Title of article :
The Keisler Order in Continuous Logic
Author/Authors :
Ackerman ، Nathanael Leedom Department of Mathematics - School of Mathematics - Harvard University , Karker ، Mary Leah Department of Mathematics and Computer Science - School of Mathematics - Providence College
Abstract :
We extend the Keisler order to continuous first-order theories. In the process, we show that if F is a λ-regular filter on I , and Mi i∈I , Ni i∈I are sequences of continuous structures in the same language such that ΠF Mi and ΠF Ni have the same continuous first-order theory, then the classical structures corresponding to ΠF Mi and ΠF Ni satisfy the same sentences of L∞,λ + of alternating quantifier rank at most (λ).
Keywords :
Keisler order , Ultraproducts , Reduced products , Continuous logic , Complete metric structures
Journal title :
Bulletin of the Iranian Mathematical Society
Journal title :
Bulletin of the Iranian Mathematical Society
