"50" . "Z(MSM 113200007)" . "A Banach space is Plichko (1-Plichko) if it has a countably (1-)norming M-basis. We introduce a subclass of Plichko spaces strictly containing WLD spaces closed to subspaces and quotients. Further we show that each quotient of C[0,omega_1] is 1-Plichko." . "Note on Markushevich Bases in Subspaces and Quotients of Banach Spaces" . . "1"^^ . "117;126" . "10"^^ . "RIV/00216208:11320/02:00003751" . "0"^^ . "1"^^ . . "0"^^ . . "Kalenda, Ond\u0159ej" . . . "[A5200C6C4920]" . . "2" . "655843" . . . "RIV/00216208:11320/02:00003751!RIV/2003/MSM/113203/N" . "Markushevich;Bases;Subspaces;Quotients;Banach;Spaces"@en . . . "Note on Markushevich Bases in Subspaces and Quotients of Banach Spaces"@en . . "0239-7269" . "Bulletin of the Polish Academy of Sciences. Mathematics" . . . "Note on Markushevich Bases in Subspaces and Quotients of Banach Spaces"@en . . . "11320" . "PL - Polsk\u00E1 republika" . "A Banach space is Plichko (1-Plichko) if it has a countably (1-)norming M-basis. We introduce a subclass of Plichko spaces strictly containing WLD spaces closed to subspaces and quotients. Further we show that each quotient of C[0,omega_1] is 1-Plichko."@en . . . "Note on Markushevich Bases in Subspaces and Quotients of Banach Spaces" . .