Full list of publications: |
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Citations (Crossref Cited-By Service + Math-Net.Ru) |
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Articles
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1. |
N. Yu. Antonov, Mat. Zametki (to appear) |
2. |
R. R. Akopyan, N. Yu. Antonov, V. V. Arestov, A. G. Babenko, N. V. Baidakova, V. I. Berdyshev, V. V. Vasin, S. I. Novikov, N. L. Patsko, A. G. Chentsov, N. I. Chernykh, V. T. Shevaldin, “Yurii Nikolaevich Subbotin”, Proc. Steklov Inst. Math. (Suppl.), 319, suppl. 1 (2022), S1–S6 |
3. |
N. Yu. Antonov, A. N. Lukoyanov, “Order estimates for Lebesgue constants of Fourier sums in Orlicz spaces”, Trudy Inst. Mat. i Mekh. UrO RAN, 27, no. 4, 2021, 35–47 |
4. |
N. Yu. Antonov, “On $\Lambda$-convergence almost everywhere of multiple trigonometric Fourier series”, Ural Math. J., 3:2 (2017), 14–21 |
5. |
N. Yu. Antonov, “On almost everywhere convergence for lacunary sequences of multiple rectangular Fourier sums”, Proc. Steklov Inst. Math. (Suppl.), 296, suppl. 1 (2017), 43–59 |
6. |
N. Yu. Antonov, “On Divergence Almost Everywhere of Fourier Series of Continuous Functions of Two Variables”, Izv. Saratov. Univ. (N.S.), Ser. Math. Mech. Inform., 14:4(2) (2014), 497–505 |
7. |
N. Yu. Antonov, “Estimates for the growth order of sequences of multiple rectangular Fourier sums of integrable functions”, J. Math. Sci., 209:1 (2015), 1–11 |
8. |
N. Yu. Antonov, “Growth estimates for arbitrary sequences of multiple rectangular Fourier sums”, Proc. Steklov Inst. Math. (Suppl.), 284, suppl. 1 (2014), 1–8 |
9. |
N. Yu. Antonov, “On the growth order of sequences of double rectangular Fourier sums for functions from the classes $\varphi(L)$”, Trudy Inst. Mat. i Mekh. UrO RAN, 18, no. 4, 2012, 26–34 |
10. |
N. Yu. Antonov, “Note on estimates for the growth order of sequences of multiple rectangular Fourier sums”, Proc. Steklov Inst. Math. (Suppl.), 277, suppl. 1 (2012), 4–8 |
11. |
N. Yu. Antonov, “On the growth rate of arbitrary sequences of double rectangular Fourier sums”, Proc. Steklov Inst. Math. (Suppl.), 273, suppl. 1 (2011), S14–S20 |
12. |
N. Yu. Antonov, “Almost Everywhere Divergent Subsequences of Fourier Sums of Functions from $\varphi(L)\cap H_1^\omega$”, Math. Notes, 85:4 (2009), 484–495 |
13. |
N. Yu. Antonov, “On the almost everywhere convergence of sequences of multiple rectangular Fourier sums”, Proc. Steklov Inst. Math. (Suppl.), 264, suppl. 1 (2009), S1–S18 |
14. |
N. Yu. Antonov, “Growth rate of sequences of multiple rectangular Fourier sums”, Proc. Steklov Inst. Math. (Suppl.), 2005no. , suppl. 2, S9–S29 |
15. |
N. Yu. Antonov, “Almost everywhere convergence over cubes of multiple trigonometric Fourier series”, Izv. Math., 68:2 (2004), 223–241 |
16. |
N. Yu. Antonov, “Integrability of the Majorants of Fourier Series and Divergence of the Fourier Series of Functions with Restrictions on the Integral Modulus of Continuity”, Math. Notes, 76:5 (2004), 606–619 |
17. |
N. Yu. Antonov, “Conditions for the finiteness of majorants for sequences of operators and convergence of Fourier series”, Proc. Steklov Inst. Math. (Suppl.), 2001, no. suppl. 1, S1–S19 |
18. |
N. Yu. Antonov, “Convergence of Fourier series”, East J. Approx., 2:2 (1996), 187–196 |
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