Theory of hyper-singular integrals and its application to the Navier-Stokes problem

Abstract

In this paper the convolution integrals ∫0t(t-s)λ -1b(s)ds with hyper-singular kernels are considered, where λ 0 and b is a smooth or b is in L1(R+). For such λ these integrals diverge classically even for smooth b. These convolution integrals are defined in this paper for λ 0, λ≠ 0,-1,-2,.... Integral equations and inequalities are considered with the hyper-singular kernels (t-s)λ -1+ for λ 0, where tλ+:=0 for t<0. In particular, one is interested in the value λ=- 14 because it is important for the Navier-Stokes problem (NSP). Integral equations of the type b(t)=b0(t)+ ∫0t(t-s)λ-1b(s)ds, λ 0, are studied. The solution of these equations is investigated, existence and uniqueness of the solution is proved for λ=- 1 4. This special value of λ is of basic importance for a study of the Navier-Stokes problem (NSP). The above results are applied to the analysis of the NSP in the space R3 without boundaries. It is proved that the NSP is contradictory in the following sense: even if one assumes that the initial data v0(x):=v(x,0) 0, ∇ · v0(x)=0 one proves that the solution v(x,t) to the NSP has the property v(x,0)=0. This paradox shows that the NSP is not a correct description of the fluid mechanics problem and it proves that the NSP does not have a solution.