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We obtain (weighted) Poincaré type inequalities for vector fields satisfying the Hörmander condition for p < 1 under some assumptions on the subelliptic gradient of the function. Such inequalities hold on Boman domains associated with the underlying Carnot- Carathéodory metric. In particular, they remain true for solutions to certain classes of subelliptic equations. Our results complement the earlier results in these directions for p ≥ 1.

Subespacios de primera categoría en espacios vectoriales topológicos de Baire.

Manuel Valdivia (1983)

Collectanea Mathematica

Subespacios de un espacio escalonado de Kothe K-isomorfos a un espacio de sucesiones.

Juan C. Díaz Alcaide (1984)

Collectanea Mathematica

Subgroups and hulls of Specker lattice-ordered groups

Paul F. Conrad, Michael R. Darnel (2001)

Czechoslovak Mathematical Journal

In this article, it will be shown that every $ℓ$ -subgroup of a Specker $ℓ$ -group has singular elements and that the class of $ℓ$ -groups that are $ℓ$ -subgroups of Specker $ℓ$ -group form a torsion class. Methods of adjoining units and bases to Specker $ℓ$ -groups are then studied with respect to the generalized Boolean algebra of singular elements, as is the strongly projectable hull of a Specker $ℓ$ -group.

Subgroups of Hilbert spaces.

Tadeusz Dobrowski, Janusz Grabowski (1992)

Mathematische Zeitschrift

Subharmonicity for areal Bloch-function criteria

Shinji Yamashita (1987)

Czechoslovak Mathematical Journal

Subharmonicity in von Neumann algebras

Thomas Ransford, Michel Valley (2005)

Studia Mathematica

Let ℳ be a von Neumann algebra with unit $1_{ℳ}$ . Let τ be a faithful, normal, semifinite trace on ℳ. Given x ∈ ℳ, denote by $μ_{t} {(x)}_{t \geq 0}$ the generalized s-numbers of x, defined by $μ_{t} (x)$ = inf||xe||: e is a projection in ℳ i with $τ (1_{ℳ} - e)$ ≤ t (t ≥ 0). We prove that, if D is a complex domain and f:D → ℳ is a holomorphic function, then, for each t ≥ 0, $λ \mapsto \int_{0}^{t} l o g μ_{s} (f (λ)) d s$ is a subharmonic function on D. This generalizes earlier subharmonicity results of White and Aupetit on the singular values of matrices.

Sublinear functionals and KnoppJs core theorem.

Orhan, C. (1990)

International Journal of Mathematics and Mathematical Sciences

Sublinear Functions on R.

Edgar Berz (1975)

Aequationes mathematicae

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