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Wandering subspaces and quasi-wandering subspaces in the Bergman space.

Izuchi, Kou Hei (2011)

The New York Journal of Mathematics [electronic only]

Wandering subspaces and the Beurling type theorem. II.

Izuchi, Kei Ji, Izuchi, Kou Hei, Izuchi, Yuko (2010)

The New York Journal of Mathematics [electronic only]

Wave front set for positive operators and for positive elements in non-commutative convolution algebras

Joachim Toft (2007)

Studia Mathematica

Let WF⁎ be the wave front set with respect to $C^{\infty}$ , quasi analyticity or analyticity, and let K be the kernel of a positive operator from $C ₀^{\infty}$ to ’. We prove that if ξ ≠ 0 and (x,x,ξ,-ξ) ∉ WF⁎(K), then (x,y,ξ,-η) ∉ WF⁎(K) and (y,x,η,-ξ) ∉ WF⁎(K) for any y,η. We apply this property to positive elements with respect to the weighted convolution $u *_{B} φ (x) = \int u (x - y) φ (y) B (x, y) d y$ , where $B \in C^{\infty}$ is appropriate, and prove that if $(u *_{B} φ, φ) \geq 0$ for every $φ \in C ₀^{\infty}$ and (0,ξ) ∉ WF⁎(u), then (x,ξ) ∉ WF⁎(u) for any x.

Wavelet Transform and Toeplitz-Hankel Type Operators.

J. Qingtang, P. Lizhong (1992)

Mathematica Scandinavica

Weak and extra-weak type inequalities for the maximal operator and the Hilbert transform

Amiran Gogatishvili, Luboš Pick (1993)

Czechoslovak Mathematical Journal

Weak Compactness of Multiplication Operators on Spaces of Bounded Linear Operators.

Eero Saksman, Hans-Olav Tylli (1992)

Mathematica Scandinavica

Weak compactness of unconditionally convergent operators on $C_{0} (T)$

Thiruvaiyaru V. Panchapagesan (2002)

Mathematica Slovaca

Weak* convergence of iterates of Lasota-Mackey-Tyrcha operators

Wojciech Bartoszek (2001)

Colloquium Mathematicae

Weak essential spectra of multiplication operators on spaces of bounded linear operators.

Eero, Tylli, Hans-Olav Saksman (1994)

Mathematische Annalen

Weak Grothendieck's theorem.

Mezrag, Lahcène (2006)

International Journal of Mathematics and Mathematical Sciences

Weak Kato-Inequalities and Positive Semigroups.

Anton R. Schep (1985)

Mathematische Zeitschrift

Weak multiplicative operators on function algebras without units

Thomas Tonev (2010)

Banach Center Publications

For a function algebra A let ∂A be the Shilov boundary, δA the Choquet boundary, p(A) the set of p-points, and |A| = |f|: f ∈ A. Let X and Y be locally compact Hausdorff spaces and A ⊂ C(X) and B ⊂ C(Y) be dense subalgebras of function algebras without units, such that X = ∂A, Y = ∂B and p(A) = δA, p(B) = δB. We show that if Φ: |A| → |B| is an increasing bijection which is sup-norm-multiplicative, i.e. ||Φ(|f|)Φ(|g|)|| = ||fg||, f,g ∈ A, then there is a homeomorphism ψ: p(B) → p(A) with respect...

Weak spectral equivalence and weak spectral convergence

Gabriela Dinescu (1984)

Czechoslovak Mathematical Journal

Weak type (1, 1) bounds for rough operators, II.

Michael Chist, J.L. Rubio de Francia (1988)

Inventiones mathematicae

Weak type inequalities for the maximal ergodic function and the maximal ergodic Hilbert transform in weighted spaces

E. Atencia, F. Martin-Reyes (1984)

Studia Mathematica

Weak uniform continuity and weak sequential continuity of continuous n-linear mappings between Banach spaces.

Rajappa K. Asthagiri (1991)

Extracta Mathematicae

In this paper it is shown that the class LnWU (E1,E2,...,En;F) of weakly uniformly continuous n-linear mappings from E1x E2x...x En to F on bounded sets coincides with the class LnWSC (E1,E2,...,En;F) of weakly sequentially continuous n-linear mappings if and only if for every Banach space F, each Banach space Ei for i = 1,2,...,n does not contain a copy of l1.

Currently displaying 1 – 20 of 80