Publications
Linear and complex heart rate dynamics vary with sex in relation to fetal behavioural states. {EARLY HUMAN DEVELOPMENT}. 2008;{84}:{433-439}.Edit
Linear and nonlinear analysis of heart rate patterns associated with fetal behavioral states in the antepartum period. {EARLY HUMAN DEVELOPMENT}. 2007;{83}:{585-591}.Edit
Linear and nonlinear fetal heart rate analysis of normal and acidemic fetuses in the minutes preceding delivery. {MEDICAL & BIOLOGICAL ENGINEERING & COMPUTING}. 2006;{44}:{847-855}.Edit
Linear and nonlinear heart-rate analysis in a rat model of acute anoxia. {PHYSIOLOGICAL MEASUREMENT}. 2008;{29}:{1133-1143}.Edit
The linear dependence of ventricular repolarization variability on heart rate variability in head-down bed rest studies. In: Computing in Cardiology Conference (CinC), 2013. Spain, Zaragoza: IEEE; 2013. 7. p. 77-80p. Edit
Linear Equivalence and ODE-equivalence for Coupled Cell Networks. Nonlinearity. 2005;18:1003-1020.Edit
[2011-35] On Linear Finite Automata and Cryptography .Edit
[2017-1] The linear nature of pseudowords .Edit
Linearity of the transverse Poisson structure to a coadjoint orbit. Lett. Math. Phys.. 2003;65:213-227.Edit
Linearization of resonant vector fields. Trans. Amer. Math. Soc.. 2010;362:6457-6476.
[2004-5] Linearization of resonant vector fields .
On the link between dependence and independence in extreme value theory for dynamical systems. Statist. Probab. Lett.. 2008;78:1088-1093.
Local bifurcation in symmetric coupled cell networks: linear theory. Physica D. 2006;223:93-108.Edit
A local but not global attractor for a $\Bbb Z_n$-symmetric map. J. Singul.. 2012;6:1-14.
A local but not global attractor for a Z_n-symmetric map. J. Singul.. 2012;6:1-14.
Local controllability along a reference trajectory. J. Math. Anal. Appl.. 1991;158:55-62.
Local controllability at critical points and generic systems in $3$-space. J. Math. Anal. Appl.. 1996;201:1-24.
Local controllability in $3$-manifolds. Systems Control Lett.. 1990;14:45-49.
Local controllability of dynamic inequalities in general position. Sovrem. Mat. Prilozh.. 2004:56-78.Edit
Local controllability of nonlinear systems. Systems Control Lett.. 1985;6:213-217.
Local controllability of nonlinear systems on surfaces. Mat. Apl. Comput.. 1993;12:33-52.
Local controllability of scalar input systems on $3$-manifolds. Systems Control Lett.. 1991;16:349-355.
[2012-38] Local geometry of surfaces in $\mathbf R^4$ .