National Repository of Grey Literature 4 records found  Search took 0.00 seconds. 
Differential equation with super-linearities in mathematical modelling of processes in mechanics
Maňáková, Lenka ; Nechvátal, Luděk (referee) ; Šremr, Jiří (advisor)
This work is focused on the qualitative study and interpretation of a certain differential equation with superlinearities. In particular, a question of the existence of equilibrium points and the drawing of phase portraits is investigated using the theory of dynamic systems, more precisely using Hamilton systems. The properties and types of solutions are illustrated in phase portraits.
Advanced methods of mobile robot path planning
Maňáková, Lenka ; Šoustek, Petr (referee) ; Dvořák, Jiří (advisor)
This work is focused on advanced methods of mobile robot's path planning. The theoretical part describes selected graphical methods, which are useful for speeding up the process of finding the shortest paths, for example through reduction of explored nodes of the state space. In the practical part was created simulate environment in the Python language and in this environment, selected algorithms was implemented.
Advanced methods of mobile robot path planning
Maňáková, Lenka ; Šoustek, Petr (referee) ; Dvořák, Jiří (advisor)
This work is focused on advanced methods of mobile robot's path planning. The theoretical part describes selected graphical methods, which are useful for speeding up the process of finding the shortest paths, for example through reduction of explored nodes of the state space. In the practical part was created simulate environment in the Python language and in this environment, selected algorithms was implemented.
Differential equation with super-linearities in mathematical modelling of processes in mechanics
Maňáková, Lenka ; Nechvátal, Luděk (referee) ; Šremr, Jiří (advisor)
This work is focused on the qualitative study and interpretation of a certain differential equation with superlinearities. In particular, a question of the existence of equilibrium points and the drawing of phase portraits is investigated using the theory of dynamic systems, more precisely using Hamilton systems. The properties and types of solutions are illustrated in phase portraits.

See also: similar author names
3 MAŇÁKOVÁ, Lucie
3 Maňáková, Lucie
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