## Set theory of the reals. Proceedings of a winter institute on set theory of the reals held at Bar-Ilan University, Ramat-Gan (Israel), January 1991.(English)Zbl 0821.00016

Israel Mathematical Conference Proceedings. 6. Providence, RI: American Mathematical Society (Distrib.), Ramat-Gan: Bar-Ilan University, viii, 654 p. (1993).
The articles of this volume will be reviewed individually.
Indexed articles:
Shelah, Saharon, The future of set theory, 1-12 [Zbl 0839.03028]
Bartoszynski, Tomek; Judah, Haim, Strong measure zero sets, 13-62 [Zbl 0840.03034]
Blass, Andreas, Simple cardinal characteristics of the continuum, 63-90 [Zbl 0828.03019]
Brendle, Jörg, Set theoretic aspects of non-Abelian groups, 91-105 [Zbl 0841.20037]
Bukovsky, Lev, Thin sets related to trigonometric series, 107-118 [Zbl 0826.04002]
Burke, Max, Liftings for Lebesgue measure, 119-150 [Zbl 0840.03038]
Fremlin, D. H., Real-valued-measurable cardinals, 151-304 [Zbl 0839.03038]
Goldstern, Martin, Tools for your forcing construction, 305-360 [Zbl 0834.03016]
Judah, Haim, $$\Delta_ 3^ 1$$-sets of reals, 361-384 [Zbl 0828.03020]
Judah, Haim; Roslanowski, Andrzej, On Shelah’s amalgamation, 385-414 [Zbl 0828.03021]
Miller, Arnold W., Special sets of reals, 415-431 [Zbl 0828.03022]
Repicky, Miroslav, Cardinal invariants related to porous sets, 433-438 [Zbl 0828.04001]
Scheepers, Marion, Gaps in $$\omega^{\omega}$$, 439-561 [Zbl 0840.03037]
Spinas, Otmar, Cardinal invariants and quadratic forms, 563-581 [Zbl 0836.03026]
Steprāns, Juris, Combinatorial consequences of adding Cohen reals, 583-617 [Zbl 0839.03037]
Vojtáš, Peter, Generalized Galois-Tukey-connections between explicit relations on classical objects of real analysis, 619-643 [Zbl 0829.03027]
Miller, Arnold W., Arnie Miller’s problem list, 645-654 [Zbl 0828.03017]

### MSC:

 00B25 Proceedings of conferences of miscellaneous specific interest 03-06 Proceedings, conferences, collections, etc. pertaining to mathematical logic and foundations

### Keywords:

Proceedings; Set theory; Ramat-Gan (Israel); Reals