Publications
Found 213 results
[ Author] Title Type Year Filters: First Letter Of Last Name is B [Clear All Filters]
[2009-9] Generalized Fourier transform associated with the differential operator D^n_z in the complex domain .Edit
Differential Effects of Oral beta Blockade on Cardiovascular and Sympathetic Regulation. {JOURNAL OF CARDIOVASCULAR PHARMACOLOGY AND THERAPEUTICS}. 2009;{14}:{323-331}.Edit
DIFFERENTIAL EFFECTS OF ORAL BETA BLOCKADE ON CARDIOVASCULAR AND SYMPATHETIC REGULATION IN NORMAL SUBJECTS. {JOURNAL OF HYPERTENSION}. 2009;{27}:{S296-S297}.Edit
Symmetric Groups and Quotient Complexity of Boolean Operations. Vol 8573. Esparza J, Fraigniaud P, Husfeldt T, Koutsoupias E, editors 2014.Edit
Endomorphism rings of modules over prime rings. Taiwanese J. Math.. 2015;19:953-962.Edit
On the Average Complexity of Partial Derivative Automata for Semi-Extended Expressions. Journal of Automata, Languages and Combinatorics. 2017;22:5-28.Edit
On the State Complexity of Partial Derivative Automata for Regular Expressions with Intersection. In: Proceedings of the 18th Int. Workshop on Descriptional Complexity of Formal Systems (DCFS16). Vol 9777. Springer; 2016. 4. p. 45-59p. (LNCS; vol 9777).Edit
Sufficient conditions for local controllability with unbounded controls. SIAM J. Control Optim.. 1987;25:1371-1378.
Analytic linearizability of some resonant vector fields. Proc. Amer. Math. Soc.. 2001;129:2473-2481 (electronic).Edit
[2004-5] Linearization of resonant vector fields .
Local controllability along a reference trajectory. J. Math. Anal. Appl.. 1991;158:55-62.
Local controllability of nonlinear systems. Systems Control Lett.. 1985;6:213-217.
Inflection points and asymptotic lines on Lagrangian surfaces. Differential Geom. Appl.. 2014;35:9-29.
Local controllability at critical points and generic systems in $3$-space. J. Math. Anal. Appl.. 1996;201:1-24.
Control of a neoclassic economic model. Portugal. Math.. 1988;45:417-428.
Normal forms and linearization of resonant vector fields with multiple eigenvalues. J. Math. Anal. Appl.. 2005;301:219-236.Edit
The geometry of 2×2 systems of conservation laws. Acta Applicandae Mathematicae. 2005;88(3):269-329.
Reduction of Hamiltonian systems with symmetry. J. Differential Equations. 1991;94:95-111.
Minimal-dimensional realizations of Hamiltonian control systems. In: Theory and applications of nonlinear control systems ({S}tockholm, 1985). North-Holland, Amsterdam; 1986. 2. p. 233-240p.
Implicit Hamilton equations. Mat. Contemp.. 1997;12:1-16.
Local controllability in $3$-manifolds. Systems Control Lett.. 1990;14:45-49.