Existence and smoothness of the solution to the Navier-Stokes

Abstract

A fundamental problem in analysis is to decide whether a smooth solution exists for the Navier-Stokes equations in three dimensions. In this paper we shall study this problem. The Navier-Stokes equations are given by: uit(x,t)- ui(x,t)-uj(x,t) uixj(x,t)+pxi(x,t)=fi(x,t) , divu(x,t)=0 with initial conditions u|(t=0)∂=0. We introduce the unknown vector-function: (wi(x,t))i=1,2,3: uit(x,t)- ui(x,t)-dp(x,t)dxi=wi(x,t) with initial conditions: ui(x,0)=0, ui(x,t)∂=0. The solution ui(x,t) of this problem is given by: ui(x,t) = ∫0t ∫ G(x,t;,τ)~(wi(,τ) + dp(,τ)di)d dτ where G(x,t;,τ) is the Green function. We consider the following N-Stokes-2 problem: find a solution w(x,t)∈ L2(Qt), p(x,t): pxi(x,t)∈ L2(Qt) of the system of equations: wi(x,t)-G(wj(x,t)+dp(x,t)dxj)· Gxj(wi(x,t)+dp(x,t)dxi)=fi(x,t) satisfying almost everywhere on Qt. Where the v-function pxi(x,t) is defined by the v-function wi(x,t). Using the following estimates for the Green function: |G(x,t; ,τ)| ≤c(t-τ)μ· |x-|3-2μ; |Gx(x,t;,τ)|≤c(t-τ)μ·|x-|3-(2μ-1)(1/2<μ<1), from this system of equations we obtain: w(t)<f(t)+b(∫0tw(τ)(t-τ)μ dτ)2; w(t)=\|w(x,t)\|L2(), f(t)=\|f(x,t)\|L2(). Further, using the replacement of the unknown function by Riccati, from this inequality we obtain the a priori estimate. By the Leray-Schauder's method and this a priori estimate the existence and uniqueness of the solution is proved.