dc.contributor.advisor Simonsen, Ingve dc.contributor.author Kringstad, Aleksander Hoel dc.date.accessioned 2015-10-06T08:03:24Z dc.date.available 2015-10-06T08:03:24Z dc.date.created 2015-06-11 dc.date.issued 2015 dc.identifier ntnudaim:13090 dc.identifier.uri http://hdl.handle.net/11250/2352147 dc.description.abstract We give a definition of haze in reflection from two-dimensional surfaces and study this quantity for Gaussian randomly rough surfaces. A simplified model of light scattering, assuming a scalar incident plane wave, the Kirchhoff approximation and an impenetrable surface is used as a basis. Using this model, we are able to derive relatively simple approximate analytical expressions for haze. Haze is studied with and without these approximations for exponential- and Gaussian correlation functions, and we find that the approximate expressions are accurate. The model gives results comparable the to scattering of unpolarized light from a perfectly conducting surface given that we only look at the total scattered intensity and that the surface roughness is not too high. dc.language eng dc.publisher NTNU dc.subject Fysikk og matematikk, Teknisk fysikk dc.title Approximating Haze in Reflection - Approximate expressions for two-dimensional randomly rough surfaces dc.type Master thesis dc.source.pagenumber 55
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