In this paper we prove that in modules, MS-measurability (in the sense of Macpherson–Steinhorn) depends on being able to define a measure function on the p.p. definable subgroups. We give a classification of abelian groups in terms of measurability. Finally we discuss the relation with ℚ[t] -valued measures
Ulam proved that there cannot exist a probability measure on the reals for which every set is measur...
AbstractWe deal with the normalizer N[T] of the full group [T] of a nonsingular transformation T of ...
We give examples of (i) a simple theory with a formula (with parameters) which does not fork over th...
In this paper we prove that in modules, MS-measurability (in the sense of Macpherson-Steinhorn) depe...
In this paper we prove that in modules, MS-measurability (in the sense of Macpherson–Steinhorn) depe...
Originally developed [17] as a generalization of dimension and measure on pseudofinite fields, MS-me...
Coding devices in Peano arithmetic (PA) allow complicated finite objects such as groups to be encode...
Given an o-minimal structure M which expands a field, we define, for each positive integer d, a real...
Using an infinitary version of the Hypergraph Removal Lemma due to Towsner, we prove a model-theoret...
This is a note - set in the background of some historic comments - discussing the relationship betwe...
We develop a theory of commensurability of groups, of rings, and of modules. It allows us, in certai...
We present some results about the burgeoning research area concerning set theory of the "kappa-reals...
Positive motivic measures are counting measures Jordan S. Ellenberg and Michael Larsen A motivic mea...
Abstract. Let X be an arbitrary nonempty set and a lattice of subsets of X such that φ, X∈. () is t...
In this paper we show that if $(X,\mathcal{A})$ is a measurable space and if $Y$ is a topological mo...
Ulam proved that there cannot exist a probability measure on the reals for which every set is measur...
AbstractWe deal with the normalizer N[T] of the full group [T] of a nonsingular transformation T of ...
We give examples of (i) a simple theory with a formula (with parameters) which does not fork over th...
In this paper we prove that in modules, MS-measurability (in the sense of Macpherson-Steinhorn) depe...
In this paper we prove that in modules, MS-measurability (in the sense of Macpherson–Steinhorn) depe...
Originally developed [17] as a generalization of dimension and measure on pseudofinite fields, MS-me...
Coding devices in Peano arithmetic (PA) allow complicated finite objects such as groups to be encode...
Given an o-minimal structure M which expands a field, we define, for each positive integer d, a real...
Using an infinitary version of the Hypergraph Removal Lemma due to Towsner, we prove a model-theoret...
This is a note - set in the background of some historic comments - discussing the relationship betwe...
We develop a theory of commensurability of groups, of rings, and of modules. It allows us, in certai...
We present some results about the burgeoning research area concerning set theory of the "kappa-reals...
Positive motivic measures are counting measures Jordan S. Ellenberg and Michael Larsen A motivic mea...
Abstract. Let X be an arbitrary nonempty set and a lattice of subsets of X such that φ, X∈. () is t...
In this paper we show that if $(X,\mathcal{A})$ is a measurable space and if $Y$ is a topological mo...
Ulam proved that there cannot exist a probability measure on the reals for which every set is measur...
AbstractWe deal with the normalizer N[T] of the full group [T] of a nonsingular transformation T of ...
We give examples of (i) a simple theory with a formula (with parameters) which does not fork over th...
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