Results 241 to 250 of about 153,241 (292)
Yield and quality performance of onion (Allium cepa L.) hybrid varieties in response to nitrogen fertilization in Northwest Ethiopia. [PDF]
BMC Plant BiolGetaneh Y +3 more
europepmc +1 more source
Prioritization and Sensitivity of Pesticide Risks from Root and Tuber Vegetables. [PDF]
J XenobiotLučić M, Onjia A.
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Information Processing Letters, 1996
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Manuel Abellanas +5 more
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Manuel Abellanas +5 more
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Proceedings of the 27th Annual Computer Security Applications Conference, 2011
Onion routing was invented more than fifteen years ago to separate identification from routing in network communication. Since that time there has been much design, analysis, and deployment of onion routing systems. This has been accompanied by much confusion about what these systems do, what security they provide, how they work, who built them, and ...
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Onion routing was invented more than fifteen years ago to separate identification from routing in network communication. Since that time there has been much design, analysis, and deployment of onion routing systems. This has been accompanied by much confusion about what these systems do, what security they provide, how they work, who built them, and ...
openaire +1 more source
2017
Provides a summary of a wide range of information concerning the culture, nutritional value, harvest, and storage of onions.
Relf, Diane +2 more
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Provides a summary of a wide range of information concerning the culture, nutritional value, harvest, and storage of onions.
Relf, Diane +2 more
+5 more sources
Random Structures & Algorithms, 2004
AbstractIteratively computing and discarding a set of convex hulls creates a structure known as an “onion.” In this paper, we show that the expected number of layers of a convex hull onion for n uniformly and independently distributed points in a disk is Θ(n2/3). Additionally, we show that in general the bound is Θ(n2/(d+1)) for points distributed in a
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AbstractIteratively computing and discarding a set of convex hulls creates a structure known as an “onion.” In this paper, we show that the expected number of layers of a convex hull onion for n uniformly and independently distributed points in a disk is Θ(n2/3). Additionally, we show that in general the bound is Θ(n2/(d+1)) for points distributed in a
openaire +1 more source