http://dspace.bsu.edu.ru/handle/123456789/63516| Title: | On hyperbolic equations with a translation operator in lowest derivatives |
| Authors: | Vasilyev, V. Zaitseva, N. |
| Keywords: | mathematics mathematical analysis hyperbolic equations differential-difference equations translation operator classical solution |
| Issue Date: | 2024 |
| Citation: | Vasilyev, V. On hyperbolic equations with a translation operator in lowest derivatives / V. Vasilyev, N. Zaitseva // Mathematics. - 2024. - Vol.12, №12.-Art. 1896. - Doi: 10.3390/math12121896. |
| Abstract: | In the half-plane, a solution to a two-dimensional hyperbolic equation with a translation operator in the lowest derivative with respect to a spatial variable varying along the entire real axis is constructed in an explicit form. It is proven that the solutions obtained are classical if the real part of the symbol of a differential-difference operator in the equation is positive |
| URI: | http://dspace.bsu.edu.ru/handle/123456789/63516 |
| Appears in Collections: | Статьи из периодических изданий и сборников (на иностранных языках) = Articles from periodicals and collections (in foreign languages) |
| File | Description | Size | Format | |
|---|---|---|---|---|
| Vasilev_On Hyperbolic_24.pdf | 218.57 kB | Adobe PDF | View/Open |
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