anharmonic Hamiltonian lattices, Phys. Rev. E 82, 036205 (2010). [pdf]
S. Hallerberg, D. Pazó, J. M. López, and M. A. Rodríguez, Logarithmic bred vectors in spatiotemporal chaos: structure and growth, Phys. Rev. E. 81, 066204 (2010). [pdf]
D. Pazó, M. A. Rodríguez, and J. M. López, Spatio-temporal evolution of perturbations in ensembles initialized by bred, Lyapunov, and singular vectors, Tellus 62A,10 (2010). [pdf]
2009
D. Pazó and E. Montbrió, Existence of hysteresis in the Kuramoto model with bimodal frequency distributions, Phys. Rev. E 80, 046215 (2009).
H. Chiba and D. Pazó, Stability of an [N/2]-dimensional invariant torus in the Kuramoto model at small coupling, Physica D 238, 1068-1081 (2009).
D. Pazó, J. M. López, and M. A. Rodríguez, Exponential localization of singular vectors in spatiotemporal chaos, Phys. Rev. E 79, 036202 (2009). [pdf]
2008
D. Pazó, I. G. Szendro, J. M. López, and M. A. Rodríguez, Structure of characteristic Lyapunov vectors in spatiotemporal chaos, Phys. Rev. E 78, 016209 (2008). [pdf]
D. Pazó and E. M. Nicola, Breaking chirality in nonequilibrium systems on the lattice, Europhys. Lett. 81, 10009 (2008). [pdf]
2007
I. G. Szendro, D. Pazó, M. A. Rodríguez, and J. M. López, Spatiotemporal structure of Lyapunov vectors in chaotic coupled-map lattices, Phys. Rev. E 76, 025202(R) (2007). [pdf]
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).
2006
E. Montbrió, D. Pazó, and J. Schmidt, Time delay in the Kuramoto model with bimodal frequency distribution, Phys. Rev. E 74, 056201 (2006). [pdf]
E. Sánchez, D. Pazó, and M. A. Matías, Experimental study of the transitions between synchronous chaos and a periodic rotating wave, Chaos 16, 033122 (2006).
D. Pazó and E. Montbrió, Universal behavior in populations composed of excitable and self-oscillatory elements, Phys. Rev. E 73, 055202(R) (2006). [pdf]
E. G. Altmann, G. Cristadoro, and D. Pazó, Nontwist non-Hamiltonian systems, Phys. Rev. E 73, 056201 (2006)
D. Pazó and M. A. Matías, Comment on “Periodic phase synchronization in coupled chaotic oscillators”, Phys. Rev. E 73, 038201 (2006). [pdf]
2005
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, Thermodynamic limit of the first-order phase transition in the Kuramoto model, Phys. Rev. E. 72, 046211 (2005).
D. Pazó and M. A. Matías, Direct transition to high-dimensional chaos through a global bifurcation, Europhys. Lett. 72, 176-182 (2005).[pdf]
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).
2004
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 Physical Review Focus].
2003
D. Pazó and V. Pérez-Muñuzuri, Traveling fronts in an array of coupled symmetric bistable units, Chaos 13, 812-823 (2003).
D. Pazó, M. A. Zaks and J. Kurths, Role of unstable periodic orbits in phase and lag synchronization between coupled chaotic oscillators, Chaos 13, 309-318 (2003).
2001
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, N. Montejo and V. Pérez-Muñuzuri, Wavefronts and spatio-temporal chaos in an array of coupled Lorenz oscillators, Phys. Rev. E 63, 066206 (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]
2000
D. Pazó, I. P. Mariño, V. Pérez-Villar and V. Pérez-Muñuzuri, Transition to chaotic phase synchronization through random phase jumps, Int. J. of Bifurcation and Chaos 10, 2533-2539 (2000). [pdf]