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Self organize branching by Milovanov

By Milovanov

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Zeta Functions, Topology and Quantum Physics

This quantity specializes in a number of elements of zeta features: a number of zeta values, Ohno’s kinfolk, the Riemann speculation, L-functions, polylogarithms, and their interaction with different disciplines. 11 articles on contemporary advances are written by means of notable specialists within the above-mentioned fields. every one article starts off with an introductory survey resulting in the fascinating new study advancements comprehensive by way of the participants.

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On Fourier multipliers of Banach lattice-valued functions. Rev. Roumaine Math. Pures Appl. 34 (1989), no. 7, 635–642. , A covering lemma for rectangles in Rn . Proc. Amer. Math. Soc. 133 (2005), no. 11, 3235–3241 (electronic). , On equivalence of some bases to the Haar system in spaces of vector-valued functions. Bull. Polish Acad. Sci. Math. 36 (1988), no. 3-4, 119–131. , Singular integral operators: a martingale approach. Geometry of Banach spaces (Strobl, 1989), 95–110, London Math. Soc. , 158, Cambridge Univ.

34] Hytönen, T. , Anisotropic Fourier multipliers and singular integrals for vector-valued functions. Ann. Mat. , to appear. [35] Hytönen, T. , Littlewood–Paley–Stein theory for semigroups in UMD spaces. Rev. Mat. Iberoamericana, to appear. [36] Hytönen, T. , Estimates for partial derivatives of vector-valued functions. Illinois J. , to appear. , Vector-valued multiparameter singular integrals and pseudodifferential operators. Submitted, 2005. [38] Hytönen, T. , Vector-valued multiplier theorems of Coifman–Rubio de Francia–Semmes type.

Fully symmetric operator spaces. Integral Equations Operator Theory 15 (1992), no. 6, 942–972. [21] Fernandez, D. L. On Fourier multipliers of Banach lattice-valued functions. Rev. Roumaine Math. Pures Appl. 34 (1989), no. 7, 635–642. , A covering lemma for rectangles in Rn . Proc. Amer. Math. Soc. 133 (2005), no. 11, 3235–3241 (electronic). , On equivalence of some bases to the Haar system in spaces of vector-valued functions. Bull. Polish Acad. Sci. Math. 36 (1988), no. 3-4, 119–131. , Singular integral operators: a martingale approach.

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