This book presents a curated collection of recent research contributions in the field of nonlinear partial differential equations (PDEs), with an emphasis on hyperbolic problems. These equations are essential for modeling complex physical phenomenasuch as wave propagation, fluid dynamics, blood flow, and sediment transport. In many real-world applications, the governing equations are not purely hyperbolic but involve intricate interactions with elliptic or parabolic components.
As the field advances through theoretical insights and practical needs, this volume captures innovative developments shaping current research. The contributions included here were originally presented at the 10th International Congress on Industrial and Applied Mathematics (ICIAM), held in Tokyo in 2023. Selected from minisymposia on hyperbolic PDEs and related topics, each organized by leading experts in the field.
The chapters in this book reflect a rich diversity of perspectives and approaches, ranging from rigorous mathematical analysis to computational techniques and real-world applications. By bringing together these works, the volume offers a comprehensive snapshot of the state of the art in hyperbolic PDE research, highlighting both foundational insights and emerging trends.
Edited by the organizers of the relevant ICIAM 2023 minisymposia, this book serves as a valuable resource for researchers, practitioners, and graduate students interested in the theoretical and applied aspects of nonlinear PDEs. Whether you are exploring the mathematical underpinnings of wave phenomena or developing models for complex systems in science and engineering, this volume provides both inspiration and practical tools to advance your work.
Chapter 1 A comparison of the Coco-Russo scheme and -FEM for elliptic
equations in arbitrary domains.
Chapter 2 A semi-implicit method for a
degenerating convection-diffusion-reaction problem modeling secondary
settling tanks.
Chapter 3 Multidimensional approximate Riemann solvers for
hyperbolic nonconservative systems: a review.
Chapter 4 Challenges in
Stochastic Galerkin Methods for Nonlinear Hyperbolic Systems with
Uncertainty.
Chapter 5 On the role of momentum correction factor and general
tube law in one-dimensional blood flow models for networks of vessels.-
Chapter 6 Numerical modelling of the hemodynamic changes in the inferior vena
cava in response to the Valsalva maneuver.
Tomįs Morales de Luna is an associate professor at the University of Mįlaga and a member of the EDANYA group. His research focuses on modelling aspects of geophysical flows, with special interest in sediment transport and dispersive systems, and the design of robust and efficient finite volume schemes for hyperbolic systems of partial differential equations.
Sebastiano Boscarino is associate professor of numerical analysis in the Department of Mathematics and Computer Science at the University of Catania, Italy. He has published numerous research papers on numerical methods for evolutionary partial differential equations and their applications. His research interests include numerical methods for stiff problems, conservation laws, hyperbolic systems with relaxation, kinetic equations, and semi-Lagrangian methods for kinetic equations
Cipriano Escalante Sįnchez is an associate professor at the University of Mįlaga and a member of the EDANYA research group. His work centers on the mathematical modeling of geophysical flows, with a particular emphasis on dispersive phenomena and the development of robust, efficient finite volume methods for solving hyperbolic partial differential equations. His research also involves adapting these numerical methods to high-performance computing architectures.
Peter Frolkovi is an associate professor at the Department of Mathematics of Slovak Technical University in Bratislava. His research focuses on numerical methods for partial differential equations as used in applications of conservation laws and level set methods with special interest in groundwater flow and transport and problems with dynamic interfaces.
Lucas O. Müller is an associate professor at the Department of Mathematics of the University of Trento, Italy. His research focuses on numerical methods for hyperbolic partial differential equations and applications to computational haemodynamics, ranging from whole-body blood flow models to microcirculation.
