|
|
|
|
References
|
|
| |
| 1. |
A. Aleman, B. Korenblum, “Derivation-Invariant Subspaces of $C^{\infty}$”, Comp. Methods and Function Theory, 8:2 (2008), 493–512   |
| 2. |
N.F. Abuzyarova, “Spectral synthesis in the Schwartz space of infinitely differentiable functions”, Dokl. Math., 90:1 (2014), 479–482  |
| 3. |
A. Aleman, A. Baranov, Yu. Belov, “Subspaces of $C^{\infty}$ invariant under the differentiation”, J. Funct. Anal., 268 (2015), 2421–2439 |
| 4. |
N.F. Abuzyarova, “Spectral synthesis for the differentiation operator in the Schwartz space”, Math. Notes, 102:2 (2017), 137–148  |
| 5. |
N.F. Abuzyarova, “Some properties of principal submodules in the module of entire functions of exponential type and polynomial growth on the real axis”, Ufa Math. J., 8:1 (2016), 1–12 |
| 6. |
N.F. Abuzyarova, “On 2-generateness of weakly localizable submodules in the module of entire functions of exponential type and polynomial growth on the real axis”, Ufa Math. J., 8:3 (2016), 8–21 |
| 7. |
N.F. Abuzyarova, “Principal submodules in the module of entire functions, which is dual to the Schwarz space, and weak spectral synthesis in the Schwartz space”, J. Math. Sci., 241:6 (2019), 658–671 |
| 8. |
A. Baranov, Yu. Belov, “Synthesizable differentiation-invariant subspaces”, Geom. Funct. Anal., 29:1 (2019), 44–71 |
| 9. |
N.F. Abuzyarova, “Representation of synthesizable differentiation-invariant subspaces of the Schwartz space”, Dokl. Math., 103:3 (2021), 99–102 |
| 10. |
P. Koosis, The logarithmic integral, v. II, Cambridge Univ. Press, Cambridge, 1992 |
| 11. |
L. Ehrenpreis, “Solution of Some Problems of Division, IV”, Amer. J. Math., 57:1 (1960), 522–588 |
| 12. |
N.F. Abuzyarova, “On Shifts of the Sequence of Integers Generating Functions that are Invertible in the Sense of Ehrenpreis”, J. Math. Sci., 251:2 (2020), 161–175 |
