The rapid progress in homogeneous partial differential equations (PDEs) stems from their effectiveness in modeling diverse phenomena in applied sciences. However, classical models fall short for certain nonhomogeneous materials, such as electrorheological fluids. This limitation has spurred interest in PDEs within Orlicz-Sobolev and Musielak-Sobolev spaces, which are now well studied. More recently, fractional extensions of these spaces and their related PDEs have emerged, though many challenges remain. This session aims to gather leading experts to share recent results and discuss future directions in nonlocal and nonhomogeneous PDEs.

The conference will cover a wide range of topics, including but not limited to:

• Analysis and Its Applications
  
  
• Applied Mathematics and Modeling
  
  
• Fractional Calculus and Its Applications
  
  
• Dynamical Systems and Optimization
  
  
• Nonlinear Dynamical Systems
  
  
• Numerical Analysis, Scientific Computing, and Their Applications

Researchers are encouraged to present their latest findings and actively participate in discussions to foster a collaborative and innovative research environment.

In addition, NTNNP 2026 offers participants the opportunity to publish their works in one of the following journal : Advances in Pure and Applied Mathematics

 Sentido Bellevue Park Hotel, Sousse.