Add to ORKGIn this paper we present a simple proof of Gowers Dichotomy which states that every infinite dimensional Banach Space has a subspace which either contains an unconditional basic sequence or is hereditarily indecomposable. Our approach is purely combinatorial and mainly based on work of Ellentuck, Galvin and Prikry in infinite Ramsey theory
AbstractUsing the T1 theorem for the Besov and Triebel–Lizorkin spaces, we give new characterization...
summary:The Hahn--Banach theorem implies that if $m$ is a one dimensional subspace of a t.v.s. $E$, ...
summary:The Hahn--Banach theorem implies that if $m$ is a one dimensional subspace of a t.v.s. $E$, ...
In this paper we present a simple proof of Gowers Dichotomy which states that every infinite dimensi...
AbstractWe correct the proof of Theorem 8 in “Normality and countable paracompactness of hyperspaces...
AbstractWe determine when there exists a nonzero homomorphism between principal series representatio...
The theory of KMS weights is based on a theorem of Combes and a theorem of Kustermans. In applicatio...
AbstractThe domain D(δ2) of the square of a closed ∗-derivation δ in C(K) (K is a compact Hausdorff ...
AbstractIn contrast to the famous Henkin–Skoda theorem concerning the zero varieties of holomorphic ...
In this paper we introduce new spaces of holomorphic functions on the pointed unit disc of $\mathbb ...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
International audienceLemma C.1 in [R. Veltz and O. Faugeras, SIAM J. Math. Anal., 45(3) (2013), pp....
AbstractThe purpose of the paper is for any compactum K⊂Rn to construct a space Cp(K) of commutative...
AbstractExamples of coupled Euler–Bernoulli beams with pointwise dissipation are considered. Exponen...
AbstractAn interesting criterion was given by Ponnusamy and Singh [S. Ponnusamy, V. Singh, Convoluti...
AbstractUsing the T1 theorem for the Besov and Triebel–Lizorkin spaces, we give new characterization...
summary:The Hahn--Banach theorem implies that if $m$ is a one dimensional subspace of a t.v.s. $E$, ...
summary:The Hahn--Banach theorem implies that if $m$ is a one dimensional subspace of a t.v.s. $E$, ...
In this paper we present a simple proof of Gowers Dichotomy which states that every infinite dimensi...
AbstractWe correct the proof of Theorem 8 in “Normality and countable paracompactness of hyperspaces...
AbstractWe determine when there exists a nonzero homomorphism between principal series representatio...
The theory of KMS weights is based on a theorem of Combes and a theorem of Kustermans. In applicatio...
AbstractThe domain D(δ2) of the square of a closed ∗-derivation δ in C(K) (K is a compact Hausdorff ...
AbstractIn contrast to the famous Henkin–Skoda theorem concerning the zero varieties of holomorphic ...
In this paper we introduce new spaces of holomorphic functions on the pointed unit disc of $\mathbb ...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
International audienceLemma C.1 in [R. Veltz and O. Faugeras, SIAM J. Math. Anal., 45(3) (2013), pp....
AbstractThe purpose of the paper is for any compactum K⊂Rn to construct a space Cp(K) of commutative...
AbstractExamples of coupled Euler–Bernoulli beams with pointwise dissipation are considered. Exponen...
AbstractAn interesting criterion was given by Ponnusamy and Singh [S. Ponnusamy, V. Singh, Convoluti...
AbstractUsing the T1 theorem for the Besov and Triebel–Lizorkin spaces, we give new characterization...
summary:The Hahn--Banach theorem implies that if $m$ is a one dimensional subspace of a t.v.s. $E$, ...
summary:The Hahn--Banach theorem implies that if $m$ is a one dimensional subspace of a t.v.s. $E$, ...