Integral geometry and geometric probability /
Santaló, Luis A. 1911-2001
Integral geometry and geometric probability / Integral Geometry & Geometric Probability Luis A. Santaló ; with a foreword by Mark Kac. - Second edition. - Cambridge : Cambridge University Press, 2004. - 1 online resource (xvii, 404 pages) : digital, PDF file(s). - Cambridge mathematical library . - Cambridge mathematical library. .
Title from publisher's bibliographic system (viewed on 05 Oct 2015).
Now available in the Cambridge Mathematical Library, the classic work from Luis Santaló. Integral geometry originated with problems on geometrical probability and convex bodies. Its later developments, however, have proved to be useful in several fields ranging from pure mathematics (measure theory, continuous groups) to technical and applied disciplines (pattern recognition, stereology). The book is a systematic exposition of the theory and a compilation of the main results in the field. The volume can be used to complement courses on differential geometry, Lie groups or probability or differential geometry. It is ideal both as a reference and for those wishing to enter the field.
9780511617331 (ebook)
Geometric probabilities.
Integral geometry.
QA273.5 / .S26 2004
516.362
Integral geometry and geometric probability / Integral Geometry & Geometric Probability Luis A. Santaló ; with a foreword by Mark Kac. - Second edition. - Cambridge : Cambridge University Press, 2004. - 1 online resource (xvii, 404 pages) : digital, PDF file(s). - Cambridge mathematical library . - Cambridge mathematical library. .
Title from publisher's bibliographic system (viewed on 05 Oct 2015).
Now available in the Cambridge Mathematical Library, the classic work from Luis Santaló. Integral geometry originated with problems on geometrical probability and convex bodies. Its later developments, however, have proved to be useful in several fields ranging from pure mathematics (measure theory, continuous groups) to technical and applied disciplines (pattern recognition, stereology). The book is a systematic exposition of the theory and a compilation of the main results in the field. The volume can be used to complement courses on differential geometry, Lie groups or probability or differential geometry. It is ideal both as a reference and for those wishing to enter the field.
9780511617331 (ebook)
Geometric probabilities.
Integral geometry.
QA273.5 / .S26 2004
516.362