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Hartung Ferenc publikációi hivatkozásokkal2008. szeptember

könyvrészlet

1. F. Hartung and J. Turi, Stability in a class of functional differential equations with state-dependent delays, in Qualitative Problems for Differential Equations and Control Theory, ed. C. Corduneanu, Word Scientific, 1995, 15-31. 1. T. Krisztin, O. Arino, The two-dimensional attractor of a differential equation with state-de-

pendent delay, J. Dynamics & Diff. Eqns., 13:3 (2001) 435-522.2. A. Domoshnitsky, M. Drakhlin, E. Litsyn, On equations with delay depending on solution, to

J. Nonlinear Analysis: Theory, Methods and Applications, 49 (2002) 689-701. (SCI)3. T. Luzyanina, K. Engelborghs, D. Roose, Numerical bifurcation analysis of differential equa-

tions with state-dependent delays, Report TW 302, March 2000, Katholieke Universiteit Leuven, Belgium, Int. J. of Bifurcation and Chaos 11:3 (2001) 737-753. (SCI)

4. M. Bartha, Stability, convergence and periodicity for equations with state-dependent delay, Ph.D. Dissertation, Bolyai Institute, University of Szeged, 2002.

5. M. Bartha, Periodic solutions for differential equations with state-dependent delay and posi-tive feedback, J. Nonlinear Analysis: Theory, Methods and Applications, 53 (2003) 839-857. (SCI)

6. R. J. La, P. Ranjan, Stability of rate control system with time-varying communication delays, Center for Satellite and Hybrid Communication Networks, University of Maryland, Techni-cal Research Report, CSHCN TR 2004-16, 2004 (www.isr.umd.edu/CSHCN).

7. P. Ranjan, R. J. La, E. H. Abed, Global stability with a state-dependent delay in rate control, in Time-delay systems 2004: a proceedings volume from the 5th IFAC Workshop, Leuven, Belgium, 8-10 September 2004, eds. W. Michiels and D. Roose, Elsevier, 2005, 269-274.

8. D. Roose, R. Szalai, Continuation and Bifurcation Analysis of Delay Differential Equations, in Numerical Continuation Methods for Dynamical Systems, Path following and boundary value problems, eds. B. Krauskopf, H. M. Osinga and J. Galán-Vioque, Springer Nether-lands, 2007, 359-399.

2. F. Hartung, T. Krisztin, H.-O. Walther, and J. Wu, Functional differential equations with state-dependent delay: theory and applications, in Handbook of Differential Equations: Ordinary Differential Equations, volume 3, edited by A. Canada, P. Drábek and A. Fonda, Elsevier, North-Holand, 2006, 435-545.1. M. Eichmann, A local Hopf bifurcation theorem for differential equations with state-depen-

dent delays, doctoral dissertation, Department of Mathematics, Justus-Liebig-University Giessen, Germany, 2006.

2. J. Arino and P. van den Driessche, Time Delays In Epidemic Models: Modeling and Numeri-cal Considerations, in Delay Differential Equations and Applications, O. Arino, M.L. Hbid and E. Ait Dads eds., NATO Science Series volume 205, Springer Netherlands, 2006, 539-578.

3. J. Terjéki and M. Bartha, On the convergence of solutions for an equation with state-depen-dent delay, Differ.Equ.Dyn.Syst.14:3-4 (2006) 195-206.

4. M.L. Hbid, E. Sánchez, R.B. De La Parra, State-dependent delays associated to threshold phe-nomena in structured population dynamics, Mathematical Models and Methods in Applied Sciences, 17:6, (2007) 877-900.

5. A.Gołaszewska and J.Turo, Existence and uniqueness for neutral equations with state depen-dent delays, Int. J. Qualitative Theory of Differential Equations and Applications, 1:1 (2007) 8-18.

6. B. Slezák, On the parameter-dependence of the solutions of functional differential equations with unbounded state-dependent delay, Int. J. Qualitative Theory of Differential Equations

and Applications 1:1 (2007) 88-114.7. Tamás Insperger, David A.W. Barton, Gábor Stépán, Criticality of Hopf bifurcation in state-

dependent delay model of turning processes, International Journal of Non-Linear Mechanics, Volume 43, Issue 2, March 2008, Pages 140-149. (SCI)

8. Alexander V. Rezounenko, Differential equations with discrete state-dependent delay: uniqueness and well-posedness in the space of continuous functions, http://arxiv.org/pdf/0801.4715

9. Qingwen Hu, Differential Equations with State-dependent Delay: Global Hopf Bifurcation and Smoothness Dependence on Parameters, PhD Dissertation, York University, Toronto, Canada, August 2008.

10.Alfredo Bellen, Nicola Guglielmi, Solving neutral delay differential equations with state-de-pendent delays, to appear in Journal of Computational and Applied Mathematics, (2008), doi:10.1016/j.cam.2008.04.015

11.E. Hernández, M. A. McKibben, Hernán R. Henríquez, Existence Results for Partial Neutral Functional Differential Equations with State Dependent Delay, to appear in Mathematical and Computer Modelling, (2008), doi:10.1016/j.mcm.2008.07.011

referált nemzetközi folyóiratcikk

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Diff. Equations Dyn. Systems, 7:2 (1999) 187-220.36.C. T. H. Baker, G. A. Bocharov, F. A. Rihan, A report on the use of delay differential equa-

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40.K. Engelborghs, T. Luzyanina, G. Samaey, DDE-BIFTOOL v. 2.00: a Matlab package for bi-furcation analysis of delay differential equations, Report TW 330, October 2001, Katholieke Universiteit Leuven, Belgium.

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42.John Mallet-Paret & Roger D. Nussbaum, Boundary Layer Phenomena for Differential-Delay Equations with State Dependent Time Lags: III, Lefschetz Center for Dynamical Systems Technical Report Series 02, Brown University, February, 2002. J. Diff. Eqns 190:2 (2003) 364-406. (SCI)

43.M. Bartha, Stability, convergence and periodicity for equations with state-dependent delay, Ph.D. Dissertation, Bolyai Institute, University of Szeged, 2002.

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47.Christopher T.H. Baker, Gennadii A. Bocharov, Christopher A.H. Paul & Fathalla A. Rihan, Models with Delays for Cell Population Dynamics: Identification, Selection and Analysis. Part I: Computational Modelling with Functional Differential Equations: Identification, Se-lection, and Sensitivity, Numerical Analysis Report No. 425, Manchester Centre for Compu-tational Mathematics, University of Manchester, February 2003.

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50.H. Özbay, Robust control of infinite dimensional systems: theory and applications, in the Pro-ceedings of 17th International Symposium on Mathematical Theory of Networks and Sys-tems, Kyoto, Japan, July 24-28, 2006 (http://www-ics.acs.i.kyoto-u.ac.jp/mtns06/slides/ho-full3.pdf)

51.A. Gołaszewska, J. Turo, Carathéodory solutions to quasi-linear hyperbolic systems of partial differential equations with state dependent delays, Functional Differential Equations 14:2-4 (2007) 257-278.

52.D. Roose, R. Szalai, Continuation and Bifurcation Analysis of Delay Differential Equations, in Numerical Continuation Methods for Dynamical Systems, Path following and boundary value problems, eds. B. Krauskopf, H. M. Osinga and J. Galán-Vioque, Springer Nether-lands, 2007, 359-399.

53.B. Slezák, On the parameter-dependence of the solutions of functional differential equations with unbounded state-dependent delay, Int. J. Qualitative Theory of Differential Equations and Applications, 1:1 (2007) 88-114.

54.Tamás Insperger, David A.W. Barton, Gábor Stépán, Criticality of Hopf bifurcation in state-dependent delay model of turning processes, International Journal of Non-Linear Mechanics, Volume 43, Issue 2, March 2008, Pages 140-149. (SCI)


4. F. Hartung, T. L. Herdman and J. Turi, On existence, uniqueness and numerical approximation for neutral equations with state-dependent delays, Applied Numerical Mathematics, 24:2-3 (1997) 393-409. (SCI)56.M. Bartha, On stability properties for neutral differential equations with state-dependent delay,

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Volterra type, Acta Numerica 13 (2004) 55-145.60.H. Brunner, Collocation methods for Volterra integral and related functional equations, Cam-

bridge Monographs on Applied and Computational Mathematics, Cambridge University Press, 2004.

61.Z. Kamont, First order partial functional differential equations with state dependent delays, Nonlinear Studies, 12:2 (2005) 135-157.

62.C. T. H: Baker, A. H. Paul, Discontinuous solutions of neutral delay differential equations, Appl. Numer. Math, 56 (2006) 284-304. (SCI)

63.A. Gołaszewska, J. Turo, Carathéodory solutions to quasi-linear hyperbolic systems of partial differential equations with state dependent delays, Functional Differential Equations 14:2-4 (2007) 257-278.

64.H. Brunner, High-order collocation methods for singular Volterra functional equations of neu-tral type, Applied Numerical Mathematics, 57:5-7 (2007), 533-548. (SCI)

65.A.Gołaszewska and J.Turo, Existence and uniqueness for neutral equations with state depen-dent delays, Int. J. Qualitative Theory of Differential Equations and Applications, 1:1 (2007) 8-18.

66.B. Slezák, On the parameter-dependence of the solutions of functional differential equations with unbounded state-dependent delay, Int. J. Qualitative Theory of Differential Equations and Applications, 1:1 (2007) 88-114.

67.F. Wu, XR Mao, Numerical solutions of neutral stochastic functional differential equations, Siam Journal on Numerical Analysis, 46:4 (2007) 1821-1841. (SCI)



5. F. Hartung and J. Turi, Identification of parameters in delay equations with state-dependent delays, J. Nonlinear Analysis: Theory, Methods and Applications, 29:11 (1997) 1303-1318. (SCI)70.Kimberly Drake, Analysis of numerical methods for fault detection and model identification

in linear systems with delay, PhD Dissertation, North Carolina State University, Raleigh, NC, USA, 2003.

71.E. Hernández, A. Prokopczyk, L. Ladeira, A note on partial functional differential equations with state-dependent delay, Nonlinear Analysis: Real World Applications, 7:4 (2006) 510-519. (SCI).

72.E. Hernández, Existence of solutions for a second order abstract functional differential equa-tion with state-dependent delay, Electronic Journal of Differential Equations, 21 (2007) 1-10.

73.E. Hernández, M. A. McKibben, On state-dependent delay partial neutral functional-differen-tial equations, Appl. Math. Comput. 186:1 (2007) 294-301. (SCI)

74.Eduardo Hernández M, Sueli Tanaka Aki, Rathinasamy Sakthivel, Existence results for impul-sive evolution differential equations with state-dependent delay, Electronic J. Differential Equations, Vol. 2008(2008), No. 28, pp. 1-11.



6. F. Hartung, On differentiability of solutions with respect to parameters in a class of functional differential equations, Functional Differential Equations, 4:1-2 (1997) 65-79.77.B. Slezák, On the parameter-dependence of the solutions of functional differential equations

with unbounded state-dependent delay, Int. J. Qualitative Theory of Differential Equations and Applications, 1:1 (2007) 88-114.

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79.A. Bátkai, Second order Cauchy problems with damping and delay, PhD Dissertation, Eber-hard-Karls-Universität Tübingen, 2000.

80.A. Bátkai, On the stability of linear partial differential equations with delay, Tübinger Berichte zur Funktionalanalysis, Matematisches Institut Eberhard-Karls-Universität, Tübingen, Vol 9 (2000) 47-56.

81.R. Schnaubelt, Parabolic evolution equations with asymptotically autonomous delay, Reports of the Institute of Analysis No. 3 (2001), Martin-Luter-Universität Halle-Wittenberg. Trans. Amer. Math. Soc., Posted 2003; Trans. Amer. Math. Soc. 356:9 (2004) 3517-3543. (SCI)

82.G. Gühring, F. Räbiger, and R. Schnaubelt, A characteristic equation for non-autonomous par-tial functional differential equations, Tübinger Berichte zur Funktionalanalysis, Matematis-ches Institut Eberhard-Karls-Universität, Tübingen, Vol 9 (2000) 188-205; and J. Differen-tial Equations, 181 (2002) 439-462. (SCI)

83.A. Bátkai, Hyperbolicity of linear partial differential equations with delay, Integr Equat Oper Th 44:4 (2002) 383-396. (SCI)

84.Insperger, T., Stability analysis of periodic delay-differential equations modeling machine tool chatter, Ph.D. Dissertation, Budapesti Műszaki és Gazdaságtudományi Egyetem, Gépészmérnöki Kar, 2002.

85.S. R. Bernfeld, C. Corduneanu, A. O. Ignatyev, On the stability of invariant sets of functional differential equations, Nonlinear Analysis 55 (2003) 641—656. (SCI)

86.A. Bátkai and B. Farkas, On the effect of small delays to the stability of feedback systems, Progress in Nonlinear Differential Equations, 55 (2003), 83-94.

87.A. Bátkai, S. Piazzera, Semigroups for delay equations, International Minicourse-Workshop "Interplay between (C0)-semigroups and PDEs: theory and applications" (S. Romanelli, R.-M. Mininni, S. Lucente eds.), Arcane Editrice, Roma, 2004, pp. 1-54.

88.H. Brunner, The numerical analysis of functional integral and integro-differential equations of Volterra type, Acta Numerica 13 (2004) 55-145.

89.H. Brunner, Collocation methods for Volterra integral and related functional equations, Cam-bridge Monographs on Applied and Computational Mathematics, Cambridge University Press, 2004.

90.A. Bátkai, S. Piazzera: Semigroups for Delay Equations. Research Notes in Mathematics. A K Peters LTD, 2005.

91.C. Corduneanu, A. O. Ignatyev, Stability of invariant sets of functional differential equations with delay, Nonlinear Funct. Anal. Appl., 10:1 (2005) 11-24.

92.L. Berezansky, E. Braverman, On stability of some linear and nonlinear delay differential equations, J. Math. Anal. Appl., 314:2 (2006) 391-411. (SCI)

93.L. Berezansky, E. Braverman, On exponential stability of linear differential equations with several delays, J. Math. Anal. Appl., 314:2 (2006) 1336-1355. (SCI)

94.L. Berezansky, E. Braverman, Explicit exponential stability conditions for linear differential equations with several delays, J. Math. Anal. Appl., 332 (2007) 246-264.

95.H. Özbay, Robust control of infinite dimensional systems: theory and applications, in the Pro-ceedings of 17th International Symposium on Mathematical Theory of Networks and Sys-tems, Kyoto, Japan, July 24-28, 2006 (http://www-ics.acs.i.kyoto-u.ac.jp/mtns06/slides/ho-full3.pdf)

96.Leonid Berezansky, Elena Braverman, New Stability Conditions for Linear Differential Equa-tions with Several Delays, http://arxiv.org/pdf/0806.3234v1

9. F. Hartung, T. L. Herdman and J. Turi, Parameter identifications in classes of neutral differential equations with state-dependent delays, J. Nonlinear Analysis: Theory, Methods and Applications, 39:3 (2000) 305-325. (SCI)97.M. Bartha, Stability, convergence and periodicity for equations with state-dependent delay,

Ph.D. Dissertation, Bolyai Institute, University of Szeged, 2002.98.E. Hernández, A. Prokopczyk, L. Ladeira, A note on partial functional differential equations

with state-dependent delay, Nonlinear Analysis: Real World Applications, 7:4 (2006) 510-519. (SCI).

99.Hernandez E, Pierri M, Goncalves G, Existence results for an impulsive abstract partial differ-ential equation with state-dependent delay, Computers & Mathematics with Applications, 52

(3-4): 411-420 (2006) (SCI)100. E. Hernández, Existence of solutions for a second order abstract functional differential equa-

tion with state-dependent delay, Electronic Journal of Differential Equations, 21 (2007) 1-10.101. E. Hernández, M. A. McKibben, On state-dependent delay partial neutral functional-differ-

ential equations, Appl. Math. Comput. 186:1 (2007) 294-301. (SCI)102. A. Anguraj; M. Mallika Arjunan; Hernández M. Eduardo, Existence results for an impulsive

neutral functional differential equation with state-dependent delay, Applicable Analysis, 86:7 (2007) 861-872. (SCI)

103. A.Gołaszewska and J.Turo, Existence and uniqueness for neutral equations with state depen-dent delays, Int. J. Qualitative Theory of Differential Equations and Applications, 1:1 (2007) 8-18.

104. Eduardo Hernández M, Sueli Tanaka Aki, Rathinasamy Sakthivel, Existence results for im-pulsive evolution differential equations with state-dependent delay, Electronic J. Differential Equations, Vol. 2008(2008), No. 28, pp. 1-11.


106. E. Hernández, M. A. McKibben, Hernán R. Henríquez, Existence Results for Partial Neutral Functional Differential Equations with State Dependent Delay, to appear in Mathematical and Computer Modelling, (2008), doi:10.1016/j.mcm.2008.07.011

10. I. Győri and F. Hartung, On the exponential stability of a state-dependent delay equation, Acta Sci. Math. (Szeged), 66 (2000) 87-100. 107. T. Krisztin, O. Arino, The two-dimensional attractor of a differential equation with state-de-

pendent delay, J. Dynamics & Diff. Eqns., 13:3 (2001) 435-522.108. Domoshnitsky, M. Drakhlin, E. Litsyn, On equations with delay depending on solution, J.

Nonlinear Analysis: Theory, Methods and Applications, 49 (2002) 689-701. (SCI)109. John Mallet-Paret & Roger D. Nussbaum, Boundary Layer Phenomena for Differential-De-

lay Equations with State Dependent Time Lags: III, Lefschetz Center for Dynamical Systems Technical Report Series 02, Brown University, February, 2002. J. Diff. Eqns 190:2 (2003) 364-406. (SCI)

110. T. Insperger, G. Stepan, J. Turi, State-dependent delay model for regenerative cutting pro-cesses, Fifth EUROMECH Nonlinear Dynamics Conference, ENOC 2005, Eindhoven, The Netherlands (2005), pp. 1124-1129.

111. T. Insperger, G. Stepan, J. Turi, State-dependent delay in regenerative turning processes, Nonlinear Dynamics, 47:1-3 (2007) 275-283. (SCI)

112. Tamás Insperger, David A.W. Barton, Gábor Stépán, Criticality of Hopf bifurcation in state-dependent delay model of turning processes, International Journal of Non-Linear Mechanics, Volume 43, Issue 2, March 2008, Pages 140-149. (SCI)


11. I. Győri and F. Hartung, Stability in delay perturbed differential and difference equations, In Topics in Functional Differential and Difference Equations, Fields Institute Communications, Vol. 29 (2001) 181-194. 114. R. Schnaubelt, Well-posedness and asymptotic behaviour of non-autonomous linear evolu-

tion equations, Tübinger Berichte zur Funktionalanalysis, Matematisches Institut Eberhard-Karls-Universität, Tübingen, 2001; also in Evolution Equations, Progress in Nonlinear Dif-ferential Equations and Their Applications, Vol. 50: Semigroups and Functional Analysis, eds. B. Terreni, A. Lorenzi and B. Ruf, Birkhäuser, 2002, 311-338.

115. S. R. Bernfeld, C. Corduneanu, A. O. Ignatyev, On the stability of invariant sets of func-tional differential equations, Nonlinear Analysis 55 (2003) 641—656. (SCI)

116. V. Tkachenko, S. Trofimchuk, Global stability in difference equations satisfying the general-ized Yorke condition, J. Mathematical Analysis Applications, 303:1 (2005) 173-187. (SCI)

117. L. Berezansky, E. Braverman, On exponential dichotomy, Bohl-Perron type theorems and stability of difference equations, J. Math. Anal. Appl., 304 (2005) 511-530. (SCI)

118. L. Berezansky, E. Braverman, E. Liz, Sufficient conditions for the global stability of nonau-tonomous higher order difference equations, J. Difference Equations and Applications, 11:9 (2005) 785-798.

119. C. Corduneanu, A. O. Ignatyev, Stability of invariant sets of functional differential equations with delay, Nonlinear Funct. Anal. Appl., 10:1 (2005) 11-24.

120. L. Berezansky, E. Braverman, On stability of some linear and nonlinear delay differential equations, J. Math. Anal. Appl., 314:2 (2006) 391-411. (SCI)

121. L. Berezansky, E. Braverman, On exponential stability of linear differential equations with several delays, J. Math. Anal. Appl., 314:2 (2006) 1336-1355. (SCI)

122. Y. Muroya, A global stability criterion in nonautonomous delay differential equations, J. Math. Anal. Appl, 326:1 (2007) 209-227. (SCI)

123. X. H. Tang and Zhiyuan Jiang, Asymptotic behavior of Volterra difference equation, Journal of Difference Equations and Applications, 13:1 (2007) 25-40.

124. L. Berezansky, E. Braverman, Explicit exponential stability conditions for linear differential equations with several delays, J. Math. Anal. Appl., 332 (2007) 246-264.

125. M. M. Kipnis, D. A. Komissarova, A note on explicit stability conditions for autonomous higher order difference equations, J. Difference Equations and Applications, 13:5 (2007) 457-461.

126. Leonid Berezansky, Elena Braverman, New Stability Conditions for Linear Differential Equations with Several Delays, http://arxiv.org/pdf/0806.3234v1

127. A. Yu. Kulikov and V. V. Malygina, Stability of nonautonomous difference equations with several delays, Russian Mathematics (Iz VUZ), 52:3 (2008) 15-23.

128. E. Liz, Some recent global stability results for higher order difference equations, to appear in the proceedings of International Conference on Difference Equations, Special Functions and Applications, Munich, July, 2005, World Scientific Publishing, Singapore. (http://www.dma.uvigo.es/~eliz/Conferences.html)

129. Yoshiaki Muroya, Emiko Ishiwata, Stability for a class of difference equations, to appear in Journal of Computational and Applied Mathematics, (2008), doi:10.1016/j.cam.2008.03.028

12. I. Győri and F. Hartung, Preservation of stability in a linear neutral differential equation under delay perturbations, Dynamic Systems and Applications, 10 (2001) 225-242. 130. R. Schnaubelt, Well-posedness and asymptotic behaviour of non-autonomous linear evolu-

tion equations, Tübinger Berichte zur Funktionalanalysis, Matematisches Institut Eberhard-Karls-Universität, Tübingen, 2001; also in Evolution Equations, Progress in Nonlinear Dif-ferential Equations and Their Applications, Vol. 50: Semigroups and Functional Analysis, eds. B. Terreni, A. Lorenzi and B. Ruf, Birkhäuser, 2002, 311-338.

131. Feng Wang, Asymptotic Stability for Neutral Systems With Multiple Unbounded Delays, Journal of Inner Mongolia Normal University (Natural Science Edition), 33:4 (2004) 357-360.

132. F. Wang, Exponential asymptotic stability for nonlinear neutral systems with multiple de-lays, Nonlinear Analysis: Real World Applications, 8:1 (2007) 312-322. (SCI)

133. Y. M. Dib, M. R. Maroun, and Y. N. Raffoul, Periodicity and stability in neutral nonlinear differential equations with functional delay, Electronic Journal of Differential Equations, vol 2005, no. 142 (2005) 1-11.

134. M. N. Islam, Y. Raffoul, Periodic solutions of neutral nonlinear system of differential equa-tions with functional delay, J. Math. Anal. Appl. 331:2 (2007) 1175-1186.

13. F. Hartung, Parameter estimation by quasilinearization in functional differential equations with state-dependent delays, J. Nonlinear Analysis: Theory, Methods and Applications, 47:7 (2001) 4557-4566. (SCI)135. E. Hernández, A. Prokopczyk, L. Ladeira, A note on partial functional differential equations

with state-dependent delay, Nonlinear Analysis: Real World Applications, 7:4 (2006) 510-519. (SCI).

136. E. Hernández, Existence of solutions for a second order abstract functional differential equa-tion with state-dependent delay, Electronic Journal of Differential Equations, 21 (2007) 1-10.

137. E. Hernández, M. A. McKibben, On state-dependent delay partial neutral functional-differ-ential equations, Appl. Math. Comput. 186:1 (2007) 294-301. (SCI)

138. A. Anguraj; M. Mallika Arjunan; Hernández M. Eduardo, Existence results for an impulsive neutral functional differential equation with state-dependent delay, Applicable Analysis, 86:7 (2007) 861-872. (SCI)



14. I. Győri and F. Hartung, Numerical approximation of neutral differential equations on infinite interval, J. Difference Eqns Appl., 8:11 (2002) 983-999. (SCI)141. H. Brunner, The numerical analysis of functional integral and integro-differential equations

of Volterra type, Acta Numerica 13 (2004) 55-145.142. H. Brunner, Collocation methods for Volterra integral and related functional equations,

Cambridge Monographs on Applied and Computational Mathematics, Cambridge University Press, 2004.

15. I. Győri and F. Hartung, On equi-stability with respect to parameters in functional differential equations, Nonlinear Functional Analysis and Applications, 7:3 (2002) 329-351.143. Becker, Leigh C.; Burton, T. A., Stability, fixed points and inverses of delays. Proc. Roy.

Soc. Edinburgh Sect. A 136:2 (2006), 245--275.16. I. Győri and F. Hartung, Stability analysis of a single neuron model with delay, J.

Computational and Applied Mathematics, 157:1 (2003) 73-92. (SCI)144. S. Xu, Y. Chu, J. Lu, New results on global exponential stability of recurrent neural net-

works with time-varying delays, Physics Letters A, 352:4-5 (2006) 371-379. (SCI)145. C. Y. Lu, A delay-range-dependent approach to global robust stability for discrete-time un-

certain recurrent neural networks with interval time-varying delay, Proceedings of the Insti-tution of Mechanical Engineers. Part I: Journal of Systems and Control Engineering, Volume 221, Issue 8, 2007, Pages 1123-1132. (SCI)

146. Hassan A. El-Morshedy, and B. M. El-Matary, Oscillation and global asymptotic stability of a neuronic equation with two delays, E. J. Qualitative Theory of Diff. Equ., No. 6. (2008), pp. 1-21.

147. Chien-Yu Lu, Wen-Jye Shyr, Chin-Wen Liao and Hsun-Heng Tsai, Delay-Range-Dependent Global Robust Stability of Discrete-Time Uncertain Recurrent Neural Networks with Inter-val Time-Varying Delay, to appear in the Proceedings of International Conference on Neu-ral Information Processing

17. F. Hartung, Linearized stability in periodic functional differential equations with state-dependent delays, J. Computational and Applied Mathematics 174:2 (2005) 201-211. (SCI)148. T. Krisztin, A local unstable manifold for differential equations with state-dependent delay,

Discrete and Continuous Dynamical Systems, 9:4 (2003) 993-1028. (SCI)149. T. Insperger, G. Stepan, J. Turi, State-dependent delay model for regenerative cutting pro-

cesses, Fifth EUROMECH Nonlinear Dynamics Conference, ENOC 2005, Eindhoven, The Netherlands (2005), pp. 1124-1129.

150. E. Hernández, A. Prokopczyk, L. Ladeira, A note on partial functional differential equations with state-dependent delay, Nonlinear Analysis: Real World Applications, 7:4 (2006) 510-519. (SCI).

151. V.N. Phat, P. Niamsup, Stability of linear time-varying delay systems and applications to control problems, Journal of Computational and Applied Mathematics 194:2 (2006) 343-356. (SCI)

152. Hernandez E, Pierri M, Goncalves G, Existence results for an impulsive abstract partial dif-ferential equation with state-dependent delay, Computers & Mathematics With Applications, 52 (3-4): 411-420 (2006) (SCI)

153. T. Insperger, G. Stepan, J. Turi, State-dependent delay in regenerative turning processes, Nonlinear Dynamics, 47:1-3 (2007) 275-283. (SCI)

154. E. Hernández, Existence of solutions for a second order abstract functional differential equa-tion with state-dependent delay, Electronic Journal of Differential Equations, 21 (2007) 1-10.

155. T. Richard, C. Germay, E. Detournay, A simplified model to explore the root cause of stick–slip vibrations in drilling systems with drag bits, J. Sound & Vibration 305:3 (2007) 432-456. (SCI)

156. Tamás Insperger, David A.W. Barton, Gábor Stépán, Criticality of Hopf bifurcation in state-dependent delay model of turning processes, International Journal of Non-Linear Mechanics, Volume 43, Issue 2, March 2008, Pages 140-149. (SCI)

157. Eduardo Hernández M, Sueli Tanaka Aki, Rathinasamy Sakthivel, Existence results for im-pulsive evolution differential equations with state-dependent delay, Electronic J. Differential Equations, Vol. 2008(2008), No. 28, pp. 1-11.



18. I. Győri, F. Hartung, Fundamental solution and asymptotic stability of linear delay equations, Dyn. Contin. Discrete Impuls. Syst., 13:2 (2006) 261-288. (SCI)160. A. Domoshnitsky, Nonoscillation of one of the components of the solution vector, Proceed-

ings of Conference on Differential and Difference Equations and Applications, eds. R. P. Agarwal and K. Perera, Hindawi Publishing Corporation, New York (2006) 363-372.

161. L. Idels, M. Kipnis, Stability Criteria for a Nonautonomous Nonlinear System with Delay, to appear in Applied Mathematical Modelling, (2008) doi:10.1016/j.apm.2008.06.005

19. F. Hartung, T. Insperger, G. Stépán, J. Turi, Approximate stability charts for milling processes under semi-discretization, Applied Mathematics and Computation, 174:1 (2006) 51-73. (SCI)162. Nolwenn Corduan, Study of vibratory behaviour of thin walled parts in finishing milling op-

erations: application on blades of high pressure aeronautical turbo compressor, PhD disserta-tion, Laboratoire Bourguignon des Matériaux et Procédés, ENSAM, CER de Paris, 2006

163. Q. Song, X. Ai, Y. Wan, Y. Pan, Influence of tool helix angle on stability in high-speed milling process, Transactions of Nanjing University of Aeronautics and Astronautics, Vol-ume 25, Issue 1, March 2008, Pages 18-25.

164. Song Qinghua, Ai Xing, Wan Yi, Pan Yongzhi, Influence of tool helix angle on stability in high-speed milling process, Transactions of Nanjing University of Aeronautics and Astro-nautics, 25:1 (2008) 18-25.

165. Song Qinghua, Ai Xing, Yu Shuiqing, Research on Stability and Surface Finish in High-speed Milling Process, Manufacturing Technology & Machine Tool, 4 (2008) 40-43.

166. N.D. Simsa, B. Mann, S. Huyanan, Analytical prediction of chatter stability for variable pitch and variable helix milling tools, Journal of Sound and Vibration, 317:3-5 (2008) 664-686.


20. F. Hartung, On differentiability of solutions with respect to parameters in neutral differential equations with state-dependent delays, J. Math. Anal. Appl., 324:1 (2006) 504-524. (SCI)168. Alfredo Bellen, Nicola Guglielmi, Solving neutral delay differential equations with state-de-

pendent delays, to appear in Journal of Computational and Applied Mathematics, (2008),

doi:10.1016/j.cam.2008.04.01521. I. Győri, F. Hartung, Exponential Stability of a State-Dependent Delay System, Discrete

and Continuous Dynamical Systems - Series A, 18:4 (2007) 773-791. (SCI)22. I. Győri, F. Hartung, Stability results for Cohen-Grossberg neural networks with delays,

Int. J. Qualitative Theory of Differential Equations and Applications, 1:2 (2007) 142-156.23. I. Győri, F. Hartung, On Numerical Approximation using Differential Equations with

Piecewise-Constant Arguments, Periodica Mathematica Hungarica, Vol. 56(1) (2008) 55-69, DOI: 10.1007/s10998-008-5055-5.

24. F. Hartung, Linearized Stability for a Class of Neutral Functional Differential Equations with State-Dependent Delays, J. Nonlinear Analysis: Theory, Methods and Applications, 69 (2008) 1629–1643.

konferenciakiadvány

1. I. Győri, F. Hartung and J. Turi, Stability in delay equations with perturbed time lags, Proceedings of the 32nd IEEE CDC, San Antonio, Texas, USA, 1993, 3829-3830. 169. S. I. Niculescu, Delay effects on stability, Lecture Notes in Control and Information Sciences

269, Springer, 2001.170. Kharitonov VL, Niculescu SI, On the stability linear systems with uncertain delay, Proceed-

ings of the American Control Conference, Volume 3, 2002, Pages 2216-2220.171. Kharitonov VL, Niculescu SI, On the stability linear systems with uncertain delay, IEEE

Transactions on Automatic Control, 48:1 (2003) 127-132. (SCI)172. Veronica-Ana Ilea, Functional differential equations of mixed type, PhD Dissertation,

Babes-Bolyai University of Cluj-Napoca, 2005.2. F. Hartung, T. L. Herdman and J. Turi, Identification of parameters in hereditary systems:

a numerical study, Proceedings of the 3rd IEEE Mediterranean Symposium on New Directions in Control and Automation, Cyprus, July, 1995, 291-298.

3. F. Hartung, T. L. Herdman and J. Turi, Identification of parameters in hereditary systems, Proceedings of ASME Fifteenth Biennial Conference on Mechanical Vibration and Noise, Boston, Massachusetts, September 1995, DE-Vol. 84-3, 1995 Design Engineering Technical Conferences, Vol 3 - Part C, ASME 1995, 1061-1066.

4. I. Győri, F. Hartung and J. Turi, On the effects of delay perturbations on the stability of delay difference equations, Proceedings of the First International Conference on Difference Equations, San Antonio, Texas, May 1994, eds. S. N. Elaydi, J. R. Graef, G. Ladas and A. C. Peterson, Gordon and Breach, 1995, 237-253.

5. I. Győri, F. Hartung and J. Turi, On numerical solutions for a class of nonlinear delay equations with time- and state-dependent delays, Proceedings of the World Congress of Nonlinear Analysts, Tampa, Florida, August 1992, Walter de Gruyter, Berlin, New York, 1996, 1391-1402. 173. Kollar, L.E., Numerical stability analysis of a respiratory control system model, MS Theisis,

Univ.of Texas at Dallas, Dallas, TX, USA, May 2002. 174. D. Ghosh, P. Saha, A. Roy Chowdhury, On syncronization of a forced delay dynamical sys-

tem via the Galerkin approximation, Communication in Nonlinear Science and Numerical Simulation, 12 (2007) 928-941.

6. F. Hartung and J. Turi, Linearized stability in functional-differential equations with state-dependent delays, Proceedings of the conference Dynamical Systems and Differential Equations, added volume of Discrete and Continuous Dynamical Systems, 2000, 416-425. 175. T. Luzyanina, K. Engelborghs, Computing Floquet multipliers for functional differential

equations, Int. J. Bifurcation and Chaos, 12:12 (2002) 2977-2989. (SCI)176. A. Gołaszewska, J. Turo, Carathéodory solutions to quasi-linear hyperbolic systems of par-

tial differential equations with state dependent delays, Functional Differential Equations

14:2-4 (2007) 257-278.177. Tamás Insperger, David A.W. Barton, Gábor Stépán, Criticality of Hopf bifurcation in state-

dependent delay model of turning processes, International Journal of Non-Linear Mechanics, Volume 43, Issue 2, March 2008, Pages 140-149. (SCI)


7. I. Győri and F. Hartung, On stability of neural networks with delays, Proceedings of the conference Science, Education and Society, Žilina, Slovak Republic, September 17-19, 2003, Section No. 7., Mathematics in Interdisciplinary Context, University of Žilina, 2003, 15-18.

8. I. Győri, F. Hartung, Stability Results for Cellular Neural Networks with Delays, Proc. 7'th Colloq. Qual. Theory Differ. Equ., Electr. J. Qual. Theor. Diff. Equ, 12 (2004) 1-14. 179. M Boroushaki, MB Ghofrani, C Lucas, Simulation of Nuclear Reactor Core Kinetics Using

Multilayer 3-D Cellular Neural Networks, IEEE Transactions On Nuclear Science, 52:3 (2005) 719-728.

180. Wu-Hua Chen and Xiaomei Lu, New delay-dependent exponential stability criteria for neu-ral networks with variable delays, Physics Letters A, 351:1-2 (2006) 53-58.

181. Y. Liu, Z. You and L. Cao, On the almost periodic solution of generalized Hopfield neural networks with time-varying delay, Neurocomputing, 69 (2006) 1760-1767.

182. W.-H. Chen, W. X. Zheng, A study of complete stability for delayed cellular neural net-works, Proceedings - IEEE International Symposium on Circuits and Systems, 2006, Article number 1693318, Pages 3249-3252.

183. Lijuan Zhang, Ligeng Si, Existence and global attractivity of almost periodic solution for DCNNs with time-varying coefficients, Computers and Mathematics with Applications, 55 (2008) 1887-1894.

9. F. Hartung and J. Turi, Identification of parameters in neutral functional differential equations with state-dependent delays, Proceedings of 44th IEEE Conference on Decision and Control and European Control Conference ECC 2005, Seville, (Spain). 12-15 December 2005, 5239-5244.

10. T. Insperger, G. Stépán, F. Hartung, J. Turi, State dependent regenerative delay in milling processes, Proceedings of IDETC 2005, 2005 ASME International Design Engineering Technical Conferences, Long Beach, California, USA, September 24-28, 2005.184. Long, X.H., Balachandran, B., Mann, B.P., Dynamics of milling processes with variable

time delays, Nonlinear Dynamics, 47:1-3 (2007) 49-63.185. Xinhua Long, Loss of contact and time delay dynamics of milling processes, PhD Disserta-

tion, University of Maryland, College Park, MD, USA, 2006. (https://drum.umd.edu/dspace/bitstream/1903/3421/1/umi-umd-3237.pdf)

186. S. A. Voronov, A. M. Gouskov, A. S. Kvashnin, E. A. Bucher, S. C. Sinha, Influence of tor-sional motion on the axial vibrations of a drilling tool, Journal of Computational and Nonlin-ear Dynamics, 2 (2007) 58-64.

187. R.P.H. Faassen, N. van de Wouw, J.A.J. Oosterling, H. Nijmeijer, An Improved Tool Path Model Including Periodic Delay for Chatter Prediction in Milling, Journal of Computational and Nonlinear Dynamics, 2:2 (2007),167-179.

188. A. Verdugo and R. H. Rand, Delay differential equations in the dynamics of gene copying, Proc. of 2007 ASME International Design Engineering Technical Conferences, Sept 4-7, 2007, Las Vegas, Nevada, USA, DETC2007 5 PART A, pp. 681-686.

189. R. Faasen, Chatter prediction and control of high-speed milling: modelling and experiment, PhD Dissertation, Technische Universiteit Eindhoven, Eindhoven, The Netherlands, 2007.

190. Luciano Vela-Martínez, Juan Carlos Jáuregui-Correa, Eduardo Rubio-Cerda, Gilberto Her-rera-Ruiz, Alejandro Lozano-Guzmán, Analysis of compliance between the cutting tool and the workpiece on the stability of a turning process, International Journal of Machine Tools & Manufacture 48 (2008) 1054–1062.

Egyéb publikációk

1. Karsai J., Forczek E., Hartung F., A SZOTE számítógépes központi klinikai információs rendszere. MEDICOMP '90. Számítástechnikai és Kibernetikai Módszerek Alkalmazása az Orvostudományban és a Biológiában, 15. Kollokvium. Szeged, 1990, Ed.: Asztalos Tibor, Eller József, Győri István (Szeged, 1990. SZOTE) 169-175.

2. Pavelka Z., Hartung F., Karsai J.,The PDP-PC mailing system at SZOTE (poster, in Hungarian), Proceedings of the 15th Colloquium on Computing and Cybernetical Methods in Medicine and Biology, 1990.

3. Hartung F., Karsai J., Tordai M., Barna I., The central patient archive at SZOTE (poster, in Hungarian), Proceedings of the 15th Colloquium on Computing and Cybernetical Methods in Medicine and Biology, 1990.

4. Németh János, Hartung Ferenc, Deák Andrea, Forczek Erzsébet, Számítógépes ambuláns betegnyilvántartó rendszer. Szemészet, 129; 115-117, 1992.

5. I. Győri, F. Hartung and J. Turi, Approximation of functional differential equations with time- and state-dependent delays by equations with piecewise constant arguments, Univ. of Minnesota, USA, IMA Preprint Series #1130, 1993. 191. T. Insperger, G. Stépan, Stability analysis of turning with periodic spindle speed modulation

via semi-discretization, J. Vibration and Control 10:12 (2004) 1835-1855. (SCI)6. F. Hartung, On classes of functional differential equations with state-dependent delays,

PhD dissertation, University of Texas at Dallas, 1995.192. R. J. La, P. Ranjan, Stability of rate control system with time-varying communication delays,

Center for Satellite and Hybrid Communication Networks, University of Maryland, Techni-cal Research Report, CSHCN TR 2004-16, 2004 (www.isr.umd.edu/CSHCN).

193. P. Ranjan, R. J. La, E. H. Abed, Global stability with a state-dependent delay in rate control, in Time-delay systems 2004: a proceedings volume from the 5th IFAC Workshop, Leuven, Belgium, 8-10 September 2004, eds. W. Michiels and D. Roose, Elsevier, 2005, 269-274.

194. B. Slezák, On the parameter-dependence of the solutions of functional differential equations with unbounded state-dependent delay, Int. J. Qualitative Theory of Differential Equations and Applications, 1:1 (2007) 88-114.


7. Hartung F.: Bevezetés a numerikus analízisbe, egyetemi jegyzet (VE 1/1999), Veszprémi Egyetemi Kiadó, Veszprém, 1998. 2. kiadás: (VE 17/2004) 2004.196. Fodor D., Toth R., Speed Sensorless Linear Parameter Variant H Control of the Induction

Motor, in the proceedings of the 43rd IEEE International Conference on Decision and Control, CDC’04, December 14-17, Atlantis, Bahamas, Vol. 4, 2004, 4435-4440.

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