Nursultanov Ed 1

1. INTERPOLATION METHODS FOR ANISOTROPIC NET SPACES
2. Interpolation Theorem for Anisotropic Net Spaces
3. On The Inequality Of Different Metrics For Multiple Fourier-Haar Series
4. The Hardy—Littlewood theorem for double Fourier—Haar series from mixed metric Lebesgue L_p̄[0, 1]² and net N_{p̄, q̄}(M) spaces
5. RECOVERY FUNCTION FOR SOBOLEV SPACES WITH DOMINATING MIXED DERIVATIVE
6. NIKOL’SKII-BESOV SPACES WITH A DOMINANT MIXED DERIVATIVE AND WITH A MIXED METRIC: INTERPOLATION PROPERTIES, EMBEDDING THEOREMS, TRACE AND EXTENSION THEOREMS
7. Lebesgue constants and Hardy–Littlewood theorem for Morrey spaces
8. Interpolation Theorems for Nonlinear Operators in General Morrey-Type Spaces and Their Applications
9. Multiple trigonometric series with partially monotone coefficients
10. Interpolation of nonlinear integral Urysohn operators in net spaces
11. INTERPOLATION THEOREM FOR DISCRETE NET SPACES
12. MARCINKIEWICZ’S INTERPOLATION THEOREM FOR LINEAR OPERATORS ON NET SPACES
13. On -Integrability of Multiple Trigonometric Series with General Monotone Coefficients
14. Convolution-type operators in grand Lorentz spaces
15. Improved Stein inequalities for the Fourier transform
16. On the convolution operator in Morrey spaces
17. On the Marcinkiewicz–Calderón Interpolation Theorem for Integral Operators
18. Multipliers of double Fourier–Haar series
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