Membership in the Academy and other degrees

DSc in mathematics, 1984

Széchenyi Professorial Fellowship, 2000-2003

Since 1972: Eötvös Loránd University of Budapest, Department of Algebra and Number Theory and later Department of Computer Science,

Since 1990: Budapest University of Technology and Economics, Department of Computer Science and Information Theory

Gradual and postgradual courses in analysis, linear algebra and geometry, finite mathematics, combinatorial optimization, matroid theory..

See 6, 8 and 9.

1. 
   Recski A.: Two matroidal families on the edge set of a graph, Discrete Mathematics 251 (2002) 155-162.
   
2. 
   Radics N., Recski A.: Applications of combinatorics to statics – rigidity of grids, Discrete Applied Mathematics 123 (2002) 473-485.
   
3. 
   Recski A.: Maps of matroids with applications, Discrete Mathematics 303 (2005) 175-185.
   
4. 
   Recski A., Szeszlér D.: Routing vertex-disjoint Steiner trees in a cubic grid and connections to VLSI, Discrete Applied Mathematics 155 (2007) 44-52.
   
5. 
   A. Recski, J. Szabó: On the generalization of the matroid parity problem, Graph Theory, Trends in Mathematics, Birkhaauser, 2006, 347-354.
   

1. 
   M. Iri – A. Recski: What does duality really mean? Circuit Theory and Applications 8 (1980) 317-324.
   
2. 
   Recski: A practical remark on the minimal synthesis of resisitive n-ports, IEEE Trans. Circuits and Systems CAS-29 (1982) 267-269.
   
3. 
   L. Lovász – A. Recski: Selected topics of matroid theory and its applications, Rendiconti del Circolo Matematico di palermo II 2 (1982) 171-185.
   
4. 
   Recski: Matroid theory and its applicaations in electric network theory and in statics, Springer -- Akadémiai Kiadó, 1989.
   
5. 
   Recski: Combinatorics in electrical engineering and in sttatics, Handbook in Combinatorics, Elsevier, 1995, 1911-1924.
   

Secretary general of the Janos Bolyai Mathematical Society

Member of the Science Ethics Committee of the Hungarian Academy of Sciences

Visiting professor in Denmark (1975/76), Turkey (1977), Gerrmany (1978, 1981, 1987-89, 1998/99), Japan (1978/79), Canada (1984), USA (1985, 1994/95), France (2003).

Department of Algebra

CSc, mathematics, 1987

DSc in mathematics, 1999

member of the Hungarian Academy of Sciences, 2007
5. Major Hungarian Scholarships:

Széchenyi Professorial Scholarship, 1998-2001.

I teach at BME since 1990. Earlier I gave lectures on algorithms and database systems at the School of Electrical Engineering, for informatics majors. Lately I gave lectures to students of mathematics at the School of Natural Sciences on various subjects form algebra and algorithms.

My area of research is computer science and algebra. I've published 58 research papers so far.

1. 
   Shattering news; Graphs and Combinatorics 18, (2002), 59-73. (with R. P. Anstee and A. Sali)
   
2. 
   Standard monomials for q-uniform families and a conjecture of Babai and Frankl; Central European Journal of Mathematics 1, (2003), 198 - 207. (with G. Hegedűs)
   
3. 
   Gröbner bases for complete uniform families; Journal of Algebraic Combinatorics 17, (2003), 171-180. (with G. Hegedûs) Order shattering and Wilson's theorem; Discrete Mathematics 270, (2003), 127-136. (with K. Friedl)
   
4. 
   Trie: an alternative data structure for data mining algorithms; Mathematical and Computer Modelling 38, (2003), 739--751. (with F. Bodon)
   
5. 
   On a conjecture of László Rédei; Acta Sci. Math. (Szeged) 69, (2003), 523–531.
   

I am serving on the Computer Science and Informatics Committee of the MTA. I am on the editorial board of Acta Mathematica Hungarica, Matematikai Lapok, and Alkalmazott Matematikai Lapok.

Department of Stochastics

PhD in mathematics, 1999

Mathematics courses for civil engineers, architect and informatics students; number theory courses for mathematician students.

I have been teaching since 1999.
7. Results and experience:

See 6, 8 and 9.

1. 
   Sándor, Csaba, On the number of solutions of the Diophantine equation $\sum\sp n\sb {i=1}\frac{1}{x\sb i}=1$. Period. Math. Hungar. 47 (2003), no 1-2, 215--219.
   
2. 
   Sándor, Csaba, A family of self-similar sets with overlaps. Indag. Math. (N. S) 15 (2004), 573--578.
   
3. 
   Sándor, Csaba, Non-degenerate Hilbert cubes in random sets. J. Théor, Nombres Bordeaux 19 (2007), no. 1, 249--261.
   
4. 
   Sándor, Csaba, An upper bound for Hilbert cubes. J. Combin. Theory Ser. A 114 (2007), no. 6, 1157--1159.
   
5. 
   Sándor, Csaba, Random $B\sb h$ sets and additive bases in $\Bbb Z\sb N$. Integers 7 (2007), A32, 10 pp.
   

1. 
   Sándor, Csaba, On the equation $a\sp 3+b\sp 3+c\sp 3=d\sp 3$. Period. Math. Hungar. 33 (1996), no. 2, 121—134.
   
2. 
   Sándor, Csaba, On a problem of Erdös. J. Number Theory 63 (1997) 203--210.
   
3. 
   Sándor, Csaba, A family of self-similar sets with overlaps. Indag. Math. (N. S) 15 (2004), 573--578.
   
4. 
   Sándor, Csaba, Non-degenerate Hilbert cubes in random sets. J. Théor, Nombres Bordeaux 19 (2007), no. 1, 249--261.
   
5. 
   Sándor, Csaba, Random $B\sb h$ sets and additive bases in $\Bbb Z\sb N$. Integers 7 (2007), A32, 10 pp.
   

I am a reviewer for Mathematical Reviews.

Professional connection with Technical University of Ostrava.

CURRICULUM VITAE OF Károly Simon

1. Personal data:

Birth date: 1961

Highest school degree: university diploma

Speciality: mathematician

Phone, email: 463-1101, simonk@math.bme.hu
2. Present employer (BME): Budapest University of Technology and Economics

Department of Stochastics

CSc in mathematics, 1992

Dr habi, 2002

DSc in mathematics, 2007
5. Major Hungarian Scholarships:

Széchenyi Professorial Fellowship 1999-2003

21 years teaching at technical universities. Teaching int he US and in the UK (athogether 13 courses), Teching in a high school. Teaching 5 PhD courses and MSc corses for students of mathematics major at thge BME and at the Univ. Of Washington

35 reaserch papers with 144 citations. Pleanary speaker at more than 10 international conferences.

1. 
   Y. Peres, B. Solomyak, K. Simon, Absolute continuity for random iterated function systems with overlaps. J. London Math. Soc. (2) 74 (2006) 739-756.
   
2. 
   T. Jordan, M. Pollicott, K. Simon, Hausdorff dimension for randomly perturbed self affine attractors.Communications in Math. Phys. 270 (2007), 519-544.
   
3. 
   F. Hofbauer, P. Raith, K. Simon, Hausdorff dimension for some hyperbolic attractors with overlaps and without finite Markov partition. Ergodic Theory Dynam. Systems 27 (4) (2007), 1143-1165.
   
4. 
   A.H. Fan, K. Simon, H.R. Toth, Contracting on average random IFS with repelling fixpoint. Journal of Stat. Phys. 122 (2006), no. 1, 169—193.
   
5. 
   M. Rams, K. Simon, Hausdorff and packing measure for solenoids Ergodic Theory and Dynamical Systems 23 (2003), no. 1, 273-291.
   

1. 
   Y. Peres, B. Solomyak, K. Simon, Absolute continuity for random iterated function systems with overlaps. J. London Math. Soc. (2) 74 (2006) 739-756.
   
2. 
   T. Jordan, M. Pollicott, K. Simon, Hausdorff dimension for randomly perturbed self affine attractors.Communications in Math. Phys. 270 (2007), 519-544.
   
3. 
   Simon, Károly The Hausdorff dimension of the Smale-Williams solenoid with different contraction coefficients. Proc. Amer. Math. Soc. 125 (1997), no. 4, 1221--1228.
   
4. 
   M. Policott, K. Simon, The Hausdorff dimension of $\lambda$-expansions with deleted digits. Trans. Amer. Math. Soc. 347 (1995), no. 3, 967—983.
   
5. 
   Simon, Károly The set of second iterates is nowhere dense in $C$. Proc. Amer. Math. Soc. 111 (1991), no. 4, 1141--1150.
   

Editor of the Central European Mathematical Journal. 2003-07.

Organizer of an international conference and one of the two organizers of another international conference.

CURRICULUM VITAE OF Tamás Szabados

1. Personal data:

Birth date: 1948

Highest school degree: university diploma

Speciality: electrical engineer; applied mathematician

Phone, email: 463-1101, szabados@math.bme.hu
2. Present employer (BME): Budapest University of Technology and Economics

Department of Stochastics

PhD in mathematics, 1982

Probability Theory, Stochastic Processes, Stochastic Calculus, Calculus, Real Analyis, Multivariable Calculus, Linear Algebra, Ordinary Differential Equations, Complex Analysis; BudapestUniversity of Technology and Economics, in Hungarian (1972-) and partly in English (1986-).

Calculus, Multivariable Calculus, Pre-Calculus, College Algebra, Elementary Statistics; Spokane Falls Comm. College (1991-1992).

Probability Theory, Statistical Methods; Budapest Semester in Mathematics (1996-).

Statistical Methods, Elementary Statistics; Western Maryland College Budapest (1998-1999).
7. Results and experience:

Computer simulation and pattern recognition of the electrical activation process of human heart, with the Postgraduate Medical School, Budapest, 1972-77.

Numerical solution of partial differential equations (finite difference and finite element methods for elliptic and hyperbolic equations) for the Videoton Electronics Company, 1981-88.

Software for computer aided design of university time tables, for the Technical University of Budapest, 1987-.

Image processing based on stochastic models, 1989-91.

Application of stochastic optimization for an inventory control problem, 1991-92.

Stochastic models of the immune system, with the Mathematical Research Institute of the Hungarian Academy of Sciences and the Department of Immunology, National Cancer Institute of Hungary, 1995-.
8. Selected publications (maximum 5) from the past 5 years:

1. 
   T. Szabados, B. Székely. An exponential functional of random walks. Journal of Applied Probability, 40, 413-426, 2003. MR 2004c:60099.
   
2. 
   B. Székely, T. Szabados. Strong approximation of continuous local martingales by simple random walks. Studia Scientiarum Mathematicarum Hungarica, 41, 101-126, 2004. MR2082065.
   
3. 
   T. Szabados, B. Székely. Moments of an exponential functional of random walks and permutations with given descent sets. Periodica Mathematica Hungarica, 49, 131-139, 2004. MR2092788.
   
4. 
   T. Szabados, B. Székely. An elementary approach to Brownian local time based on simple, symmetric random walks. Periodica Mathematica Hungarica, 51, 79-98, 2005. MR2180635.
   
5. 
   T. Bakács, J.N. Mehrishi, T. Szabados, L. Varga, M. Szabó and G. Tusnády. T cells survey the stability of the self: a testable hypothesis on the homeostatic role of TCR-MHC interactions. International Archives of Allergy and Immunology, 144, 171-182, 2007.
   

1. 
   T. Szabados. Goodness of fit tests in metric spaces based on balls around the sample. Statistics & Decisions, 5, 381-389, 1987. MR 88k:62080.
   
2. 
   T. Szabados. On the Glivenko-Cantelli theorem for balls in metric spaces. Studia Scientiarum Mathematicarum Hungarica, 24, 473-481, 1989. MR 92e:60002.
   
3. 
   T. Szabados. A discrete Ito's formula. In: Colloquia Mathematica Societas János Bolyai 57. Limit Theorems in Probability and Statistics, Pécs, 1989, 491-502. North-Holland, Amsterdam, 1990. MR 92i:60105.
   
4. 
   T. Szabados. An elementary introduction to the Wiener process and stochastic integrals. Studia Scientiarum Mathematicarum Hungarica, 31, 249-297, 1996. MR 96k:60212.
   
5. 
   T. Szabados. Strong approximation of fractional Brownian motion by moving averages of random walks. Stochastic Processes and their Applications, 92,.31-60, 2001. MR 2002b:60070.
   

Referee of two Hungarian mathematical journals; reviever for the Mathematical Reviews; referee for the Hungarian Scientific Research Foundation (OTKA) and the Higher Education Textbook Competition; member of the AMS and the Bernoulli Society.

Department of Geometry

PhD in mathematics

CSc in mathematics
4. Membership in the Academy and other degrees:

DSc in mathematics

Dr. habil
5. Major Hungarian Scholarships:
6. Teaching activity so far (with list of courses taught)

BME : Differencial lgeometriy 2: Matematika A1

Szegedi University: Simplectic geometry

Strasbourgi Louis Pasteur Egyetem: algera, linear algebra, matematika with Maple,geometry in 3-space, probability theory and statistics

See 6 and 8.

1. 
   Sz. Szabó: Reidemeister-mozgások a csomóelméletben. Polygon, 13 (2005), 19-34.
   
2. 
   Sz. Szabó: Nahm transform for integrable connections on the Riemann sphere. To appear in Mémoires de la Société Mathématique de France, 2008.
   
3. 
   Sz. Szabó: Transformées de Nahm et de Laplace parabolique, submitted.
   
4. 
   Sz. Szabó, A. Kürsat: Algebraic Nahm transform for parabolic Higgs bundles on P¹. Max Planck Institute for Mathematics-preprint No. 128, (2006).
   
5. 
   Sz. Szabó: The extension of a Fuchsian equation onto the complex line. To appear in Acta Scientiarum Mathematicarum, 2008.
   

Department of Differetial Equations

CSc in mathematics, 1985

Dr. habil, 2005

DSc in mathematics 2005
5. Major Hungarian Scholarships:

Széchenyi Professorial Scholarship, 2000-2003

BME (13 years): - practice hours on mathematics for engineers;

- lectures on operations research;

- lectures on probability theory;

ELTE ( 9 years) - lectures on operations research;

BME (16 years) - lectures on operations research;

- lectures on probability theory.
7. Results and experience:

Probability theory, point processes.

Numerical calculation of multivariate probability distribution functions and their application int he solution algorithms of stochastic programming problems.

Technical applications of operations research.

Reliability investigations of special networks.
8. Selected publications (maximum 5) from the past 5 years:

1. 
   Probabaility bounds given by hypercherry trees, Optimization Methods and Software, 17 (2002) 409-422, coauthor: J. Bukszár.
   
2. 
   Computing multivariate normal probabilies: A new look, Journal of Computational and Graphical Statistics, 11 (2002) 920-949, coauthors: I. Deák and H. Gassmann.
   
3. 
   New sampling techniques in variance reduction Monte Carlo simulation algorithms for calculation of Dirichlet probabilities, The Central Europian Journal of Operational Research,12 (2004) 389-403, coauthor: A. Gouda.
   
4. 
   New bounds and approximations for the probability distribution of the length of the critical path, in: Lecture Notes in Economics and Mathematical Systems, 532, Dynamic Stochastic Optimization, Proceedings of the IFIP/IIASA/GAMM-Workshop on ''Dynamic Stochastic Optimization'', held at the International Institute for Systems Analysis (IIASA), Laxenburg, Austria, March 11-14, 2002, eds. K. Marti, Y. Ermoliev and G. Pflug, Springer-Verlag, Berlin, Heidelberg, 2004, 293-320, coauthors: J. Long and A. Prékopa.
   
5. 
   Stochastic programming based PERT modeling, in: Lecture Notes in Economics and Mathematical Systems, 581, Coping with Uncertainty, Modeling and Policy Issues, Proceedings of the IFIP/IIASA/GAMM-Workshop on ''Coping with Uncertainty'', held at the International Institute for Systems Analysis (IIASA), Laxenburg, Austria, December 13-16, 2004, eds. K. Marti, Y. Ermoliev, M. Makowski and G. Pflug,. Springer-Verlag, Berlin, Heidelberg, 2006, 241-255, coauthors: A. Gouda and D. Monhor.
   

1. 
   A new multivariate gamma distribution and its fitting to empirical data, Water Resources Research, 14 (1978) 19-24, coauthor: A. Prékopa.
   
2. 
   Flood control reservoir system design using stochastic programming, Mathematical Programming Study, 9 (1978) 138-151, coauthor: A. Prékopa.
   
3. 
   On optimal regulation of a storage level with application to the water level regulation of a lake, Europian Journal of Operations Research, 3 (1979) 175-189, coauthor: A. Prékopa.
   
4. 
   Improved bounds and simulation procedures on the value of the multivariate normal proba­bility distribution function, Annals of Operations Research, 100 (2000) 85-101.
   
5. 
   Approximation of multivariate probability integrals, in: Encyclopedia of Optimization, eds. P.M. Pardalos and C.A. Floudas, Kluwer Academic Publishers, Dordrecht, 2001, Volume I. A-D, 53-59.
   

Technical editor of the Hungarian Journal: Alkalmazott Matematikai Lapok 1975-91, responsible editor 1991-2003, deputy editor in chief since 2003.

Member of the Editorial Board of the Central European Journal of Operational Research since 2002.

President of the Section of Applied Mathematics at János Bolyai Society of Mathematics since 2006.

Secretary of the Hungarian Operations research Society 1991-93, deputy president 1993-96, president 2002-04.

Member of the Operations Research Committee of Hungarian Academy of Sciences since 1987.

Committee on Stochastic Programming, Mathematical Programming Society member of the Managing Committee 1988-2001.

CURRICULUM VITAE OF Domokos SZáSZ

1. Personal data:

Birth date: 1941

Highest school degree: university diploma