Add to ORKGAbstract. We investigate the relation between the theory of the itera-tions in the sense of Shelah-Stupp and of Muchnik, resp., and the theory of the base structure for several logics. These logics are obtained from the restriction of set quantification in monadic second order logic to cer-tain subsets like, e.g., finite sets, chains, and finite unions of chains. We show that these theories of the Shelah-Stupp iteration can be reduced to corresponding theories of the base structure. This fails for Muchnik’s iteration.
AbstractWe investigate the monadic logic of trees with ω + 1 levels, the monadic topology of the pro...
. We show that every formula of the existential fragment of monadic second-order logic over picture ...
International audienceWe provide a characterization theorem, in the style of van Benthem and Janin-W...
We investigate the relation between the theory of the itera- tions in the sense of Shelah-Stupp and ...
We investigate the relation between the theory of the iterations in the sense of Shelah-Stupp and...
We investigate the relation between the theory of the iterations in the sense of Shelah-Stupp and ...
International audienceIn the early seventies, Shelah proposed a model-theoretic construction, nowada...
AbstractIn this paper, we explore the expressive power of fragments of monadic second-order logic en...
We study an extension of monadic second-order logic of order with the uncountability quantifier ``th...
We study an extension of monadic second-order logic of order with the uncountability quantifier ``th...
Various recent results about monadic second order logic and its fragments are presented. These resul...
AbstractVarious recent results about monadic second order logic and its fragments are presented. The...
Since the work of Rabin [9], it has been known that any monadic second order property of the (labele...
Abstract. Rationals and countable ordinals are important examples of structures with decidable monad...
AbstractIt is a well-known result of Fagin that the complexity class NP coincides with the class of ...
AbstractWe investigate the monadic logic of trees with ω + 1 levels, the monadic topology of the pro...
. We show that every formula of the existential fragment of monadic second-order logic over picture ...
International audienceWe provide a characterization theorem, in the style of van Benthem and Janin-W...
We investigate the relation between the theory of the itera- tions in the sense of Shelah-Stupp and ...
We investigate the relation between the theory of the iterations in the sense of Shelah-Stupp and...
We investigate the relation between the theory of the iterations in the sense of Shelah-Stupp and ...
International audienceIn the early seventies, Shelah proposed a model-theoretic construction, nowada...
AbstractIn this paper, we explore the expressive power of fragments of monadic second-order logic en...
We study an extension of monadic second-order logic of order with the uncountability quantifier ``th...
We study an extension of monadic second-order logic of order with the uncountability quantifier ``th...
Various recent results about monadic second order logic and its fragments are presented. These resul...
AbstractVarious recent results about monadic second order logic and its fragments are presented. The...
Since the work of Rabin [9], it has been known that any monadic second order property of the (labele...
Abstract. Rationals and countable ordinals are important examples of structures with decidable monad...
AbstractIt is a well-known result of Fagin that the complexity class NP coincides with the class of ...
AbstractWe investigate the monadic logic of trees with ω + 1 levels, the monadic topology of the pro...
. We show that every formula of the existential fragment of monadic second-order logic over picture ...
International audienceWe provide a characterization theorem, in the style of van Benthem and Janin-W...