Title: | Speciální matematické modely samoorganizace |
Other Titles: | Special mathematical models of self-organization |
Authors: | Bělohoubková, Anežka |
Advisor: | Holeček, Miroslav |
Referee: | Benedikt, Jiří |
Issue Date: | 2015 |
Publisher: | Západočeská univerzita v Plzni |
Document type: | bakalářská práce |
URI: | http://hdl.handle.net/11025/17998 |
Keywords: | samoorganizace;matematický model;nestabilita;stabilita;difúze;difúzni rovnice;struktura;podmínky vzniku nestability;fluktuace |
Keywords in different language: | self-organisation;mathematical model;unstability;stability;difusion;difusion equation;structure;unstability appearance condition;fluktuation |
Abstract: | Cilem teto prace je predstaveni jevu, ktere vznikly samoorganizaci a matematickych modelu, ktere se pouzivaji pro jejich popis. Dale pak zkoumani podminek vzniku nestability systemu pro jeden z matematickych modelu a numericka simulace chovani jednoho konkretniho nelinearizovaneho modelu. Nasledne probehne porovnani ziskanych vysledku. |
Abstract in different language: | The goal of this thesis is presentation of self-organization which can be visible around us and the presentation of mathematical models, which are used to describe such systems. In second part of this thesis we will find conditions, which have to be fullfilled for appearance of the self-organisation. Finally we will create a numerical simulation of one particular unlinear system's behaviour. All results will be presented and compared. |
Rights: | Plný text práce je přístupný bez omezení. |
Appears in Collections: | Bakalářské práce / Bachelor´s works (KMA) |
Files in This Item:
File | Description | Size | Format | |
---|---|---|---|---|
bakalarska_prace_belohoubkova.pdf | Plný text práce | 3,26 MB | Adobe PDF | View/Open |
vedouci-PV_Belohoubkova.pdf | Posudek vedoucího práce | 90,09 kB | Adobe PDF | View/Open |
oponent-PO_Belohoubkova.pdf | Posudek oponenta práce | 290,13 kB | Adobe PDF | View/Open |
obhajoba-P_Belohoubkova.pdf | Průběh obhajoby práce | 63,75 kB | Adobe PDF | View/Open |
Please use this identifier to cite or link to this item:
http://hdl.handle.net/11025/17998
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