International Scientific Conference on Advances in Applied Physics and

Mathematics

(AAPM-2023)

Tashkent, Uzbekistan, 10-12 April 2023

WELCOME TO AAPM-2023

TIIAME - National Research University (Tashkent, Uzbekistan) with the support of the Uzbekistan Scientific and Engineering Society of Oil and Gas Industry and International Scientific and Technical Society for Instrumentation and Metrology are organizing International Scientific Conference on Advances in Applied Physics and Mathematics – AAPM-2023. The Conference will take place in Tashkent (Uzbekistan) on 10-12 April 2023. Institute of Fundamental and Applied Research (NRU-TIIAME), Bukhara Engineering Technological Institute and China Association for Science and Technology are partner organizations of the Conference.

The Conference AAPM-2023 will provide a remarkable opportunity for the academic and industrial communities to address new challenges and share solutions, and discuss future research directions in the field of applied physics and mathematics. Contributions are expected from universities, academia and industry.

The purpose of the Conference is to share the experience of leading experts in the application of modern methods of applied physics and mathematics in the fields of energy, chemical and oil and gas engineering, technology advanced materials, instrumentation, metrology and standards, as well as in modern areas of nuclear sciences and atomic engineering, semiconductors devices and photonics, polymers, optics and plasma research, modeling nonlinear, non-stationary and spatially heterogeneous processes, etc.

Advances in applied mathematics span many disciplines and it involves the development of models and simulations to understand physical processes and systems. Development of algorithms (numerical and non-numerical) include mathematical models, computational models, and computer simulations developed to solve physical problems. The scientific computing approach is to gain understanding of physical processes through the analysis of mathematical models implemented on computers.

Advances in Instrumentation and Measurement;

Applications of Microscopy in the Physical Sciences;

Applied Materials Science, Materials Analysis and Characterization;

Applied Non-linear Physics;

Applied Optics, Non-linear Optics, Laser Physics;

Applied Solid State Physics;

Technology Advanced Materials;

Astrophysics and Plasma Physics;

Atomic, Molecular and Chemical Physics;

Biomaterials Science, Biomechanics and Biological Physics; Biophysics, Bio (Electro) Magnetism, Biophysical Chemistry; Computational Physics, Non-linear Physics;

Condensed Matter Physics and Materials Science;

Engineering and Industrial Physics, Instrumentation, Metrology and Standards;

Environmental Physics;

Imaging Techniques, Microscopy;

Nanoscale Physics;

Nanoscience and Nanotechnology;

Non-equilibrium systems;

Nuclear Physics, Radioactivity, Radiochemistry, Radiation Safety; Nuclear Sciences and Atomic Engineering;

Particle Physics and Field Theory;

Physical Chemistry;

Physical Properties of Biological/Biomedical Systems through Microscopy;

Plasma physics;

Polymers;

Optical Physics, Quantum Electronics and Photonics;

Quantum Physics and Quantum Mechanics Radiation Physics, Radiation-Matter interaction, Spectroscopies;

Radioactivity, Radiation;

Protection and Safety Issues;

Semiconductors devices and Photonics, Opto-electronics, Quantum Electronics;

Soft and granular matter;

Solid State Physics;

Surfaces, Interfaces and Colloids;

Statistical Physics and Nonlinear Systems;

Thermal-Fluid Mechanics.

Advanced in Control Theory, Dynamical and Complex Systems; Applied Mathematics in Science and Engineering: Modeling, Analysis and Computation;

Applied Partial Differential Equations;

Numerical Analysis and Methods; Petascale Computing; Computational Science;

Mathematical Methods in Optics and Electromagnetics; Mathematical Modeling in Materials;

Science and Mechanics;

Nonlinear Analysis and Nonlinear Problems in Mechanics; Homogenization and Multiscale Analysis;

Inverse Problems;

Algebra and its Application;

Differential Equations, Dynamical Systems and Their Applications; Engineering Applications and Scientific Computations;

Fuzzy Mathematics and its Applications;

Fuzzy Systems;

Geometry and its Application;

Modeling and Simulation;

Statistical Methods in Technical Sciences and Practice;

Probability and Statistics;

Nonlinear Systems and Matrix;

Large-code Development;

Operator Theory;

Ordinary Differential Equations;

Partial Differential Equations;

Spectral Theory;

Data Mining and Data Analysis.

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