Mini-symposiums
The procedure for submitting an abstract paper for minisymposiums is via Google Forms.
Go to GOOGLE FORMS and submit your short abstract.
Please upload the source file (TeX file) and PDF file as a single ZIP file.
A sample abstract is given below. The deadline for short abstract submission is August 20, 2026.
Sample Abstract File: template.pdf template.zip
If you are submitting for a mini-symposium, please select talk as one of the following:
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MS1: Functional analysis in interdisciplinary applications
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MS2: Topology and Its Interactions
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MS3: Nonclassical Boundary Value Problems for Second- and Higher-Order Partial Differential Equations
MS1: Functional Analysis in Interdisciplinary Applications
Mini-symposium will be organized in the framework of the Eigth International Conference on Analysis and Applied Mathematics (ICAAM 2026).
Organizers:
Michael V. Ruzhansky, Ghent University, Belgium
Makhmud A. Sadybekov, Institute of Mathematics and Mathematical Modeling, Kazakhstan
Durvudkhan Suragan, Nazarbayev University, Kazakhstan
E-mails: ruzhansky@gmail.com; ma
The aim of the Mini-symposium
The aim of the Mini-symposium FAIA is to join mathematicians working in the area of Functional analysis and its interdisciplinary applications together to share new trends of applications of Functional analysis.
In mathematics, the developments in the field of applied mathematics open new research areas in Functional analysis and vice versa.
That is why we plan this Mini-symposium to provide a forum for researchers and scientists to communicate their recent developments and present their original results in various fields of functional analysis and applied mathematics.
The mini-symposium will consist of plenary lectures and contributed oral presentations.
The main topics
The Mini-symposium FAIA topics include, but are not limited to, the following research and development areas/fields:
- Theory of Functions and Functional Spaces
- Differential Equations and Boundary Value Problems
- Differential and Integral Operators and Spectral Theory
MS2: Topology and Its Interactions
Mini-symposium will be organized in the framework of the Eigth International Conference on Analysis and Applied Mathematics (ICAAM 2026).
Organizer:
Yaşar Sözen, Hacettepe University, Türkiye
E-mail: ysozen@hacettepe.edu.tr
The aim of the Mini-symposium
The aim of the minisymposium is to bring together researchers using topology in their research.
The main topics
The scope of the minisymposium covers theoretical and applied aspects of topology. The areas of interest include but are not restricted to:
- Topology
- Algebraic Topology
- Geometry
- Analysis
- Differential Equations
MS3: Nonclassical Boundary Value Problems for Second- and Higher-Order Partial Differential Equations
Mini-symposium will be organized in the framework of the Eigth International Conference on Analysis and Applied Mathematics (ICAAM 2026).
Organizers:
Otari Jokhadze, Andrea Razmadze Mathematical Institute and Ivane Javakhishvili Tbilisi State University, Georgia
E-mail: ojokhadze@yahoo.com
The aim of the Mini-symposium
The aim of the mini-symposium is to bring together researchers employing both classical and modern methods in the study of structural and qualitative properties, as well as boundary value problems for second- and higher-order partial differential equations.
Particular attention will be devoted to local, nonlocal, inverse, and ill-posed problems for both classical equations and equations with time involution.
The main topics
The scope of the mini-symposium covers theoretical and applied aspects of boundary value problems for partial differential equations. Topics include, but are not limited to:
- Non-linear wave equations with source, dissipative, integral nonlinearity and damping terms
- Third order total and with dominated lower terms PDE
- Laplace invariants and Rieman's function for PDE
- Periodic in time, point or integral non-local boundary conditions in space variables
- Dirichlet and Goursat type conditions on the characteristics
- Non-existence and blow-up solutions of BVP for PDE