On the Structure-Bounded Growth Processes in Plant Populations |
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Authors: | H. G. Kilian M. Kazda F. Király D. Kaufmann R. Kemkemer D. Bartkowiak |
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Affiliation: | 1. Abteilung Experimentelle Physik, Universit?t Ulm, Albert-Einstein Allee 11, 89069, Ulm, Germany 2. Institut für Systematische Botanik und ?kologie, Universit?t Ulm, Albert-Einstein Allee 11, 89069, Ulm, Germany 3. Institut für Reine Mathematik, Universit?t Ulm, Helmholtzstra?e 18, 89081, Ulm, Germany 4. Institut für Humangenetik, Universit?tsklinik, Albert-Einstein Allee 11, 89081, Ulm, Germany 5. Max-Planck-Institut für Metallforschung, Heisenbergstr. 3, 70569, Stuttgart, Germany 6. Klinik für Strahlentherapie und Radioonkologie, Universit?tsklinikum, Albert-Einstein-Allee 23, 89081, Ulm, Germany
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Abstract: | If growing cells in plants are considered to be composed of increments (ICs) an extended version of the law of mass action can be formulated. It evidences that growth of plants runs optimal if the reaction–entropy term (entropy times the absolute temperature) matches the contact energy of ICs. Since these energies are small, thermal molecular movements facilitate via relaxation the removal of structure disturbances. Stem diameter distributions exhibit extra fluctuations likely to be caused by permanent constraints. Since the signal–response system enables in principle perfect optimization only within finite-sized cell ensembles, plants comprising relatively large cell numbers form a network of size-limited subsystems. The maximal number of these constituents depends both on genetic and environmental factors. Accounting for logistical structure–dynamics interrelations, equations can be formulated to describe the bimodal growth curves of very different plants. The reproduction of the S-bended growth curves verifies that the relaxation modes with a broad structure-controlled distribution freeze successively until finally growth is fully blocked thus bringing about “continuous solidification”. |
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