Citation: M. Kojman et S. Shelah, A ZFC DOWKER SPACE IN ALEPH(OMEGA- AN APPLICATION OF PCF THEORY TO TOPOLOGY(1) ), Proceedings of the American Mathematical Society, 126(8), 1998, pp. 2459-2465
Citation: Pc. Eklof et S. Shelah, THE KAPLANSKY TEST PROBLEMS FOR ALEPH-1-SEPARABLE GROUPS, Proceedings of the American Mathematical Society, 126(7), 1998, pp. 1901-1907
Citation: M. Gilchrist et S. Shelah, THE CONSISTENCY OF -ALEPH(OMEGA)+J(ALEPH(2))=J(ALEPH(OMEGA))(2(ALEPH), The Journal of symbolic logic, 62(4), 1997, pp. 1151-1160
Citation: S. Lifsches et S. Shelah, PEANO ARITHMETIC MAY NOT BE INTERPRETABLE IN THE MONADIC THEORY OF LINEAR ORDERS, The Journal of symbolic logic, 62(3), 1997, pp. 848-872
Citation: Kc. Liu et S. Shelah, COFINALITIES OF ELEMENTARY SUBSTRUCTURES OF STRUCTURES ON ALEPH(W), Israel Journal of Mathematics, 99, 1997, pp. 189-205
Citation: Aw. Apter et S. Shelah, ON THE STRONG EQUALITY BETWEEN SUPERCOMPACTNESS AND STRONG COMPACTNESS, Transactions of the American Mathematical Society, 349(1), 1997, pp. 103-128
Citation: S. Shelah, VERY WEAK ZERO-ONE LAW FOR RANDOM GRAPHS WITH ORDER AND RANDOM BINARYFUNCTIONS, Random structures & algorithms, 9(4), 1996, pp. 351-358
Citation: S. Shelah, IN THE RANDOM GRAPH G(N,P), P=N(-A) - IF PSI HAS PROBABILITY O(N(-EPSILON)) FOR EVERY EPSILON-GREATER-THAN-0 THEN IT HAS PROBABILITY O(E(-N(EPSILON))) FOR SOME EPSILON-GREATER-THAN-0, Annals of pure and applied Logic, 82(1), 1996, pp. 97-102