Publicado en 3C Empresa – Volume 11, Issue 2 (Ed. 50)
Autores
Resumen
Abstract
This short review article discusses the concavity method, one of the most effective ways to deal with parabolic equations with unbounded solutions in finite time. If the solution ceases to exist for some time, we say it blows up. The solution or some of its derivatives become singular depending on the equation. We focus on situations where the solution becomes unbounded in finite time, and our objective is to review some of the key blowup theory papers utilising the concavity method.Artículo
Palabras clave
Keywords
Parabolic equations, Concavity method, weak solutions, blowup, variable exponent spaces, p(x)-Laplacian operator.Articulos relacionados
- Optimal reservoir operation policy determination for uncertainty conditions
- Modelling the critical success factors for advanced manufacturing technology implementation in small and medium sized enterprises
- Role of frame structure in the development of KRS for learning dialogues.
- Empirical analysis of machine learning-based energy efficient cloud load balancing architectures: a quantitative perspective
- A secured architecture for IoT-based healthcare system
- Industry 4.0: Intelligent Quality Control and Surface Defect Detection
- Analysis of digital information Management of product market competition under the environment of agricultural product e-commerce
- Additive Number Theory: Notes and Some Problems
- Z-Hyperrigidity and Z-boundary representations
- Tensor products of weak hyperrigid sets