Two models of the partially focused clear zone compound eye

dc.contributor.authorDiesendorf, M. O.
dc.contributor.authorHorridge, George Adrian
dc.date.accessioned2019-09-26T01:38:39Z
dc.date.issued1973-03-13
dc.description.abstract1. The theory of the unfocused clear zone eye is extended to cover cases where rays are partially focused upon the receptor layer. 2. Light is admitted through facets according to a Gaussian distribution of angle of incidence defined with respect to the axis of the facet. 3. The same light crosses the clear zone in an average direction related to its direction of origin outside the eye, so that it tends to be concentrated around that receptor on the radial axis pointing towards the source of light. This effect, defined as focusing in contrast to the unfocused eye, allows a simultaneous improvement in sensitivity and acuity. 4. An eye can be focused partially because rays diverge from each cone tip or because, on average, they converge above or below the receptor layer on the radial axis pointing towards their source. The two situations are analysed quantitatively. 5. In a partially focused eye neither the measured angular sensitivity nor the absolute sensitivity allow a prediction of the ray paths because many different distributions from the cone tips produce a given final result. Therefore the optics of partially focused clear zone eyes must be analysed by direct measurement of light distribution from the cone tips.en_AU
dc.format.extent18 pagesen_AU
dc.format.mimetypeapplication/pdf
dc.identifier.issn0962-8452en_AU
dc.identifier.urihttp://hdl.handle.net/1885/171677
dc.language.isoen_AU
dc.publisherRoyal Societyen_AU
dc.rights© Royal Societyen_AU
dc.sourceProceedings of the Royal Society of London B: Biological Sciencesen_AU
dc.subjectclear zoneen_AU
dc.subjecteyeen_AU
dc.subjectreceptoren_AU
dc.subjectlighten_AU
dc.subjecttheoryen_AU
dc.titleTwo models of the partially focused clear zone compound eyeen_AU
dc.typeJournal articleen_AU
local.bibliographicCitation.issue1071en_AU
local.bibliographicCitation.lastpage158en_AU
local.bibliographicCitation.startpage141en_AU
local.contributor.affiliationDiesendorf, M. O., Department of Applied Mathematics, CoS Research School of Physics, The Australian National Universityen_AU
local.contributor.affiliationHorridge, George Adrian, Division of Biomedical Science and Biochemistry, CoS Research School of Biology, The Australian National Universityen_AU
local.contributor.authoremailu690072@anu.edu.auen_AU
local.contributor.authoruidHorridge, George Adrian, u690072en_AU
local.description.embargo2037-12-31
local.identifier.citationvolume183en_AU
local.identifier.doi10.1098/rspb.1973.0010en_AU
local.identifier.essn1471-2954en_AU
local.identifier.uidSubmittedByu4579722en_AU
local.publisher.urlhttps://royalsociety.org/en_AU
local.type.statusPublished Versionen_AU

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