Purdue University Purdue e-pubs Open Access Theses Theses and Dissertations Spring 2015 Framework for functional tree simulation applied to 'golden delicious' apple trees Marek Fiser Purdue University Follow this and additional works at: https://docs.lib.purdue.edu/open_access_theses Part of the Botany Commons, and the Computer Sciences Commons Recommended Citation Fiser, Marek, "Framework for functional tree simulation applied to 'golden delicious' apple trees" (2015). Open Access Theses. 566. https://docs.lib.purdue.edu/open_access_theses/566 This document has been made available through Purdue e-pubs, a service of the Purdue University Libraries. Please contact epubs@purdue.edu for additional information.
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................................................................................................................................................................................................................................................................ I n L n B n M n...............................
......................................................................................................................... I n L n B n M n....................................................................................................................................................................................................... I fl I fr I bl I br......................................
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(a) (f) (g) (l)................................... (a) (c)...........................................................................................................................................................................................................................................
Root I 1 I 2 L 1 B 1 I 5 I 2 I 3 B 2 L 3 B 4 I 6 A 1 I 4 B 3 M 2 M 1 I n L n B n M n O(1)
Δt Δt 1 8 Δt
n 1 n 2 24 =16, 777, 216
I t t n I t 1 α<1 α α n n i I t =(1 α) I i + α I t 1 n α s P s 0 <P <1 (1 P )
I n L n B n M n
I fl I fr I bl I br a ccw β
I fl I fr I bl I br a ccw = β [(I tr I tl )+(I br I bl )] I γ =50 I = I fr + I fl + γ (I br + I bl )
GDD GDD = T max + T min 2 T base, T max T min T base T base =10 T max T min [T base,t top ] T top GDD [0,T top T base ] GDD GDD = GDD T top T base.
GDD
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(a) (f) (g) (l)
(a) (c)
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