Add to ORKGIn an extended abstract Ressayre considered real closed exponential fields and integer parts that respect the exponential function. He outlined a proof that every real closed exponential field has an exponential integer part. In the present paper, we give a detailed account of Ressayre's construction, which becomes canonical once we fix the real closed exponential field, a residue field section, and a well ordering of the field. The procedure is constructible over these objects; each step looks effective, but may require many steps. We produce an example of an exponential field $R$ with a residue field $k$ and a well ordering $<$ such that $D^c(R)$ is low and $k$ and $<$ are $\Delta^0_3$, and Ressayre's construction cannot be completed in $...
Shepherdson [14] showed that for a discrete ordered ring I , I is a model of IOpen iff I is an integ...
Let F be an archimedean field, G a divisible ordered abelian group and h a group exponential on G. A...
AbstractEvery Henselian field of residue characteristic 0 admits a truncation-closed embedding in a ...
Ressayre considered real closed exponential fields and exponential integer parts; i.e., integer part...
Inspired by Conway's surreal numbers, we study real closed fields whose value group is isomorphic to...
Inspired by Conway's surreal numbers, we study real closed fields whose value group is isomorphic to...
Model theoretic algebra has witnessed remarkable progress in the last few years. It has found profou...
We investigate IPA-real closed fields, that is, real closed fields which admit an integer part whose...
The exponential algebraic closure operator in an exponential field is always a pregeometry and its d...
In [K–K–S] it was shown that fields of generalized power series cannot admit an exponential function...
We prove that (additive) ordered group reducts of nonstandard models of the bounded arithmetical the...
Abstract. (1) Shepherdson proved that a discrete unitary commu-tative semi-ring A+ satisfies IE0 (in...
Exploring further the connection between exponentiation on real closed fields and the existence of a...
Abstract. Exploring further the connection between exponentia-tion on real closed fields and the exi...
We give a construction of quasiminimal fields equipped with pseudo-analytic maps, generalising Zilbe...
Shepherdson [14] showed that for a discrete ordered ring I , I is a model of IOpen iff I is an integ...
Let F be an archimedean field, G a divisible ordered abelian group and h a group exponential on G. A...
AbstractEvery Henselian field of residue characteristic 0 admits a truncation-closed embedding in a ...
Ressayre considered real closed exponential fields and exponential integer parts; i.e., integer part...
Inspired by Conway's surreal numbers, we study real closed fields whose value group is isomorphic to...
Inspired by Conway's surreal numbers, we study real closed fields whose value group is isomorphic to...
Model theoretic algebra has witnessed remarkable progress in the last few years. It has found profou...
We investigate IPA-real closed fields, that is, real closed fields which admit an integer part whose...
The exponential algebraic closure operator in an exponential field is always a pregeometry and its d...
In [K–K–S] it was shown that fields of generalized power series cannot admit an exponential function...
We prove that (additive) ordered group reducts of nonstandard models of the bounded arithmetical the...
Abstract. (1) Shepherdson proved that a discrete unitary commu-tative semi-ring A+ satisfies IE0 (in...
Exploring further the connection between exponentiation on real closed fields and the existence of a...
Abstract. Exploring further the connection between exponentia-tion on real closed fields and the exi...
We give a construction of quasiminimal fields equipped with pseudo-analytic maps, generalising Zilbe...
Shepherdson [14] showed that for a discrete ordered ring I , I is a model of IOpen iff I is an integ...
Let F be an archimedean field, G a divisible ordered abelian group and h a group exponential on G. A...
AbstractEvery Henselian field of residue characteristic 0 admits a truncation-closed embedding in a ...