TY - JOUR
T1 - Cohen Preservation and Independence
AU - Fischer, Vera
AU - Switzer, Corey Bacal
PY - 2023/8
Y1 - 2023/8
N2 - We provide a general preservation theorem for preserving selective independent families along countable support iterations. The theorem gives a general framework for a number of results in the literature concerning models in which the independence number i is strictly below c, including iterations of Sacks forcing, Miller partition forcing, h-perfect tree forcings, coding with perfect trees. Moreover, applying the theorem, we show that i=ℵ
1 in the Miller Lite model. An important aspect of the preservation theorem is the notion of “Cohen preservation”, which we discuss in detail.
AB - We provide a general preservation theorem for preserving selective independent families along countable support iterations. The theorem gives a general framework for a number of results in the literature concerning models in which the independence number i is strictly below c, including iterations of Sacks forcing, Miller partition forcing, h-perfect tree forcings, coding with perfect trees. Moreover, applying the theorem, we show that i=ℵ
1 in the Miller Lite model. An important aspect of the preservation theorem is the notion of “Cohen preservation”, which we discuss in detail.
KW - Cardinal characteristics
KW - Cohen preservation
KW - Preservation of independent families
KW - Selective independent families
UR - http://www.scopus.com/inward/record.url?scp=85161003168&partnerID=8YFLogxK
U2 - 10.1016/j.apal.2023.103291
DO - 10.1016/j.apal.2023.103291
M3 - Article
SN - 0168-0072
VL - 174
JO - Annals of Pure and Applied Logic
JF - Annals of Pure and Applied Logic
IS - 8
M1 - 103291
ER -