|
|
Publications in Math-Net.Ru
-
On the convergence sets of operator sequences on spaces of homogeneous type
Mat. Sb., 215:8 (2024), 66–94
-
On Uniqueness Properties of Rademacher Chaos Series
Mat. Zametki, 114:6 (2023), 1225–1232
-
The Fatou Property for General Approximate Identities on Metric Measure Spaces
Mat. Zametki, 110:2 (2021), 204–220
-
A sharp estimate for the majorant norm of a rearranged trigonometric system
Uspekhi Mat. Nauk, 75:3(453) (2020), 183–184
-
On Weyl multipliers of the rearranged trigonometric system
Mat. Sb., 211:12 (2020), 49–82
-
An exponential estimate for the cubic partial sums of multiple Fourier series
Izv. RAN. Ser. Mat., 83:2 (2019), 83–96
-
On Exponential Summability of Rectangular Partial Sums of Double Trigonometric Fourier Series
Mat. Zametki, 104:5 (2018), 667–679
-
On the divergence of triangular and eccentric spherical sums of double Fourier series
Mat. Sb., 207:1 (2016), 73–92
-
On the divergence of Walsh and Haar series by sectorial and triangular regions
Proceedings of the YSU, Physical and Mathematical Sciences, 2014, no. 2, 3–12
-
Characterization of the sets of divergence for sequences of operators with the localization property
Mat. Sb., 202:1 (2011), 11–36
-
On Riemann sums and maximal functions in $\mathbb R^n$
Mat. Sb., 200:4 (2009), 53–82
-
Everywhere Divergent
$\Phi$-Means of Fourier Series
Mat. Zametki, 80:1 (2006), 50–59
-
Exponential Estimates of the Calderón–Zygmund Operator and Related Questions about Fourier Series
Mat. Zametki, 71:3 (2002), 398–411
-
Divergence almost everywhere of rectangular partial sums of multiple Fourier series of bounded functions
Mat. Zametki, 64:1 (1998), 24–36
-
Some linear summation methods for Fourier series
Mat. Sb., 189:5 (1998), 129–152
-
Hilbert transform and exponential integral estimates of rectangular sums of double Fourier series
Mat. Sb., 187:3 (1996), 55–74
-
On the growth order $o(\log\log n)$ of partial sums of Fourier–Stieltjes series of random measures
Dokl. Akad. Nauk, 341:3 (1995), 301–302
-
On the order of growth $o(\log\log n)$ of the partial sums of Fourier–Stieltjes series of random measures
Mat. Sb., 184:1 (1993), 15–40
-
A necessary and sufficient condition for differentiability of integrals of random measures in $R^n$ over $n$-dimensional intervals
Mat. Zametki, 49:4 (1991), 63–68
-
On the selection of a convergence subsystem with logarithmic density
from an arbitrary orthonormal systems
Mat. Sb. (N.S.), 136(178):1(5) (1988), 41–55
© , 2024