244 KB15 KB200820262024Filip, Matejštevilka:2letnik:letn 71str. 45-51ISSN:0473-7466COBISSID_HOST:220438019URN:URN:NBN:SI:doc-AG1O6I3BslDruštvo matematikov, fizikov in astronomov SlovenijeObzornik za matematiko in fizikoCalabi-Yau manifoldsCalabi-Yau mnogoterostiLaurent polynomialsLaurentovi polinomimirror symmetryzrcalna simetrijaZrcalna simetrija in Laurentovi polinomi|Mirror symmetry originally describes the connection between two geometric objects called Calabi-Yau manifolds. If two Calabi-Yau manifolds are mirror symmetric they are geometrically distinct yet equivalent when viewed from the physical side of string theory. Mirror symmetry has many mathematical formulations and generalisations that go beyond the Calabi-Yau manifolds. In this paper we will present one aspect of mirror symmetry that can be formulated in terms of elementary convex geometryZrcalna simetrija prvotno opisuje povezavo med dvema geometrijskima objektoma, ki se imenujeta Calabi-Yau mnogoterosti. Izkaže se, da sta dani zrcalno simetrični Calabi-Yau mnogoterosti geometrijsko sicer različni, če nanju pogledamo fizikalno s strani teorije strun, pa vseeno ekvivalentni. Zrcalna simetrija ima veliko matematičnih formulacij in posplošitev, ki gredo zunaj okvirja Calabi-Yau mnogoterosti. V tem članku bomo predstavili en vidik zrcalne simetrije, ki ga lahko formuliramo z elementarno konveksno geometrijoTEXTznanstveno časopisjejournalsSlovenian National E-content AggregatorNational and University Library of SloveniaDruštvo matematikov, fizikov in astronomov