. "dynamical systems" . . "dynamical systems, nonlinear systems, optimal control, non-holonomic constraints, agriculture, natural resources"@en . " optimal control" . " agriculture" . . . "The optimal control theory is a promising tool to identify the long run strategies of policy making practices in agriculture and natural resources economics (ANRE). While it should be useful for managing ANRE systems, the results are still unsatisfactory. Where the optimal control policies have been determined, these often fail. It was shown that this is due to the shortcomings of the models constructed stemming mainly from neglecting non-linearities of real systems and miss identification of constraints among these variables. In a form of a basic research, this project focuses on developing valid nonlinear constraint structures reflecting the real-world relationships between variables of ANRE problems. The aim is to cover the dynamical structure of this class of problems (reflecting the sustainable planning) and to study the solution procedures of arising nonlinear optimal control models. For these purposes the apparatus of non-holonomic constraints will be used via unfolding the techniques theoretically well established in mathematics, mathematical physics and engineering."@en . "7"^^ . . "http://www.isvav.cz/projectDetail.do?rowId=GA13-25897S"^^ . "7"^^ . " nonlinear systems" . . "GA13-25897S" . . "2015-04-23+02:00"^^ . "1"^^ . . . "0"^^ . "0"^^ . . . "Neholonomn\u00ED vazby v optim\u00E1ln\u00EDm \u0159\u00EDzen\u00ED dynamick\u00FDch ekonomick\u00FDch syst\u00E9m\u016F v zem\u011Bd\u011Blstv\u00ED a p\u0159\u00EDrodn\u00EDch zdroj\u00EDch" . . . "Non-holonomic constraints in optimal managing of dynamic economic systems in agriculture and natural resources"@en . . " non-holonomic constraints" . "Sou\u010Dasn\u00FDm probl\u00E9mem \u0159\u00EDzen\u00ED ekonomick\u00FDch syst\u00E9m\u016F v zem\u011Bd\u011Blstv\u00ED a p\u0159\u00EDrodn\u00EDch zdroj\u00EDch (ZPZ) je nedostatek funk\u010Dn\u00EDch model\u016F pro podporu rozhodov\u00E1n\u00ED, kter\u00E9 by nab\u00EDzely aplikovateln\u00E9 dlouhodob\u00E9 rozhodovac\u00ED strategie odr\u00E1\u017Eej\u00EDc\u00ED pot\u0159ebu trvale udr\u017Eiteln\u00E9ho rozvoje. Teorie \u0159\u00EDzen\u00ED p\u0159edstavuje slibn\u00FD n\u00E1stroj pro optim\u00E1ln\u00ED \u0159\u00EDzen\u00ED dynamick\u00FDch ZPZ syst\u00E9m\u016F, av\u0161ak v sou\u010Dasnosti teoreticky navr\u017Een\u00E9 strategie v aplikac\u00EDch z\u00E1sadn\u011B selh\u00E1vaj\u00ED. Z dosavadn\u00EDho v\u00FDzkumu zji\u0161\u0165ujeme, \u017Ee p\u0159\u00ED\u010Dinou selh\u00E1n\u00ED je p\u0159\u00EDli\u0161n\u00E9 zjednodu\u0161en\u00ED model\u016F spo\u010D\u00EDvaj\u00EDc\u00ED p\u0159edev\u0161\u00EDm v zanedb\u00E1n\u00ED nelinearity re\u00E1ln\u00FDch syst\u00E9m\u016F a ve \u0161patn\u00E9 identifikaci vazeb mezi prom\u011Bnn\u00FDmi. Tento projekt se zab\u00FDv\u00E1 z\u00E1kladn\u00EDm v\u00FDzkumem validn\u00EDch neline\u00E1rn\u00EDch vazebn\u00EDch struktur odr\u00E1\u017Eej\u00EDc\u00EDch skute\u010Dn\u00E9 vztahy prom\u011Bnn\u00FDch v dynamick\u00FDch ekonomick\u00FDch ZPZ syst\u00E9mech, jejich\u017E optim\u00E1ln\u00ED \u0159\u00EDzen\u00ED je \u017E\u00E1douc\u00ED, a d\u00E1le v\u00FDzkumem metod \u0159e\u0161en\u00ED vznikaj\u00EDc\u00EDch neline\u00E1rn\u00EDch model\u016F optim\u00E1ln\u00EDho \u0159\u00EDzen\u00ED. Pro \u00FA\u010Dely v\u00FDzkumu bude vyu\u017Eit rozvinut\u00FD apar\u00E1t neholonomn\u00EDch vazeb teoreticky vybudovan\u00FD v matematick\u00E9 fyzice a \u00FAsp\u011B\u0161n\u011B aplikovan\u00FD ve fyzice a technice." . . "2013-02-01+01:00"^^ . "2014-03-31+02:00"^^ . . . . . "2015-12-31+01:00"^^ .