Research/art/teacher profile of a person
Name and surname:
Mgr. Július Pačuta, PhD.
Document type:
Research/art/teacher profile of a person
The name of the university:
Comenius University Bratislava
The seat of the university:
Šafárikovo námestie 6, 818 06 Bratislava

I. - Basic information

I.1 - Surname
Pačuta
I.2 - Name
Július
I.3 - Degrees
Mgr., PhD.
I.4 - Year of birth
1987
I.5 - Name of the workplace
Department of Mathematical Analysis and Numerical Mathematics FMPI CU
I.6 - Address of the workplace
"Fakulta matematiky, fyziky a informatiky Univerzity Komenského Mlynská dolina F1 842 48 Bratislava Slovakia"
I.7 - Position
odborný asistent
I.8 - E-mail address
julius.pacuta@fmph.uniba.sk
I.9 - Hyperlink to the entry of a person in the Register of university staff
https://www.portalvs.sk/regzam/detail/24900
I.10 - Name of the study field in which a person works at the university
Mathematics

II. - Higher education and further qualification growth

II.1 - First degree of higher education
II.a - Name of the university or institution
Faculty of mathematics, physics a informatics Comenius University
II.b - Year
2009
II.c - Study field and programme
Mathematics
II.2 - Second degree of higher education
II.a - Name of the university or institution
Faculty of mathematics, physics a informatics Comenius University
II.b - Year
2011
II.c - Study field and programme
Mathematics
II.3 - Third degree of higher education
II.a - Name of the university or institution
Faculty of mathematics, physics a informatics Comenius University
II.b - Year
2015
II.c - Study field and programme
Mathematics
II.4 - Associate professor
II.5 - Professor
II.6 - Doctor of Science (DrSc.)

III. - Current and previous employment

III.a - Occupation-position III.b - Institution III.c - Duration
Assistant Comenius University in Bratislava, Faculty of Mathematics, Physics and Informatics 2015-present

IV. - Development of pedagogical, professional, language, digital and other skills

V. - Overview of activities within the teaching career at the university

V.1 - Overview of the profile courses taught in the current academic year according to study programmes
V.1.a - Name of the profile course V.1.b - Study programme V.1.c - Degree V.1.d - Field of study
Mathematical Analysis (1),(4) , Exercises of mathematical analysis (1),(4) Mathematics I. Mathematics
Functional analysis (1),(2) Mathematics I. Mathematics
Ordinary differential equations (2) Mathematics II. Mathematics for managers
Theory of functions of complex variable / Mathematics (4), Exercises of complex analysis / Mathematical analysis Mathematics / Physics I. Mathematics / Physics
V.2 - Overview of the responsibility for the delivery, development and quality assurance of the study programme or its part at the university in the current academic year
V.3 - Overview of the responsibility for the development and quality of the field of habilitation procedure and inaugural procedure in the current academic year
V.4 - Overview of supervised final theses
V.4.1 - Number of currently supervised theses
V.4.a - Bachelor's (first degree)
1
V.4.2 - Number of defended theses
V.4.a - Bachelor's (first degree)
0
V.5 - Overview of other courses taught in the current academic year according to study programmes

VI. - Overview of the research/artistic/other outputs

VI.1 - Overview of the research/artistic/other outputs and the corresponding citations
VI.1.1 - Number of the research/artistic/other outputs
VI.1.a - Overall
9
VI.1.b - Over the last six years
6
VI.1.2 - Number of the research/artistic/other outputs registered in the Web of Science or Scopus databases
VI.1.a - Overall
5
VI.1.b - Over the last six years
5
VI.1.3 - Number of citations corresponding to the research/artistic/other outputs
VI.1.a - Overall
9
VI.1.b - Over the last six years
4
VI.1.4 - Number of citations registered in the Web of Science or Scopus databases
VI.1.5 - Number of invited lectures at the international, national level
VI.2 - The most significant research/artistic/other outputs
1

Fečkan, Michal - Pačuta, Július. Averaging methods for second-order differential equations and their application for impact systems. Mathematics Roč. 8, č. 6 (2020), s. , art. no. 916 

2

Fečkan, Michal - Pačuta, Július. Data approximation using Lotka-Volterra models and a software minimization function. Journal of Applied Mathematics, Statistics and Informatics Roč. 15, č. 2 (2019), s. 5-14

3

Fečkan, Michal, and Július Pačuta. "Periodic and bounded solutions of functional differential equations with small delays." Electronic Journal of Qualitative Theory of Differential Equations 2022.33 (2022): 1-10.

4

Fečkan, Michal - Pačuta, Július. Existence of solution of a forest fire spread model. Applied Mathematics Letters č. 83 (2018), s. 227-231

5

Fečkan, Michal, Július Pačuta, and Hadi Susanto. "Periodic Solutions in Kolmogorov-Type Predator–Prey Systems." Differential Equations and Dynamical Systems (2024): 1-13.

VI.3 - The most significant research/artistic/other outputs over the last six years
1

Fečkan, Michal - Pačuta, Július. Averaging methods for second-order differential equations and their application for impact systems. Mathematics Roč. 8, č. 6 (2020), s. , art. no. 916 

2

Fečkan, Michal - Pačuta, Július. Data approximation using Lotka-Volterra models and a software minimization function. Journal of Applied Mathematics, Statistics and Informatics Roč. 15, č. 2 (2019), s. 5-14

3

Fečkan, Michal, Július Pačuta, and Hadi Susanto. "Periodic Solutions in Kolmogorov-Type Predator–Prey Systems." Differential Equations and Dynamical Systems (2024): 1-13.

4

Fečkan, Michal - Pačuta, Július. Existence of solution of a forest fire spread model. Applied Mathematics Letters č. 83 (2018), s. 227-231

5

Fečkan, Michal, and Július Pačuta. "Periodic and bounded solutions of functional differential equations with small delays." Electronic Journal of Qualitative Theory of Differential Equations 2022.33 (2022): 1-10.

VI.4 - The most significant citations corresponding to the research/artistic/other outputs
1

Behzadi, Saeed, and Zahra Mousavi. "A novel agent-based model for forest fire prediction." Earth Observation and Geomatics Engineering 3.2 (2019): 51-63.

2

Alaci, Stelian, et al. "An Analytical Solution for Non-Linear Viscoelastic Impact." Mathematics 9.16 (2021): 1849.

3

Georges, Didier. "A Variational Calculus Approach to Wildfire Monitoring Using a Low-Discrepancy Sequence-Based Deployment of Sensors." 2019 IEEE 58th Conference on Decision and Control (CDC). IEEE, 2019.

4

Zhang, Xuping, Pan Sun, and Donal O'Regan. "MONOTONE ITERATIVE TECHNIQUE FOR IMPULSIVE EVOLUTION EQUATIONS WITH INFINITE DELAY." Journal of Applied Analysis & Computation 14.3 (2024): 1717-1734.

5

Lyubimov, Vladislav V. "Method of an Asymptotic Analysis of the Nonlinear Monotonic Stability of the Oscillation at the Problem of Damping of the Angle of Attack of a Symmetric Spacecraft." Symmetry 14.10 (2022): 2135.

VI.5 - Participation in conducting (leading) the most important research projects or art projects over the last six years

VII. - Overview of organizational experience related to higher education and research/artistic/other activities

VIII. - Overview of international mobilities and visits oriented on education and research/artistic/other activities in the given field of study

IX. - Other relevant facts

Date of last update
2025-03-01