Title

Some examples of almost sure theories in continuous logic

Abstract

There are many ways of building continuous objects out of finite dimensional objects, among them continuous Fraïssé limits and ultraproducts. We will explore these constructions on basic continuous objects like infinite dimensional Hilbert spaces and atomless probability algebras and show they are the almost sure limit of the common theory of their finite (dimensional) approximations. This is joint work with Carolina Upegui.

Access to the event

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