A new discretization of the Euler equation via the finite operator theory
A new discretization of the Euler equation via the finite operator theory
We propose a novel discretization procedure for the classical Euler equation based on the theory of Galois differential algebras and the finite operator calculus developed by G.C. Rota and collaborators. This procedure allows us to define algorithmically a new discrete model that inherits from the continuous Euler equation a class of exact solutions.
Miguel A. Rodríguez、Piergiulio Tempesta
数学物理学
Miguel A. Rodríguez,Piergiulio Tempesta.A new discretization of the Euler equation via the finite operator theory[EB/OL].(2025-07-07)[2025-07-23].https://arxiv.org/abs/2507.05040.点此复制
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