Français
15. Gross and Favard m-dimensional measurements
15.1 Gross's m-dimensional measurement
Definition (Gross's m-dimensional measure) (1918). The m-dimensional measure (m is a natural number such that 0 < m < n for n > 1) known as Gross's m-dimensional measure and denoted
, is defined on a Borellian subset X of
The Ultimate Scientific and Technical Reference
A Comprehensive Knowledge Base, with over 1,200 authors and 100 scientific advisors
+ More than 10,000 articles and 1,000 how-to sheets, over 800 new or updated articles every year
From design to prototyping, right through to industrialization, the reference for securing the development of your industrial projects
This article is included in
Mathematics
This offer includes:
Knowledge Base
Updated and enriched with articles validated by our scientific committees
Services
A set of exclusive tools to complement the resources
Practical Path
Operational and didactic, to guarantee the acquisition of transversal skills
Doc & Quiz
Interactive articles with quizzes, for constructive reading
Ongoing reading
Gross and Favard m-dimensional measurements
Gross and Favard m-dimensional measurements
The fractional β-dimensional Hausdorff measure
Bibliography
The Ultimate Scientific and Technical Reference
A Comprehensive Knowledge Base, with over 1,200 authors and 100 scientific advisors
+ More than 10,000 articles and 1,000 how-to sheets, over 800 new or updated articles every year
From design to prototyping, right through to industrialization, the reference for securing the development of your industrial projects
