Article
Open Access
Thinnest Covering of the Euclidean Plane with Incongruent Circles
-
Dietmar Dorninger
Published/Copyright:
April 12, 2017
Received: 2015-08-25
Accepted: 2017-03-02
Published Online: 2017-04-12
© 2017
Articles in the same Issue
- Multiscale Analysis of 1-rectifiable Measures II: Characterizations
- Thinnest Covering of the Euclidean Plane with Incongruent Circles
- Angles between Curves in Metric Measure Spaces
- Some Invariant Properties of Quasi-Möbius Maps
- Products of Snowflaked Euclidean Lines Are Not Minimal for Looking Down
- Traces of Besov, Triebel-Lizorkin and Sobolev Spaces on Metric Spaces
- A Primer on Carnot Groups: Homogenous Groups, Carnot-Carathéodory Spaces, and Regularity of Their Isometries
- A Universal Separable Diversity
Keywords for this article
circular discs;
covering of the plane;
minimum density;
conjecture of L. Fejes Tóth and J. Molnar;
upper and lower bounds
Creative Commons
BY-NC-ND 4.0
Articles in the same Issue
- Multiscale Analysis of 1-rectifiable Measures II: Characterizations
- Thinnest Covering of the Euclidean Plane with Incongruent Circles
- Angles between Curves in Metric Measure Spaces
- Some Invariant Properties of Quasi-Möbius Maps
- Products of Snowflaked Euclidean Lines Are Not Minimal for Looking Down
- Traces of Besov, Triebel-Lizorkin and Sobolev Spaces on Metric Spaces
- A Primer on Carnot Groups: Homogenous Groups, Carnot-Carathéodory Spaces, and Regularity of Their Isometries
- A Universal Separable Diversity
