Transversal Mappings between Manifolds and Non-Trivial Measures on Visible Parts

Esa Järvenpää, Maarit Järvenpää, Juho Niemelä

Type: Article

Publication Date: 2005-01-01

Citations: 9

DOI: https://doi.org/10.14321/realanalexch.30.2.0675

Abstract

This paper has two aims. On the one hand, we generalize the notion of sliced measures by means of transversal mappings and study dimensional properties of these measures. On the other hand, as an application of these results, we explain in what sense typical visible parts of a set with large Hausdorff dimension are smaller than the set itself. This is achieved by establishing a connection between dimensional properties of generalized slices and those of visible parts.

Locations

Real Analysis Exchange - View
Project Euclid (Cornell University) - View - PDF

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Action	Title	Year	Authors
+	On dimensions of visible parts of self-similar sets with finite rotation groups	2021	Esa Järvenpää Maarit Järvenpää Ville Suomala Meng Wu
+	The dimension spectrum of projected measures on Riemann manifolds	2010	Risto Hovila
+	PACKING DIMENSIONS, TRANSVERSAL MAPPINGS AND GEODESIC FLOWS	2004	Mika Leikas
+	One-dimensional families of projections	2008	Esa Järvenpää Maarit Järvenpää F. Ledrappier Mika Leikas
+	On the dimension of visible parts	2022	Tuomas Orponen
+ PDF Chat	Slicing Sets and Measures, and the Dimension of Exceptional Parameters	2012	Tuomas Orponen
+ PDF Chat	Some Variants of Orponen’s Theorem on Visible Parts of Fractal Sets	2021	Carlos Matheus
+	PROJECTED MEASURES ON MANIFOLDS AND INCOMPLETE PROJECTION FAMILIES	2007	Ur Mathematik Und Statistik
+ PDF Chat	Besicovitch-Federer projection theorem and geodesic flows on Riemann surfaces	2012	Risto Hovila Esa Järvenpää Maarit Järvenpää François Ledrappier

Works Cited by This (4)

Action	Title	Year	Authors
+	Geometric Measure Theory	1988	Herbert Fédérer
+	Geometry of Sets and Measures in Euclidean Spaces: Fractals and Rectifiability	1995	Pertti Mattila
+	Visible parts and dimensions	2003	Esa J rvenp Maarit J rvenp Paul MacManus Toby C. O’Neil
+	Smoothness of projections, Bernoulli convolutions, and the dimension of exceptions	2000	Yuval Peres Wilhelm Schlag