Activity in the scientific community, international connections

Member of the János Bolyai Mathematical Society, secretary of its Applied Section

European Association for Theoretical Computer Science (member)
CURRICULUM VITAE OF József Fritz

1. Personal data:

Birth date: 1943

Highest school degree: university diploma

Speciality: mathematician

Phone, email: 463-1359, jofri@math.bme.hu
2. Present employer (BME): Budapest University of Technology and Economics

Department of Differential Equations

CSc in mathematics

DSc in mathematics , 1986

member of the Hungarian Academy of Sciences, 2001

5. Major Hungarian Scholarships:

6. Teaching activity so far (with list of courses taught)

Probability theory, statistical physics, partial differential equations, financial mathematics, mathematical analysis.

More than 50 scientific papers and university teacher’s texts in the disciplines above.

1. 
   J. Fritz, Entropy pairs and compensated compactness for weakly asymmetric systems, Advanced Studies in Pure Mathematics 39 (2004), 143-171.
   
2. 
   J. Fritz and B. Tóth, Derivation of the Leroux system as the hydrodynamic limit of a two-component lattice gas, Commun. Math. Phys. 249 (2004), 1-27.
   
3. 
   J. Fritz and Katalin Nagy, On uniqueness of the Euler limit of one-component lattice gas Models, ALEA 1 (2006), 367-392.
   
4. 
   J. Fritz and Katalin Nagy and S. Olla, Equilibrium fluctuations of harmonic oscillators with conservative noise., J. Statist. Phys. 122 (2006), 399-415.
   
5. 
   Fritz József, Lax Péter tudományos munkásságáról, Természet Világa 6 (2005), 345-346.
   

1. 
   J. Fritz, Distribution-free exponential error bounds for nearest neighbor pattern classification, IEEE IT 21 (1976), 552-558.
   
2. 
   J. Fritz and R.L. Dobrushin, Non-equilibrium dynamics of two-dimensional infinite particle systems with singular interaction, Commun. Math. Phys. 55 (1977), 67-89.
   
3. 
   J. Fritz, On the hydrodynamic limit of a one-dimensional Ginzburg-Landau lattice model. The a priori bounds, Journ. Stat. Phys. 47 (1987), 551-572.
   
4. 
   J. Fritz, T. Funaki, J.L. Lebowitz, Stationary states of random Hamiltonian systems, Probab. Theory Rel. Fields 99 (1994), 211-236.
   
5. 
   J. Fritz, Entropy pairs and compensated compactness for weakly asymmetric systems, Advanced Studies in Pure Mathematics 39 (2004), 143-171.
   

Journal of Statistical Physics, 1991–1994.

Acta Math. Hungarica, 1995–

Publicationes Math. Debreceniensis, 1996–

Periodica Math. Hungarica, 1998–

Markov Processes and Related Fields, 2002–

Archive for Rational Mechanics and Analysis, 2004–
CURRICULUM VITAE OF Ákos G. Horváth

1. Personal data:

Birth date: 1960

Highest school degree: university diploma

Speciality: mathematician

Phone, email: 463-2645, ghorvath@math.bme.hu
2. Present employer (BME): Budapest University of Technology and Economics

Department of Geometry

CSc in mathematics,1995

For mathematics majors: Geometry, Combinatorial geometry, Discrete geometry, Non-Euclidean geometry

For engineer students: Mathematics, Geometry, Descriptive Geometry,

Instruction of Phd and graduate students, Msc Thesis Math.

1. 
   Skew lines in Hyperbolic space Periodica Poly. ser Mech. Eng. 47/1(2003), 25–31.
   
2. 
   On the second-order Reed-Muller code.Per. Poly. ser Mech. Eng. 47/1(2003), 31–41.
   
3. 
   Polygons with equal angles in the hyperbolic plane. (in common with Imre Vermes ) Studies of the University of Zilina 16/1 (2003) 47–51.
   
4. 
   Bisectors in Minkowski 3-space Beiträge zur Geometrie und Algebra 45/1, (2004) 225–238.
   
5. 
   On the connection between the projection and the extension of a parallelotope. Monatshefte für Mathematik 3, (2007) 211–216.
   

1. 
   On the Dirichlet-Voronoi cells of the unimodular lattices. Geometriae Dedicata 63 (1996), 183–191
   
2. 
   On the boundary of an extremal body. Berträige zur Geometrie und Algebra 40/2(1999), 331–342
   
3. 
   On the bisectors of a Minkowski normed space. Acta Math. Hung. 89(3) (2000), 417–424
   
4. 
   Bisectors in Minkowski 3-space Beiträge zur Geometrie und Algebra 45/1, (2004) 225–238
   
5. 
   On the connection between the projection and the extension of a parallelotope. Monatshefte für Mathematik 3, (2007) 211–216
   

Reviewer of Zentralblatt für Mathematik, 1984-

Member of the editorial board of Studies of the University of Zilina, 2001-

Member of the curatorium of Renyi Kato fellowship, 2001-

Department of Analysis

Ph.D. in mathematics, 1999: Approximation in Weighted Spaces

György Békésy Postdoctoral Fellowship, 2001

From 1988: analysis, differential equations, functional analysis, complex analysis, calculus, measure theory, potential theory, probability theory.

See 8 and 9.

1. 
   Characterization of Fourier Series with (C,1) Means, S uppl. Rendiconti del Circ. Math. di Palermo Ser. 2 (68) 2002.
   
2. 
   Jackson order of approximation by Riesz means for Freud weights, Proc. of the conf. Constructive Function Theory, Varna, 2002. (Edited by B. Bojanov).
   
3. 
   Weighted Hermite-Fejér interpolation on Laguerre nodes, Acta Math. Hung. 100(4)(2003), 271-291
   
4. 
   Weighted Hermite-Fejér Interpolation on the Real Line : L_{\infty} Case, Acta Math. Hung. 115(1-2)(2007), 101-131.
   
5. 
   Abel Summation in Hermite-type Weighted Spaces with Singularities, to appear in East J. on Approx.
   

1. 
   Laguerre-tempered distributions and their expansions, Acta Math. Hungar. 67(1-2) (1995), 109-118.
   
2. 
   (with József Szabados ) Polynomial approximation and interpolation on the real line with respect to general classes of weights, Results in Mathematics 34 (1998), 120-131.
   
3. 
   (w)-normal point systems, Acta Math. Hungar. 85 (1-2) (1999), 9-27.
   
4. 
   Characterization of Fourier Series with (C,1) Means, Suppl. Rendiconti del Circ. Math. di Palermo Ser. 2 (68) 2002.
   
5. 
   Abel Summation in Hermite-type Weighted Spaces with Singularities, to appear in East J. on Approx.
   

Co-organization of the Second Workshop on Extremal Problems in Fourier Analysis : September 18-24, 2007, Budapest

Department of Differential Equations

CSc in mathematics, 1986

DSc in mathematics, 2002

Széchenyi Professorial Fellowship, 1998-2001

He has given courses on ordinary and partial differential equations, numerical dynamics, functional analysis, numerical analysis, calculus, and linear algebra.

He is the author of more than 70 papers in the areas of the qualitative theory of general discretizations methods (i.e., of numerical dynamics), computer-assisted proofs for chaos, ordinary differential equations in infinite-dimensional spaces, stability theory, and applications to population dynamics.

1. 
   (with J.Hofbauer) Robust permanence for ecological equations, minimax, and discretizations, SIAM.J.Math.Anal. 34(2003), 1007-1039.
   
2. 
   (with B.Bánhelyi & T.Csendes) , A verified optimization technique to locate chaotic regions of Hénon systems, J. Global Optimiz 35(2006), 145-160.
   
3. 
   (with B.Bánhelyi & T.Csendes), Optimization and the Miranda approach in detecting horseshoe-type chaos by computer, Int. J. Bifurc. Chaos 17(2007) 735-748.(F4)
   
4. 
   A brief survey on the numerical dynamics of functional differential equations -- Gyula Farkas (1972-2002) in memoriam, Int. J. Bifurc. Chaos 15(2005), 729-742.
   
5. 
   (with W.J. Beyn) Estimates of variable stepsize Runge--Kutta methods for sectorial evolution equations with nonsmooth data, Appl.Numer.Math. 41(2002), 369-400.
   

He is the deputy chairman of the Doctoral Council of the Institute of Mathematics at the Budapest University of Technology, an elected representative of the Hungarian DSc Mathematicians at the Hungarian Academy of Sciences, and a board member of the Mathematics Section of the Hungarian National Science Foundation OTKA

Department of Computer Science and Information Theory

CSc in mathematics, 1978

DSc in mathematics, 1988

Member of the Hungarian Academy of Sciences, 2001
5. Major Hungarian Scholarships:
6. Teaching activity so far (with list of courses taught)

Courses: probability theory, queueing, information theory, mathematical statistics

Research areas: statistical pattern recognition, nonparametric curve estimation, information theory

Awards: Farkas Gyula Award, 1975, Jacob Wolfowitz Prize, 1997, Széchenyi Award, 2000.

8. Selected publications (maximum 5) from the past 5 years:
9. The five most important publications (if different from the preceding ones):

1. 
   L. Devroye, L. Györfi “Nonparametric Density Estimation: the L1 View”. Wiley, New York, 1985. Orosz fordítás Mir, Moszkva, 1988.
   
2. 
   L. Györfi, W. Hardle, P. Sarda, Ph. Vieu “Nonparametric Curve Estimation from Time Series”. Springer, Berlin,1989.
   
3. 
   L. Devroye, L. Györfi, G. Lugosi “A Probabilistic Theory of Pattern Recognition”. Springer, New York, 1996.
   
4. 
   L. Györfi, M. Kohler, A. Krzyzak, H. Walk “A Distribution-Free Theory of Nonparametric Regression”. Springer, New York, 2002.
   
5. 
   L. Györfi (Ed.) “Principles of Nonparametric Learning”. Springer, Wien, 2002.
   

1. 
   L. Devroye, L. Györfi “Nonparametric Density Estimation: the L1 View”. Wiley, New York, 1985. Orosz fordítás Mir, Moszkva, 1988.
   
2. 
   L. Györfi, W. Hardle, P. Sarda, Ph. Vieu “Nonparametric Curve Estimation from Time Series”. Springer, Berlin,1989.
   
3. 
   L. Devroye, L. Györfi, G. Lugosi “A Probabilistic Theory of Pattern Recognition”. Springer, New York, 1996.
   
4. 
   L. Györfi, M. Kohler, A. Krzyzak, H. Walk “A Distribution-Free Theory of Nonparametric Regression”. Springer, New York, 2002.
   
5. 
   L. Györfi (Ed.) “Principles of Nonparametric Learning”. Springer, Wien, 2002.
   

Department of Differential Equations

CSc (matematika), 1989

Széchenyi István Scholarship

JATE ( 1 year):

practice hours on numerical methods;

ELTE ( 2 years):

lectures on numerical methods of differential equations;

lectures on mathematical foundations of finite element method;

BME (19 years):

lectures and practice hours on mathematics for engineers in the I-IV semesters;

lectures and practice hours on numerical methods for engineer-mathematicians, mathematicians, engineer-physicists and PhD students;

lectures on control theory for engineer-mathematicians, mathematicians, mechanical engineering and PhD students

First, investigation of the asymptotic behavior of differential equations with retarded arguments. Later numerical solution of time-optimal control problems. Last 15 years, robust stabilization of nonlinear control systems. Applications for mathematical models of economics and engineering sciences.

1. 
   Receding horizon H-infinity control for nonlinear discrete-time systems. IEE Proc. Control Theory Appl. Vol. 149. No. 6. 2002. 540-546.
   
2. 
   Quadratic stabilization with H_-norm bound of non-linear discrete-time uncertain systems with bounded control. Systems & Control Letters, Vol. 50. 2003. 277-289. (tásszerző: Takács T.)
   
3. 
   Stabilization of sampled-data nonlinear systems by receding horizon control via discrete-time approximation. Automatica Vol. 40 2004, 2017-2028. (tásszerző: Elaiw A.)
   
4. 
   Guaranteeing cost strategies for infinite horizon difference games with uncertain dynamics, International Journal of Control, Vol. 78. No. 8. 2005. 587-599. (tásszerző: Takács T.)
   
5. 
   Sampled-Data Model Predictive Control for Nonlinear Time-Varying Systems: Stability and Robustness., In: Assessment and Future Directions of Nonlinear Model Predictive Control, Eds.: F. Allgöver, L. Biegler, R. Findeisen, Lecture Notes in Control and Information Sciences Series, Vol. 358, ISBN 978-3-540-72698-2, Springer, 2007. (tásszerzők: Fontes F. A. C. C., Magni L.)
   

1. 
   Numerical method for finding the optimal time with a given accuracy. Zh. Vychisl. Mat. i Mat. Fiz., 1983. No. 1. 51-60.
   
2. 
   Hölder condition for the minimum time function of linear systems. ''System Modelling and Optimization.'' Proc. 11. IFIP Conf., ed. Thoft-Christensen, Springer, Berlin, 1984. 383-392.
   
3. 
   Receding horizon control for the stabilization of nonlinear uncertain systems described by differential inclusions. J. Math. Systems, Estimation, and Control, Vol. 6, No. 3. 1996, 363-366. (summary; full electronic manuscript = 16 pp, retrieval code: 18283)
   
4. 
   Receding horizon control via Bolza-type optimization. Systems & Control Letters, Vol. 35, 1998. 195-200.
   
5. 
   Stabilization of discrete-time interconnected systems under control constraints. IEE Proc. Control Theory Appl. Vol. 147. No. 2. 2000. pp. 137-144. (tásszerző: T. Takács).
   

Member of the editorial board of PUMA.

Member of IFAC TC Optimal Control.

Participation in the organization of several international scientific conferences.

Department of Algebra

PhD in mathematics, 1988: On the characters of finite groups

I teach at BME since 1983. I gave lectures on Mathematics B1-B4, Linear Algebra, Algebra 1-2., Finite groups, Representation theory, Algebra with computers I-II., Lie algebras, Computer algebra, Commutative algebra.

My area of research is representation theory of finite groups. I published 21 research papers, 1 lecture note and 4 system documentations so far.

1. 
   T. Breuer, L. Héthelyi, E. Horváth, Defect groups, conjugacy classes and the Robinson map, J. Algebra 279, 2004, 204-213.
   
2. 
   Central ideals and Cartan invariants of symmetric algebras, (L.Héthelyi, B. Külshammer és J. Murray társszerzőkkel), J. Algebra 293, 2005, 243--260.
   
3. 
   Cartan invariants and central ideals of group algebras, (T. Breuer, L.Héthelyi, B. Külshammer és J. Murray társszer-zőkkel), J. Algebra 296, 2006, 177-195.
   
4. 
   On one-sided stabilizers of subsets of finite groups, (K. Corrádi és L. Héthelyi társszerzőkkel), Archiv der Mathematik, Volume 86, Number 4, 2006, 295-304.
   

1. 
   GAP 3.4 Groups, algortihms and programming, (társszerzőkkel közösen) Lehrstuhl D für Mathematik, 1994.
   
2. 
   Hassan, E. Horváth, Dade’s conjecture for the simple Higman-Sims group, Groups’97 St. Andrews-Bath, London Math. Soc. Lecture Note Series 260, Cambridge UniversityPress 1999.
   
3. 
   Lineáris Algebra (jegyzet: 45021), Műegyetemi kiadó 1995.
   
4. 
   K. Corrádi, E. Horváth, Steps towards an elementary proof of Frobenius’s theorem, Communications in Algebra, 24(7), 1996, 2285-2292.
   
5. 
   N.M.Hassan, E. Horváth, Some remarks on Dade’s conjecture, Mathematica Pannonica 9/2, 1998, 181-194.
   

1992. organizing Summer School on Computer Algebra at BME

1993-96 coordinator of the TEMPUS JEP 06044 „Using computer algebra”

2000 organizing workshop with the support of the Erdos Centre titled

„Theoretical and computational methods in group theory and representation theory” co-advisor of PhD student N.M. Hassan, succesful defence in 1998.

Departmental coordinator of ERASMUS contacts with RWTH-Aachen, Jena University and the Babes-Bolyai University at Kolozsvar

Department of Analysis

CSc in mathematics, 1992: On spectral expansions of Laplace and Schrödinger operators

dr. habil., 2000, BME

Between 1984 and 88-ig I held a position at Eötvös University, since 1988 each term I was teaching at BME. During the past 20 years I taught more than 20 different subjects, in most cases as a lecturer.