@article{MTMT:31147152,
	title = {LMI approach to global stability analysis of stochastic delayed Lotka–Volterra models},
	url = {https://m2.mtmt.hu/api/publication/31147152},
	author = {Kiss, Krisztina and Gyurkovics, Éva},
	doi = {10.1016/j.aml.2020.106227},
	journal-iso = {APPL MATH LETT},
	journal = {APPLIED MATHEMATICS LETTERS},
	volume = {104},
	unique-id = {31147152},
	issn = {0893-9659},
	year = {2020},
	eissn = {1873-5452},
	orcid-numbers = {Gyurkovics, Éva/0000-0003-2355-4113}
}

@article{MTMT:30309979,
	title = {Non-fragile exponential synchronization of delayed complex dynamical networks with transmission delay via sampled-data control},
	url = {https://m2.mtmt.hu/api/publication/30309979},
	author = {Gyurkovics, Éva and Kiss, Krisztina and Kazemy, Ali},
	doi = {10.1016/j.jfranklin.2018.10.005},
	journal-iso = {J FRANKLIN I},
	journal = {JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS},
	volume = {355},
	unique-id = {30309979},
	issn = {0016-0032},
	year = {2018},
	eissn = {1879-2693},
	pages = {8934-8956},
	orcid-numbers = {Gyurkovics, Éva/0000-0003-2355-4113}
}

@article{MTMT:3034032,
	title = {Multiple summation inequalities and their application to stability analysis of discrete-time delay systems},
	url = {https://m2.mtmt.hu/api/publication/3034032},
	author = {Gyurkovics, Éva and Kiss, Krisztina and Nagy, Ilona and Takács, Tibor},
	doi = {10.1016/j.jfranklin.2016.10.006},
	journal-iso = {J FRANKLIN I},
	journal = {JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS},
	volume = {354},
	unique-id = {3034032},
	issn = {0016-0032},
	year = {2017},
	eissn = {1879-2693},
	pages = {123-144}
}

@article{MTMT:3225264,
	title = {Stability analysis of linear systems with interval time-varying delays utilizing multiple integral inequalities},
	url = {https://m2.mtmt.hu/api/publication/3225264},
	author = {Gyurkovics, Éva and Szabó-Varga, Gabriella and Kiss, Krisztina},
	doi = {10.1016/j.amc.2017.05.004},
	journal-iso = {APPL MATH COMPUT},
	journal = {APPLIED MATHEMATICS AND COMPUTATION},
	volume = {311},
	unique-id = {3225264},
	issn = {0096-3003},
	year = {2017},
	eissn = {1873-5649},
	pages = {164-177}
}

@article{MTMT:2695859,
	title = {Cross-diffusion Modeling in Macroeconomics},
	url = {https://m2.mtmt.hu/api/publication/2695859},
	author = {Balázsi, L and Kiss, Krisztina},
	doi = {10.1007/s12591-014-0224-8},
	journal-iso = {DIFFER EQUAT DYNAM SYST},
	journal = {DIFFERENTIAL EQUATIONS AND DYNAMICAL SYSTEMS},
	volume = {23},
	unique-id = {2695859},
	issn = {0971-3514},
	year = {2015},
	eissn = {0974-6870},
	pages = {147-166}
}

@CONFERENCE{MTMT:2669148,
	title = {Prey and Polyphagous Predator Species with Diffusion},
	url = {https://m2.mtmt.hu/api/publication/2669148},
	author = {Kiss, Krisztina and Bartha, Zs},
	booktitle = {Proc. MTNS' 2010 Mathematical Theory of Networks and Systems},
	unique-id = {2669148},
	year = {2010}
}

@article{MTMT:2668796,
	title = {On the dynamics of an n-dimensional ratio-dependent predator-prey system with diffusion},
	url = {https://m2.mtmt.hu/api/publication/2668796},
	author = {Duque, C and Kiss, Krisztina and Lizana, M},
	doi = {10.1016/j.amc.2008.11.016},
	journal-iso = {APPL MATH COMPUT},
	journal = {APPLIED MATHEMATICS AND COMPUTATION},
	volume = {208},
	unique-id = {2668796},
	issn = {0096-3003},
	abstract = {The main concern of this paper is to study the dynamic of an n-dimensional ratio-dependent predator-prey system with diffusion. More concretely, we study the dissipativeness, the persistence of the system and we obtain condition under which the nontrivial equilibrium is globally asymptotically stable. (C) 2008 Elsevier Inc. All rights reserved.},
	keywords = {REACTION-DIFFUSION SYSTEM; Ratio-dependent predator-prey system; Dissipation persistence},
	year = {2009},
	eissn = {1873-5649},
	pages = {98-105}
}

@article{MTMT:1255660,
	title = {$n$-dimensional ratio-dependent predator-prey systems with memory},
	url = {https://m2.mtmt.hu/api/publication/1255660},
	author = {Kiss, Krisztina and Tóth, János},
	doi = {10.1007/s12591-009-0002-1},
	journal-iso = {DIFFER EQUAT DYNAM SYST},
	journal = {DIFFERENTIAL EQUATIONS AND DYNAMICAL SYSTEMS},
	volume = {17},
	unique-id = {1255660},
	issn = {0971-3514},
	abstract = {This paper deals with ratio-dependent predator-prey systems with 
		delay. We will investigate under what conditions delay cannot 
		cause instability in higher dimension. We give an example when 
		delay causes instability.},
	year = {2009},
	eissn = {0974-6870},
	pages = {17-35},
	orcid-numbers = {Tóth, János/0000-0003-3065-5596}
}

@mastersthesis{MTMT:2669141,
	title = {Ratio-dependent predator-prey systems},
	url = {https://m2.mtmt.hu/api/publication/2669141},
	author = {Kiss, Krisztina},
	unique-id = {2669141},
	year = {2009}
}

@article{MTMT:2075211,
	title = {Qualitative Behaviour of a Ratio-dependent Predator-Prey System},
	url = {https://m2.mtmt.hu/api/publication/2075211},
	author = {Kovács, Sándor and Kiss, Krisztina and Farkas, Miklós},
	doi = {10.1016/j.nonrwa.2008.02.009},
	journal-iso = {NONLINEAR ANAL-REAL},
	journal = {NONLINEAR ANALYSIS-REAL WORLD APPLICATIONS},
	volume = {10},
	unique-id = {2075211},
	issn = {1468-1218},
	keywords = {MODELS; DYNAMICS; STABILITY; DELAY; Time delay; STEADY STATES; PARADOX; Hopf bifurcation; characteristic equation; Global asymptotic stability; Ratio-dependence},
	year = {2009},
	eissn = {1878-5719},
	pages = {1627-1642},
	orcid-numbers = {Kovács, Sándor/0000-0001-7051-5075}
}