When Pythagoras meets Navier-Stokes
Abstract
In this article, we develop a new method, based on a time decomposition of a Cauchy problem elaborated in [6], to retrieve the well-known L∞ ([0,T],L2(Rd,Rd)) control of the solution of the incompressible Navier-Stokes equation in Rd. We precisely explain how the Pythagorean theorem in L2(Rd,Rd) allows to get the proper energy estimate; however such an argument does not work anymore in Lp(Rd,Rd), p ≠ 2. We also deduce, by similar arguments, an already known L∞ ([0,T],L1(R3,R3)) control of vorticity for d=3.
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