Erratum to: Inexpressible properties and Grelling’s antinomy

Philos Stud (2010) 151:329–330 DOI 10.1007/s11098-010-9592-2 ERRATUM Erratum to: Inexpressible properties and Grelling’s antinomy Benjamin Schnieder Published online: 31 July 2010 Ó Springer Science+Business Media B.V. 2010 Erratum to: Philos Stud (2010) 148:369–385 DOI 10.1007/s11098-008-9329-7 Unfortunately, negation signs are missing throughout the article. The following passages are affected: Page 374 Barber$ The said barber shaves himself $ the said barber shaves himself, should read Barber$ The said barber shaves himself $ : the said barber shaves himself, Page 374 Set$ The said set contains itself $ the said set contains itself, should read Set$ The said set contains itself $ : the said set contains itself, Page 377 Predicate$ The said predicate applies to itself $ the said predicate applies to itself. The online version of the original article can be found under doi:10.1007/s11098-008-9329-7. B. Schnieder (&) Institut für Philosophie, Humboldt-Universität zu Berlin, Unter den Linden 6, Berlin 10099, Germany e-mail: 123 330 B. Schnieder should read Predicate$ The said predicate applies to itself $ : the said predicate applies to itself. Page 383 The derivation should read: 1 (1) P* exists A 2 (2) t expresses P* A 2, Ex (3) Vx (t applies to x $ x has P*) 2, Ex 1, DN (4) Vx (x has P* $ : x applies to x) 1, DN* 1, 2, DN, Ex (5) Vx (t applies to x $ : x applies to x) 3, 4 FOPL 1, 2, DN, Ex (6) t applies to t $ : t applies to t 4 VE 1, DN, Ex (7) : t expresses P* 6,2 FOPL (RAA) 1, DN, Ex (8) Vy : y expresses P* 6, VI Page 384 The derivation should read: 1 (1) a is a member of S A 2 (2) Vy (y is a member of S ? (a bears R to y $ : y bears R to y)) A 3 (3) Vx (x is a member of S ? (x bears R to x _ : x bears R to x)) A 1,2 (4) a bears R to a $ : a bears R to a 2VE; 1,2 MPP 1,3 (5) a bears R to a _ : a bears R to a 3VE; 1,3 MPP 6 (6) a bears R to a A 6,4 $E 1,2,6 (7) : a bears R to a 1,2,6 (8) a bears R to a & : a bears R to a 7,8 &I 9 (9) : a bears R to a A 1,2,9 (10) a bears R to a 9,4 $E 1,2,9 (11) a bears R to a & : a bears R to a 9,10 &I 1,2,3 (12) a bears R to a & : a bears R to a 5,6,8,9,11 _E 123  (...truncated)