Infinite difference method
In mathematics, infinite difference methods are numerical methods for solving differential equations by approximating them with difference equations, in which infinite differences approximate the derivatives. In calculus there are two sections, one is differentiation and the other is integration. Integration is the reverse process of differentiation. {{Cite web |title=Indefinite Integrals: Learn Methods of Integration, Properties |url=https://testbook.com/maths/indefinite-integrals |access-date=2024-10-20 |website=Testbook |language=en}}
See also
References
{{Reflist}}
- [http://www.sciencedirect.com/science/article/pii/S0022072803001037 Simulation of ion transfer under conditions of natural convection by the finite difference method]
- {{cite book|author1=Han, Houde|author2=Wu, Xiaonan|title=Artificial Boundary Method|year=2013|publisher=Springer|isbn=978-3-642-35464-9|at=Chapter 6: Discrete Artificial Boundary Conditions|url=https://www.springer.com/la/book/9783642354632}}.
- [http://www.khuisf.ac.ir/prof/Images/Uploaded_Files/3445-8593-4-PB%5B6699598%5D.PDF Genetic Algorithm and Numerical Solution]
{{Authority control}}
{{DEFAULTSORT:Infinite Difference Method}}
Category:Numerical differential equations
{{Numerical PDE}}
{{Applied-math-stub}}