Boundary Value Problems
Organizers: José Ángel Cid, University of Vigo, Spain. Miroslawa Lucyna Zima, University of Rzeszow, Poland.
Topics: The Special Session “Boundary Value Problems” mainly aims to bring together leading researchers on the qualitative analysis of ordinary differential equations by means of topological, variational or iterative methods, among other techniques.
Critical Point Theory
Organizers: Alberto Cabada, Universidade de Santiago de Compostela, Spain, Alexandru Kristaly, Babeș-Bolyai University, Cluj-Napoca, Romania & Óbuda University, Budapest, Hungary.
Topics: This special session is dedicated to the theory of critical points in Euclidean and non-Euclidean structures, as well as its application to Ordinary, Fractional and Partial Differential Equations. Our primordial intention is to connect researchers in this area in order to share the latest advances and to show the applicability of the theoretical results into the study of nonlinear physical phenomena governed by such equations.
Difference Equations and Discrete Dynamical Systems
Organizers: Abel Garab, Alpen-Adria-Universität Klagenfurt, Austria) and Eduardo Liz, Universidade de Vigo, Spain.
Topics: This session focuses on Difference Equations and Discrete Dynamical Systems in a broad sense. Topics include stability, bifurcations, complex dynamics, periodicity and global dynamics both for autonomous and nonautonomous equations. Applications are particularly welcome, with special attention to Mathematical Biology.
Fuzzy Boundary Value Problems in Spaces with Fuzzy Partition
Organizers: Irina Perfilieva University of Ostrava, Czech Republic. Alireza Khastan, Institute for Advanced Studies in Basic, Iran.
Topics: The aim of this special session is to present recent developments in the theory and applications of the fuzzy differential equations. The topics of this special session will include but are not limited to Theoretical aspects of FDEs and FBVPs, Numerical methods to solve FDEs, FBVPs and FPDEs, Relation between FDEs and Interval Differential Equations (IDEs) and Application of FDEs and FBVPs in real world problems.