Department Of Fundamental Mathematics 1
1. Weighted Estimates of the Weyl-Type Operator and Its Compactness
2. Inequalities for the Fourier coefficients in unbounded orthogonal systems in generalized Lorentz spaces
3. Homogenization of attractors to reaction–diffusion equations in domains with rapidly oscillating boundary: Critical case
4. Attractors of Ginzburg–Landau equations with oscillating terms in porous media: homogenization procedure
5. Compactness of Commutators for Riesz Potential on Generalized Morrey Spaces
6. Solving Fredholm integro-differential equations involving integral condition: A new numerical method
7. Hardy-type inequalities for iterated integral operators with kernels
8. Attracting sets in sup-norms for mild solutions of impulsive-perturbed parabolic semilinear problems
9. Conditions for maximal regularity of solutions to fourth-order differential equations
10. Bounded invertibility and separability of a parabolic type singular operator in the space L2(R2)
11. Inequalities between mixed moduli of smoothness in the case of limiting parameter values
12. On Some Inverse Problems for a Degenerate Parabolic Equation With Multiple Involution
13. Weighted inequalities for discrete bilinear Hardy-type operator with a matrix
14. Existence and Uniqueness of the Viscous Burgers Equation Based on Ellis Model
15. Existence and Uniqueness of the Viscous Burgers’ Equation with the p-Laplace Operator
16. Solvability of nonlinear problem for some second-order nonstrongly elliptic system
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