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27 Feb 2015: Nj=1 ‖γ(tj) γ(tj1)‖ where the sup is taken over all. finite partitions 0 = t0 < t1 <. < tN = 1. (i) Give an example for which (γ) =. If γ is continuously

4 Apr 2015: We may now pick increasingsequences kneav vn < tj, with supn?/n = 7/ and vn = supl. ... For any limit A less thanK, write A = w.tj, copy 1̂ to each [w.v, w.

20 May 2015: with λi F and ti Tr. Since {e1,. ,er1} is linearly independent there must besome 1 6 j 6 k such that λj 6= 0 and tj 6 {e1,. ... er}. Let T ′r1 = T ′r {tj} and. Tr1 = (TT ′r1) {e1,.

2 Dec 2015: er1} is linearly independent there must besome 1 6 j 6 k such that λj 6= 0 and tj 6 {e1,. ... er}. Let T ′r1 = T ′r {tj} and. Tr1 = (TT ′r1) {e1,.

11 Sep 2015: αk 7 αk1 7. 7 α2 7 α1 and. (6) 〈αj,β〉 = 0 for all β Sel(tj) and 1 j k.

2 Apr 2015: Annals of Mathematical Logic 12 (1977). 5%111 North-Holland Publishing Company. HAPPY F A M I L I E S. A. R. D. M A T H I A S Peerhouse, Cambridge, U.K. Received 5 Jamary 1976. To Ronald Jensen. O. Definitions and description of the results. T h i s

4 Apr 2015: The Strength of Mac Lane Set Theory. A. R. D. MATHIAS. Département de Mathématiques et Informatique. Université de la Réunion. To Saunders Mac Lane on his ninetieth birthday. Abstract. SAUNDERS MAC LANE has drawn attention many times,