Rearrangement of series. The theorem of Levy-Steiniz. - José Bonet ...

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Some references. W. Banaszczyk, The Steinitz theorem on rearrangement of series for nuclear spaces, J. reine angew. Math. 403 (1990), 187–200. W. Banaszczyk, Rearrangement of series in nonnuclear spaces, Studia Math. 107 (1993), 213–222. J. Bonet, A. Defant, The Levy-Steinitz rearrangement theorem for duals of metrizable spaces, Israel J. Math. 117 (2000), 131-156. M.I. Kadets, V.M. Kadets, Series in Banach Spaces Operator Theory: Advances and Applications 94, Birkhäuser Verlag, Basel 1997. P. Rosenthal, The remarkable theorem of Levy and Steinitz, Amer. Math. Monthly 94 (1987), 342-351. José Bonet Rearrangement of series. The theorem of Levy-Steiniz.
Page 1 and 2: Rearrangement of series. The theore
Page 3 and 4: Series � ak. Sequence of real num
Page 5 and 6: Rearrangement of series A rearrange
Page 7 and 8: Riemann (1826-1866). Riemann integr
Page 9 and 10: The Theorem of Riemann Idea of the
Page 11 and 12: The alternate harmonic series. An e
Page 13 and 14: The alternate harmonic series. A re
Page 15 and 16: The Theorem Levy Steinitz. Notation
Page 17 and 18: The Theorem Levy Steinitz. The incl
Page 19 and 20: The Theorem Levy Steinitz. Idea of
Page 21 and 22: The Theorem Levy Steinitz. The equa
Page 23 and 24: Series in infinite dimensional Bana
Page 25 and 26: The Scottish Cafe, Lvov. 2010. Jos
Page 27 and 28: The example of Marcinkiewicz. 1 0 1
Page 33 and 34: Series in infinite dimensional spac
Page 35 and 36: Series in non-metrizable spaces. Bo
Page 37 and 38: Series in non-metrizable spaces. Th
Page 39: Other open problems. Does every non

Rearrangement of series. The theorem of Levy-Steiniz. - José Bonet ...

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