Gleason's theorem

Known as: Gleason, Gleason theorem 
Gleason's theorem (named after Andrew M. Gleason) is a mathematical result which is of particular importance for the field of quantum logic. It… (More)
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Highly Cited
2007
Highly Cited
2007
We present a study of image features for cancer diagnosis and Gleason grading of the histological images of prostate. In… (More)
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2007
2007
We discuss concrete examples for frame functions and their associated density operators, as well as for non-Gleason type… (More)
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Highly Cited
2007
Highly Cited
2007
In this paper we present a method of automatically detecting and segmenting glands in digitized images of prostate histology and… (More)
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2006
2006
We introduce a novel notion of probability within quantum history theories and give a Gleasonesque proof for these assignments… (More)
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2000
2000
The purpose of this note is to give a generalization of Gleason’s theorem inspired by recent work in quantum information theory… (More)
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2000
2000
Gleason’s theorem for R3 says that if is a nonnegative function on the unit sphere with the property that f (x)+f (y)+f (z) is a… (More)
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2000
2000
We study the idea of implantation of Piron's and Bell's geometrical lemmas for proving some results concerning measures on finite… (More)
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Highly Cited
1996
Highly Cited
1996
Elevated temperatures and solar ultraviolet (UV) radiation have been implicated as causes for the loss of symbiotic algae in… (More)
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1991
1991
The Gleason-Prange theorem describes a nontrivial automorphism of an extended quadratic residue code. By using the Fourier… (More)
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Highly Cited
1991
Highly Cited
1991
The Kochen-Specker (1967) theorem is of fundamental importance for quantum theory. It asserts that, in a Hilbert space of… (More)
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