Add to ORKGWe compare different invariance concepts for a Borel measure μ on a metric space, μ is called open-invariant if open isometric sets have equal measure, metrically invariant if isometric Borel sets have equal measure, and strongly invariant if any non-expansive image of A has measuure < μ(A). On common hyperspaces of compact and compact convex sets there are no metrically invariant measures. A locally compact metric space is called locally homogeneous if any two points have isometric neighbourhoods, the isometry transforming one point into the other. On such a space there is a unique open-invariant measure, and this measure is even strongly invariant. 1. Introduction. Ther
Every quotient image of a metric space is actually the quotient image of a locally compact metric sp...
In this study, we consider the space [InlineEquation not available: see fulltext.] with an invariant...
Let (M;d) be a metric space. We prove that when the group of homo-theties H(M;d) is a locally compac...
For every metric space ▫$X$▫ we introduce two cardinal characteristics ▫${rm cov}^flat(X)$▫ and ▫${r...
Many infinite dimensional topological spaces come with natural uniform structure, often associated ...
Let X be a complete metric space, and S the union of a finite number of strict contractions on it. I...
The most known fractals are invariant sets with respect to a system of contraction maps, especially ...
Given a measure space X and a self map T: X ~ X one can show the existence of a T-invariant measure ...
The class of all invariant measures of a transformation, or a flow, is an important aspect of its dy...
Abstract. This is a preliminary version of my PhD thesis. In this text we discuss possible ways to g...
Graduation date: 1971First, topological vector spaces are examined from a partial\ud order structure...
Let us denote $\lambda$ the Lebesgue measure on $[0,1]$, put$$ C(\lambda)=\{f\in C([0,1]);\ \forall~...
AbstractWe construct a compact homogeneous space bH which has a Borel measure μ which knows which se...
Abstract We define restricted entropy and Lq-dimensions of measures in doubling metric spaces and s...
Two equivalent metrics can be compared, with respect to their uniform properties, in several differe...
Every quotient image of a metric space is actually the quotient image of a locally compact metric sp...
In this study, we consider the space [InlineEquation not available: see fulltext.] with an invariant...
Let (M;d) be a metric space. We prove that when the group of homo-theties H(M;d) is a locally compac...
For every metric space ▫$X$▫ we introduce two cardinal characteristics ▫${rm cov}^flat(X)$▫ and ▫${r...
Many infinite dimensional topological spaces come with natural uniform structure, often associated ...
Let X be a complete metric space, and S the union of a finite number of strict contractions on it. I...
The most known fractals are invariant sets with respect to a system of contraction maps, especially ...
Given a measure space X and a self map T: X ~ X one can show the existence of a T-invariant measure ...
The class of all invariant measures of a transformation, or a flow, is an important aspect of its dy...
Abstract. This is a preliminary version of my PhD thesis. In this text we discuss possible ways to g...
Graduation date: 1971First, topological vector spaces are examined from a partial\ud order structure...
Let us denote $\lambda$ the Lebesgue measure on $[0,1]$, put$$ C(\lambda)=\{f\in C([0,1]);\ \forall~...
AbstractWe construct a compact homogeneous space bH which has a Borel measure μ which knows which se...
Abstract We define restricted entropy and Lq-dimensions of measures in doubling metric spaces and s...
Two equivalent metrics can be compared, with respect to their uniform properties, in several differe...
Every quotient image of a metric space is actually the quotient image of a locally compact metric sp...
In this study, we consider the space [InlineEquation not available: see fulltext.] with an invariant...
Let (M;d) be a metric space. We prove that when the group of homo-theties H(M;d) is a locally compac...