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Intermediate quantum statistics for identical objectsMethods to construct various algebras of creation and annihilation operators of physical objects
Scattering of electrons by a Coulomb center between a physical quantity and an operator, which permits the existence of a non-negative quantum
Two-weight inequalities for the Hilbert transform of monotone functions inequalities is finding conditions on nonnegative measurable functions. Weight inequalities for monotone
Nonexistence results for some nonlinear elliptic and parabolic inequalities with functional parametersWe obtain results on nonexistence of nontrivial nonnegative solutions for some elliptic
Description of the interpolation spaces for a pair of local Morrey-type spaces and their generalizations case of the interpolation theorem for much more general spaces defined with the help of an operator
A three-weighted Hardy-type inequality on the cone of quasimonotone functions for the norms of Hardy-type operators on the set of all nonnegative measurable functions are well known. However
On Blow-up Conditions for Solutions of Differential Inequalities with ϕ-Laplacian blow-up conditions for non-negative solutions of the problem (Formula presented.) where ϕ and F
Locally Strongly Primitive Semigroups of Nonnegative Matrices of nonnegative matrices is introduced. It is shown that, by a certain permutation similarity, all the matrices
Weighted monotonicity inequalities for traces on operator algebras, and the "weight" function w is nonnegative. © 2010 Pleiades Publishing, Ltd.
Reduction of bilinear weighted inequalities with integration operators on the cone of nondecaying functions{M}^{+} subset germ{M} the set of nonnegative functions and by germ{M}^{+}_{i} and germ{M}^{+}_{d} the subsets
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