Add to ORKGWe show that if $X$ is virtually any classical fractal subset of $\mathbb{R}^n$, then $(\mathbb{R},<,+,X)$ interprets the monadic second order theory of $(\mathbb{N},+1)$. This result is sharp in the sense that the standard model of the monadic second order theory of $(\mathbb{N},+1)$ is known to interpret $(\mathbb{R},<,+,X)$ for various classical fractals $X$ including the middle-thirds Cantor set and the Sierpinski carpet. Let $X \subseteq \mathbb{R}^n$ be closed and nonempty. We show that if the $C^k$-smooth points of $X$ are not dense in $X$ for some $k \geq 1$, then $(\mathbb{R},<,+,X)$ interprets the monadic second order theory of $(\mathbb{N},+1)$. The same conclusion holds if the packing dimension of $X$ is strictly greater than th...
AbstractFor any property θ of a model (or graph), let μn(θ) be the fraction of models of power n whi...
We prove that every Peano continuum with uncountably many local cut points is a topological fractal....
AbstractIt is a well-known result of Fagin that the complexity class NP coincides with the class of ...
We show that if $X$ is virtually any classical fractal subset of $\mathbb{R}^n$, then $(\mathbb{R},<...
How many fractals exist in nature or the virtual world In this work, we partially answer the second ...
True first-order arithmetic is interpreted in the monadic theories of certain chains and topological...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
The aim of this note is to present an elementary way to fractals which completely avoids advanced a...
The idea of fractals is relatively new, but their roots date back to 19th century mathematics. A fra...
AbstractIt is a well-known result of Fagin that the complexity class NP coincides with the class of ...
Given a complete theory $T$ and a subset $Y \subseteq X^k$, we precisely determine the {\em worst ca...
We produce an example of a Cantor set K such that for any definable map (in an o-minimal structure e...
The notion of an o-minimal expansion of the ordered field of real numbers was invented by L van den ...
The idea of fractals is relatively new, but their roots date back to 19th century mathematics. A fra...
This paper seeks to build on the extensive connections that have arisen between automata theory, com...
AbstractFor any property θ of a model (or graph), let μn(θ) be the fraction of models of power n whi...
We prove that every Peano continuum with uncountably many local cut points is a topological fractal....
AbstractIt is a well-known result of Fagin that the complexity class NP coincides with the class of ...
We show that if $X$ is virtually any classical fractal subset of $\mathbb{R}^n$, then $(\mathbb{R},<...
How many fractals exist in nature or the virtual world In this work, we partially answer the second ...
True first-order arithmetic is interpreted in the monadic theories of certain chains and topological...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
The aim of this note is to present an elementary way to fractals which completely avoids advanced a...
The idea of fractals is relatively new, but their roots date back to 19th century mathematics. A fra...
AbstractIt is a well-known result of Fagin that the complexity class NP coincides with the class of ...
Given a complete theory $T$ and a subset $Y \subseteq X^k$, we precisely determine the {\em worst ca...
We produce an example of a Cantor set K such that for any definable map (in an o-minimal structure e...
The notion of an o-minimal expansion of the ordered field of real numbers was invented by L van den ...
The idea of fractals is relatively new, but their roots date back to 19th century mathematics. A fra...
This paper seeks to build on the extensive connections that have arisen between automata theory, com...
AbstractFor any property θ of a model (or graph), let μn(θ) be the fraction of models of power n whi...
We prove that every Peano continuum with uncountably many local cut points is a topological fractal....
AbstractIt is a well-known result of Fagin that the complexity class NP coincides with the class of ...