Log-konkavni karakter mikrobne rastne krivulje brez lag-faze
Cedilnik, Anton ; Cedilnik-Gorup, Eva
Minotov zakon, po katerem je relativna stopnja rasti padajoča na vsem območju, kjer je mikrobna rastna krivulja naraščajoča, razširimo še na območje, kjer opazovana kultura umira. Pokažemo, da je ...rastna krivulja, za katero velja ta zakon, logaritmično konkavna in da ima zato vselej obliko ▫$N(t) = N(a) \cdot \exp\biggl( \int_a^t R(x)dx \biggl)$▫, kjer je ▫$R(t)$▫ padajoča funkcija. Konec lag-faze definiramo kot začetek logaritmične konkavnosti rastne krivulje. V nadaljevanju naštejemo ostale splošne lastnosti takih rastnih krivulj, utemeljimo osnovni princip aproksimacije konkretnih podatkov in predlagamo preprost model.
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