Szeged, Hungary, June 21–25, 2012
| Name | Affiliation | Country | Abstract, presentation |
|---|---|---|---|
| Kira Adaricheva | Yeshiva University | USA | Effective bases of finite closure systems
 |
| Libor Barto | McMaster University Charles University |
Canada Czech Republic |
The Valeriote conjecture
|
| Mike Behrisch | Technische Universität Dresden | Germany | Characterising Categorical Equivalence of Finite Semigroups
|
| Clifford Bergman | Iowa State University | USA | Fully Invariant and Verbal Congruences
|
| Norbert Bogya | University of Szeged | Hungary | |
| Simion Breaz | Babes-Bolyai University | Romania | Direct products and homomorphisms
|
| Jakub Bulín | Charles University | Czech Republic | Algebraic reduction of CSP to digraphs
|
| Miguel Campercholi | Universidad Nacional de Cordoba | Argentina | Implicit definition of the quaternary discriminator
|
| Ivan Chajda | Palacky University | Czech Republic | Tolerance factorable varieties and four ways Béla Csákány influenced their study
|
| Jelena Čolić | University of Novi Sad | Serbia | On the lattice of clones of incompletely specified operations
|
| Béla Csákány | University of Szeged | Hungary | |
| Gábor Czédli | University of Szeged | Hungary |
Tolerance factorable varieties and four ways Béla Csákány influenced their study
Congruence preimages of tolerances and four ways Béla Csákány influenced their study
On The Number Of Slim Semimodular Lattices
|
| Tamás Dékány | University of Szeged | Hungary | On The Number Of Slim Semimodular Lattices
|
| Dejan Delić | Ryerson University | Canada | |
| Miklós Dormán | University of Szeged | Hungary | |
| Marcel Erné | Leibniz University Hannover | Germany | Screens - a missing link between lattices and finite posets |
| Stephan Foldes | Tampere University of Technology | Finland | Remarks on chains and antichains
 |
| Ralph Freese | University of Hawaii | USA | Maltsev Conditions
|
| Reiner Fritzsche | formerly U Halle (now retired) | Germany | |
| Ewa Graczyńska | Opole University of Technology (in a process) | Poland | Dependence spaces
|
| George Grätzer | University of Manitoba | Canada | Sectionally Complemented Lattices
|
| Joanna Grygiel | Jan Długosz University | Poland | On the tolerance lattice of tolerance factors I
Lattices being blocks of skeleton tolerances |
| Katarzyna Grygiel | Jagiellonian University | Poland | Lattices being blocks of skeleton tolerances
|
| Lankun Guo | Hunan University | China | |
| Gergő Gyenizse | University of Szeged | Hungary | |
| Radomír Halaą | Palacky University | Czech Republic | Tolerance factorable varieties and four ways Béla Csákány influenced their study
|
| Miklós Hartmann | University of York University of Szeged |
United Kingdom Hungary |
On axiomatisability questions about monoid acts
|
| Eszter K. Horváth | University of Szeged | Hungary | |
| Gábor Horváth | University of Debrecen Johannes Kepler University |
Hungary Austria |
Solving functional equations with algebra
|
| Jelena Jovanović | University of Belgrade | Serbia | Strong Malcev conditions implying congruence meet-semidistributivity
|
| Kamilla Kátai-Urbán | University of Szeged | Hungary | |
| Alexandr Kazda | Charles University | Czech Republic | Absorption and reflexive digraphs
|
| Keith Kearnes | University of Colorado | USA | |
| Paula Kemp | Missouri State University | USA | |
| Emil W. Kiss | Eötvös Loránd University | Hungary | Congruence preimages of tolerances and four ways Béla Csákány influenced their study
|
| Lajos Klukovits | University of Szeged | Hungary | |
| Jacek Krzaczkowski | Maria Curie Sklodowska University | Poland | |
| Ádám Kunos | University of Szeged | Hungary | |
| Wolfgang Leeb | Johannes Kepler University | Austria | |
| Hajime Machida | ICU | Japan | Minimal Clones and Maximal Centralizing Monoids
|
| Rozália Madarász | University of Novi Sad | Serbia | |
| Laszlo Major | Tampere University of Technology | Finland | On the unimodality of rank numbers in face lattices of certain polytopes
|
| László Márki | Alfréd Rényi Institute of Mathematics | Hungary | |
| Petar Marković | University of Novi Sad | Serbia | |
| Miklós Maróti | University of Szeged | Hungary | |
| Ralph McKenzie | Vanderbilt University | USA | Malcev families of quasivarieties closed under join or Malcev product |
| George McNulty | University of South Carolina | USA | The minimal variety problem is NP-hard
|
| László Megyesi | University of Szeged | Hungary | |
| Slavko Moconja | University of Belgrade | Serbia | |
| Ildikó Nagy | Hungary | ||
| Anvar Nurakunov | Kyrgyz Academy of Sciences Eurasian National University |
Kyrgyzstan Kazakhstan |
Remark on axiomatizable classes closed under subdirect products
|
| Jakub Oprąal | Charles University | Czech Republic | |
| László Ozsvárt | University of Szeged | Hungary | On The Number Of Slim Semimodular Lattices
|
| Péter P. Pálfy | Alfréd Rényi Institute of Mathematics | Hungary | |
| Jovanka Pantović | University of Novi Sad | Serbia | |
| Cosmin Pelea | Babes-Bolyai University | Romania | Term functions in multialgebra theory
|
| Agata Pilitowska | Warsaw University of Technology | Poland | Semilattice ordered algebras II - the lattice of subvarieties
|
| Miroslav Ploąčica | Slovak Academy of Sciences | Slovakia | Congruence FD-maximal varieties
|
| András Pongrácz | Central European University | Hungary | A new operation on finite partially ordered sets inherited from the random poset
|
| Alexander Popovich | Ural Federal University | Russia | Representation of distributive spatial lattices by congruence lattices of groupoids
|
| Reinhard Pöschel | Technische Universität Dresden | Germany | Clones and Galois connections |
| Sándor Radeleczki | University of Miskolc | Hungary | On the tolerance lattice of tolerance factors II
|
| Duąan Radičanin | University of Novi Sad | Serbia | |
| Frederik Renetseder Saxinger | Johannes Kepler University | Austria | |
| Anna Romanowska | Warsaw University of Technology | Poland | Algebraic closure of generalized convex sets
|
| Karsten Schölzel | University of Luxembourg | Luxembourg | The minimal clones generated by semiprojections on a four-element set
|
| Branimir ©eąelja | University of Novi Sad | Serbia | Lattice-valued identities and equational classes
|
| Benedek Skublics | University of Szeged | Hungary | |
| Vanja Stepanović | University of Belgrade | Serbia | On derived weak congruence representability
|
| Michał Stronkowski | Warsaw University of Technology | Poland | Embedding entropic algebras into modules
|
| Csaba Szabó | Eötvös Loránd University | Hungary | A new operation on finite partially ordered sets inherited from the random poset
|
| László Szabó | University of Szeged | Hungary | |
| Nóra Szakács | University of Szeged | Hungary | On The Number Of Slim Semimodular Lattices
|
| Zoltan Szekely | University of Guam | USA | Equational complexity of graph algebras
 |
| Ágnes Szendrei | University of Colorado University of Szeged |
USA Hungary |
Clones with finitely many relative R-classes
|
| Mária B. Szendrei | University of Szeged | Hungary | |
| Andreja Tepavčević | University of Novi Sad | Serbia | |
| Balázs Udvari | University of Szeged | Hungary | On The Number Of Slim Semimodular Lattices
|
| Edith M. Vargas García | Universidad Autónoma de la Ciudad de México | México | Which maximal clones can be maximal C-clones.
|
| Tamás Waldhauser | University of Szeged | Hungary | |
| Ross Willard | University of Waterloo | Canada | Proving inconsistency: towards a better Maltsev CSP algorithm
|
| Russ Woodroofe | Washington University in St. Louis | USA | Modular and maximal chains in the subgroup lattice of a finite group
|
| László Zádori | University of Szeged | Hungary | |
| Anna Zamojska-Dzienio | Warsaw University of Technology | Poland | Semilattice ordered algebras I - free algebras
|
| Dmitriy Zhuk | Moscow State University | Russia | On the lattice of clones on three elements
|