Abstract
In a Hilbert space X, we consider the abstract problem M∗ddt(My(t))=Ly(t)+f(t)z,0≤t≤τ,My(0)=My0, where L is a closed linear operator in X and M∈L(X) is not necessarily invertible, z∈X. Given the additional information Φ[My(t)]=g(t) wuth Φ∈X∗, g∈C1([0,τ];C). We are concerned with the determination of the conditions under which we can identify f∈C([0,τ];C) such that y be a strict solution to the abstract problem, i.e., My∈C1([0,τ];X), Ly∈C([0,τ];X). A similar problem is considered for general second order equations in time. Various examples of these general problems are given.
| Translated title of the contribution | Identifications for General Degenerate Problems of Hyperbolic Type in Hilbert Spaces |
|---|---|
| Original language | Russian |
| Pages (from-to) | 194-210 |
| Number of pages | 17 |
| Journal | CONTEMPORARY MATHEMATICS. FUNDAMENTAL DIRECTIONS |
| Volume | 64 |
| Issue number | 1 |
| DOIs | |
| State | Published - 2018 |