On approximation of solutions to the heat equation from Lebesgue class L2 by more regular solutions

Abstract

Let s ∈ N, T1,T2 ∈ R, T1<T2, and , ω be bounded domains in Rn, n ≥ 1, such that ω ⊂ and the complement ω has no (non-empty) compact components in . We prove that this is the necessary and sufficient condition for the space H2s,s H ( × (T1,T2)) of solutions to the heat operator H in a cylinder domain × (T1,T2) from the anisotropic Sobolev space H2s,s ( × (T1,T2)) to be dense in the space L2 H(ω × (T1,T2)), consisting of solutions in the domain ω × (T1,T2) from the Lebesgue class L2 (ω × (T1,T2)). As an important corollary we obtain the theorem on the existence of a basis with the double orthogonality property for the pair of the Hilbert spaces H2s,s H ( × (T1,T2)) and L2 H(ω × (T1,T2)) .