Zdenka KolarBegović
Full Professor Department of Mathematics Josip Juraj Strossmayer University of Osijek Trg Ljudevita Gaja 6 Osijek, HR31000, Croatia¸

Research Interests
nonassociative algebraic structures
geometry
Degrees
PhD in Mathematics, University of Zagreb, Croatia, 2003
Msc in Mathematics, University of Zagreb, Croatia, 1999
Bsc in Mathematics and Physics, University of Osijek, Croatia, 1993
Publications
 V. Volenec, Z. KolarBegović, R. KolarŠuper, A complete system of the shapes of triangles, Glasnik Matematički 54/2 (2019), 409420In this paper we examine the shape of a triangle by means of a ternary operation which satisfies some properties. We prove that each system of the shapes of triangles can be obtained by means of the field with defined ternary operation. We give a geometric model of the shapes of triangles on the set of complex numbers which motivate us to introduce some geometric concepts. The concept of transfer is defined and some interesting properties are explored. By means of transfer the concept of a parallelogram is introduced.
 Z. KolarBegović, R. KolarŠuper, V. Volenec, Brocard circle of the triangle in an isotropic plane, Mathematica Pannonica 26/1 (2018), 103113The concept of the Brocard circle of a triangle in an isotropic plane is deﬁned in this paper. Some other statements about the introduced concepts and the connection with the concept of complementarity, isogonality, reciprocity, as well as the Brocard diameter, the Euler line, and the Steiner point of an allowable triangle are also considered.
 Z. KolarBegović, R. KolarŠuper, V. Volenec, Jerabek hyperbola of a triangle in an isotropic plane, KoG (Scientific and Professional Journal of Croatian Society for Geometry and Graphics) 22/22 (2018), 1219In this paper, we examine the Jerabek hyperbola of an allowable triangle in an isotropic plane. We investigate different ways of generating this special hyperbola and derive its equation in the case of a standard triangle in an isotropic plane. We prove that some remarkable points of a triangle in an isotropic plane lie on that hyperbola whose center is at the Feuerbach point of a triangle. We also explore some other interesting properties of this hyperbola and its connection with some other significant elements of a triangle in an isotropic plane.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Kiepert hyperbola in an isotropic plane, Rad HAZU, Matematičke znanosti. 22/534 (2018), 129143The concept of the Kiepert hyperbola of an allowable triangle in an isotropic plane is introduced in this paper. Important properties of the Kiepert hyperbola will be investigated in the case of the standard triangle. The relationships between the introduced concepts and some well known elements of a triangle will also be studied.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Cubic structure, Glasnik Matematički 52/2 (2017), 247256In this paper we examine the relationships between cubic structures, totally symmetric medial quasigroups, and commutative groups. We prove that the existence of a cubic structure on the given set is equivalent to the existence of a totally symmetric medial quasigroup on this set, and it is equivalent to the existence of a commutative group on this set. We give also some interesting geometric examples of cubic structures. By means of these examples, each theorem that can be proved for an abstract cubic structure has a number of geometric consequences. In the final part of the paper, we prove also some simple properties of abstract cubic structures.
 R. KolarŠuper, Z. KolarBegović, V. Volenec, Steiner point of a triangle in an isotropic plane, Rad HAZU, Matematičke znanosti. 20/528 (2016), 8395The concept of the Steiner point of a triangle in an isotropic plane is defined in this paper. Some different concepts connected with the introduced concepts such as the harmonic polar line, Ceva’s triangle, the complementary point of the Steiner point of an allowable triangle are studied. Some other statements about the Steiner point and the connection with the concept of the complementary triangle, the anticomplementary triangle, the tangential triangle of an allowable triangle as well as the Brocard diameter and the Euler circle are also proved.
 Z. KolarBegović, R. KolarŠuper, V. Volenec, Equicevian points and equiangular lines of a triangle in an isotropic plane, Sarajevo Journal of Mathematics 11/23 (2015), 101107The concepts of equicevian points and equiangular lines of a triangle in an isotropic plane are studied in this paper. A number of significant properties of the introduced concepts are considered.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Affine Fullerene C_60 in a GSQuasigroup, Journal of Applied Mathematics 2014 (2014), 18It will be shown that the affine fullerene C60, which is defined as an affine image of buckminsterfullerene C60, can be obtained only by means of the golden section. The concept of the affine fullerene C60 will be constructed in a general GSquasigroup using the statements about the relationships between affine regular pentagons and affine regular hexagons. The geometrical interpretation of all discovered relations in a general GSquasigroup will be given in the GS quasigroup $C((1/2)(1+sqrt 5))$.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Reciprocity in an isotropic plane, Rad HAZU, Matematičke znanosti. 519/18 (2014), 171181The concept of reciprocity with respect to a triangle is introduced in an isotropic plane. A number of statements about the properties of this mapping is proved. The images of some well known elements of a triangle with respect to this mapping will be studied.
 J. BebanBrkić, V. Volenec, Z. KolarBegović, R. KolarŠuper, Cosymmedian triangles in an isotropic plane, Rad HAZU, Matematičke znanosti. 515/2013 (2013), 3342In this paper the concept of cosymmedian triangles in an isotropic plane is defined. A number of statements about some important properties of these triangles will be proved. Some analogies with the Euclidean case will also be considered.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, CrelleBrocard points of the triangle in an isotropic plane, Mathematica Pannonica 24/2 (2013), 167181In this paper the concept of CrelleBrocard points of the triangle in an isotropic plane is defined. A number of statements about the relationship between CrelleBrocard points and some other significant elements of a triangle in an isotropic plane are also proved. Some analogies with the Euclidean case are considered as well.
 J. BebanBrkić, V. Volenec, Z. KolarBegović, R. KolarŠuper, On Gergonne point of the triangle in isotropic plane, Rad HAZU, Matematičke znanosti. 515/2013 (2013), 95106Using the standard position of the allowable triangle in the isotropic plane relationships between this triangle and its contact and tangential triangle are studied. Thereby different properties of the symmedian center, the Gergonne point, the Lemoine line and the de Longchamps line of these triangles are obtained.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Affine regular icosahedron circumscribed around the affine regular octahedron in GSquasigroup, Commentationes Mathematicae Universitatis Carolinae 53/3 (2012), 501507The concept of the affine regular icosahedron and affine regular octahedron in a general GS quasigroup will be introduced in this paper. The theorem of the unique determination of the affine regular icosahedron by means of its four vertices which satisfy certain conditions will be proved. The connection between affine regular icosahedron and affine regular octahedron in a general GS quasigroup will be researched. The geometrical representation of the introduced concepts and relations between them will be given in the GS quasigroup $mathbb{ C} ((frac{1}{2}(1+sqrt 5))$.
 Z. KolarBegović, A short direct characterization of GSquasigroups, Czechoslovak Mathematical Journal 61/136 (2011), 36The theorem about the characterization of a GS quasigroup by means of a commutative group in which there is an automorphism which satisfies certain conditions, is proved directly.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Affineregular hexagons in the parallelogram space, Quasigroups and Related Systems 19 (2011), 353358The concept of the affineregular hexagon, by means of six parallelograms, is defined and investigated in any parallelogram space and geometrical interpretation in the affine plane is also given.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, ARHquasigroups, Mathematical Communications 16 (2011), 539550In this paper, the concept of an ARHquasigroup is introduced and identities valid in that quasigroup are studied. The geometrical concept of an affineregular heptagon is defined in a general ARHquasigroup and geometrical representation in the quasigroup $C(2 cos pi/7)$ is given. Some statements about new points obtained from the vertices of an affineregular heptagon are also studied.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Kiepert triangles in an isotropic plane, Sarajevo Journal of Mathematics 7/19 (2011), 8190In this paper the concept of the Kiepert triangle of an allowable triangle in an isotropic plane is introduced. The relationships between the areas and the Brocard angles of the standard triangle and its Kiepert triangle are studied. It is also proved that an allowable triangle and any of its Kiepert triangles are homologic. In the case of a standard triangle the expressions for the center and the axis of this homology are given.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, AROquasigroups, Quasigroups and Related Systems 18 (2010), 213228In this paper the concept of AROquasigroup is introduced and some identities which are valid in a general AROquasigroup are proved. The "geometric" concepts of midpoint, parallelogram and affineregular octagon is introduced in a general AROquasigroup. The geometric interpretation of some proved identities and introduced concepts is given in the quasigroup $C(1+sqrt2/2)$.
 R. KolarŠuper, Z. KolarBegović, V. Volenec, Dual Feuerbach theorem in an isotropic plane, Sarajevo Journal of Mathematics 18 (2010), 109115The dual Feuerbach theorem for an allowable triangle in an isotropic plane is proved analytically by means of the socalled standard triangle. A number of statements about relationships between some concepts of the triangle and their dual concepts are also proved.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Steiner's ellipses of the triangle in an isotropic plane, Mathematica Pannonica 21/2 (2010), 229238The concept of the Steiner's ellipse of the triangle in an isotropic plane is introduced. The connections of the introduced concept with some other elements of the triangle in an isotropic plane are also studied.
 R. KolarŠuper, Z. KolarBegović, V. Volenec, Thebault circles of the triangle in an isotropic plane, Mathematical Communications 15 (2010), 437442In this paper the existence of three circles, which touch the circumscribed circle and Euler circle of an allowable triangle in an isotropic plane, is proved. Some relations between these three circles and elements of a triangle are investigated. Formulae for their radii are also given.
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Thebault's pencil of circles in an isotropic plane, Sarajevo Journal of Mathematics 18 (2010), 237239In the Euclidean plane Griffiths's and Thebault's pencil of the circles are generally different. In this paper it is shown that in an isotropic plane the pencils of circles, corresponding to the Griffiths's and Thebault's pencil of circles in the Euclidean plane, coincide.
 Z. KolarBegović, R. KolarŠuper, V. Volenec, Brocard angle of the standard triangle in an isotropic plane, Rad HAZU, Matematičke znanosti. 503 (2009), 5560
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Heptagonal triangle as the extreme triangle of DixmierKahaneNicolas inequality, Mathematical Inequalities and Applications 12/4 (2009), 773779
 Z. KolarBegović, V. Volenec, LGSquasigroups, Quasigroups and Related Systems 17 (2009), 7790
 V. Volenec, J. BebanBrkić, R. KolarŠuper, Z. KolarBegović, Orthic axis, Lemoine line and Longchamp's line of the triangle in I_2., Rad HAZU, Matematičke znanosti. 503 (2009), 1319
 Z. KolarBegović, R. KolarŠuper, V. Volenec, The second Lemoine circle of the triangle in an isotropic plane, Mathematica Pannonica 20/1 (2009), 7986
 V. Volenec, Z. KolarBegović, Affine regular decagons in GSquasigroups, Commentationes Mathematicae Universitatis Carolinae 49/3 (2008), 383395
 Z. KolarBegović, R. KolarŠuper, V. Volenec, Angle bisectors of a triangle in I_2, Mathematical Communications 13/1 (2008), 97105
 R. KolarŠuper, Z. KolarBegović, V. Volenec, Apollonius circles of the triangle in an isotropic plane, Taiwanese journal of mathematics 12/5 (2008), 12391249The concept of Apollonius circle and Apollonius axes of an allowable triangle in an isotropic plane will be introduced. Some statements about relationships between introduced concepts and some other previously studied geometric concepts about triangle will be investigated in an isotropic plane and some analogies with the Euclidean case will be also considered.
 R. KolarŠuper, Z. KolarBegović, V. Volenec, J. BebanBrkić, Isogonality and inversion in an isotropic plane, International Journal of Pure and Applied Mathematics 44/3 (2008), 339346
 V. Volenec, Z. KolarBegović, R. KolarŠuper, Two characterizations of the triangle with the angles $ frac{pi}{7}, frac{2 pi}{7}, frac{4 pi}{7}$, International Journal of Pure and Applied Mathematics 44/3 (2008), 335338
 Z. KolarBegović, R. KolarŠuper, Six concyclic points, Mathematical Communications 12 (2007), 255256
 R. KolarŠuper, Z. KolarBegović, V. Volenec, The first Lemoine circle of the triangle in an isotropic plane, Mathematica Pannonica 18/2 (2007), 253263
 Z. KolarBegović, V. Volenec, The meaning of computer search in the study of some classes of IMquasigroups, Croatian Journal of Education 53 (2007), 293297
 J. BebanBrkić, R. KolarŠuper, Z. KolarBegović, V. Volenec, On Feuerbach's theorem and a pencil of circles in I_2, Journal for Geometry and Graphics 10/2 (2006), 125132
 Z. KolarBegović, R. KolarŠuper, Lj. Jukić Matić, Towards new perspectives on mathematics education, Fakultet za odgojne i obrazovne znanosti i Odjel za matematiku, Sveučilište u Osijeku, Osijek, 2019.
 Z. KolarBegović, R. KolarŠuper, Lj. Jukić Matić, Mathematics Education as a Science and a Profession, Odjel za matematiku i Fakultet za odgojne i obrazovne znanosti, Osijek, 2017.
 Z. KolarBegović, R. KolarŠuper, I. Đurđević, Higher Goals in Mathematics Education , Odjel za matematiku, Fakultet za odgojne i obrazovne znanosti , Osijek, 2015.
 M. Pavleković, Z. KolarBegović, R. KolarŠuper, Mathematics teaching for the future, Odjel za matematiku, Fakultet za odgojne i obrazovne znanosti, Osijek, 2013.
Projects
Participation (as researcher) in work of the following projects:

Non associative algebraic structures and their application (Neasocijativne algebarske strukture i njihove primjene), Ministry of Science, Education and Sports of the Republic Croatia, Department of Mathematics, University Of Zagreb, Principal investigator: Vladimir Volenec

Geometric and algebraic geometric structures (Geometrije i algebarsko geometrijske strukture), Ministry of Science, Education and Sports of the Republic Croatia, Department of Mathematics, University Of Zagreb, Principal investigator: Vladimir Volenec
Professional Activities
Editorial BoardsEditor in Chief of the Journal Osječki matematički list (since 2012)Committee MembershipsMember of the Scientific and Organizing Committee of the International Colloquium Mathematics and Children (Osijek 2007, Osijek 2009, Osijek 2011, Osijek 2013, Osijek 2015) Head of the Organizing Committee of the 5th International Scientific Colloquium Mathematics and Children (Osijek 2015) Refereeing/ReviewingOsječki matematički listMathematical Reviews
Teaching
Konzultacije (Office Hours): Četvrtak (16:00 h). Konzultacije su moguće i po dogovoru.
Prijedlog tema diplomskih radova
1. Geometrija zlatnog reza
2. Inverzija u ravnini i primjene
3. Značajni pravci u geometriji trokuta
Prijedlog tema završnih radova
1. Algebarska metoda rješavanja konstruktivnih zadataka
2. Euleorova kružnica
Personal
 Birthdate: March 24, 1969
 Birthplace: Sremska Mitrovica
 Citizenship: Croatian
 Family: Married with two children (Dolores, Alojzije)