Shrub-depth is a graph invariant often considered as an extension of tree-depth to dense graphs. We show that the model-checking problem of monadic second-order logic on a class of graphs of bounded shrub-depth can be decided by AC^0-circuits after a precomputation on the formula. This generalizes a similar result on graphs of bounded tree-depth [Y. Chen and J. Flum, 2018]. At the core of our proof is the definability in first-order logic of tree-models for graphs of bounded shrub-depth
One of the most important algorithmic meta-theorems is a famous result by Courcelle, which states th...
We prove that every recognizable family of graphs of bounded treewidth and bounded chordality is def...
AbstractThe model-checking problem for monadic second-order logic on graphs is fixed-parameter tract...
Recent characterization [9] of those graphs for which coloured MSO2 model checking is fast raised th...
We prove, in the universe of trees of bounded height, that for any MSO formula with $m$ variables th...
Shrub-depth is a width measure of graphs which, roughly speaking, corresponds to the smallest depth ...
An algorithmic meta theorem for a logic and a class C of structures states that all problems express...
Shrub-depth and rank-depth are dense analogues of the tree-depth of a graph. It is well known that a...
Courcelle’s famous theorem from 1990 states that any property of graphs definable in monadic second-...
A well-known result by Frick and Grohe shows that deciding FO logic on treesinvolves a parameter dep...
The model-checking problem for monadic second-order logic on graphs is fixed-parameter tractable wit...
The recent increase of interest in the graph invariant called tree-depth andin its applications in a...
© 2020 The Author(s). We present a concept called the branch-depth of a connectivity function, that ...
AbstractIt is well known that on classes of graphs of bounded tree-width, every monadic second-order...
In this survey, we review practical algorithms for graph-theoretic problems that are expressible in ...
One of the most important algorithmic meta-theorems is a famous result by Courcelle, which states th...
We prove that every recognizable family of graphs of bounded treewidth and bounded chordality is def...
AbstractThe model-checking problem for monadic second-order logic on graphs is fixed-parameter tract...
Recent characterization [9] of those graphs for which coloured MSO2 model checking is fast raised th...
We prove, in the universe of trees of bounded height, that for any MSO formula with $m$ variables th...
Shrub-depth is a width measure of graphs which, roughly speaking, corresponds to the smallest depth ...
An algorithmic meta theorem for a logic and a class C of structures states that all problems express...
Shrub-depth and rank-depth are dense analogues of the tree-depth of a graph. It is well known that a...
Courcelle’s famous theorem from 1990 states that any property of graphs definable in monadic second-...
A well-known result by Frick and Grohe shows that deciding FO logic on treesinvolves a parameter dep...
The model-checking problem for monadic second-order logic on graphs is fixed-parameter tractable wit...
The recent increase of interest in the graph invariant called tree-depth andin its applications in a...
© 2020 The Author(s). We present a concept called the branch-depth of a connectivity function, that ...
AbstractIt is well known that on classes of graphs of bounded tree-width, every monadic second-order...
In this survey, we review practical algorithms for graph-theoretic problems that are expressible in ...
One of the most important algorithmic meta-theorems is a famous result by Courcelle, which states th...
We prove that every recognizable family of graphs of bounded treewidth and bounded chordality is def...
AbstractThe model-checking problem for monadic second-order logic on graphs is fixed-parameter tract...