The papers included in this volume deal with the following topics: convex analysis, operator theory, interpolation theory, theory of real functions, theory of analytic functions, bifurcation theory, Fourier analysis, functional analysis, measure theory, geometry of Banach spaces, history of mathematics.
Taylor spaces - a survey, Yu Brudnyj; Fourier analysis of operators on Hilbert spaces of holomorphic functions, V. Lusky; on extension property of cantor-type sets, A. Goncharov; on absolutely summing operators from C(K) with values in a Banach lattice, C. Michels; images of operators on rearrangement invariant spaces and interpolation, S. Astashkin; discountinuous functions and Arzela theorem, I. Bula; on a generalization of Tauberian operators, S. Falcon; bifurcation system in the root subspace - their relation, symmetry and reduction, B. Loginov and I. Konopleva; some remarks on hyperconvex metric spaces and the small ball property, M. Borkowski et al; on property beta and orthogonal convexities in generalized Calderon-Lozanovsky sequence spaces, P. Kolwicz; vector measures with variation in a Banach function space, O. Blasco and P. Gregori; characterization of the maximal operator ideals associated to the tensor norm defined by a sequence space, J.A.L. Molina and M.J. Rivera. (Part contents)
