National Repository of Grey Literature 4 records found  Search took 0.00 seconds. 
The behavior of functions of several variables in terms of extremes
Beseda, Jiří ; Votavová, Helena (referee) ; Hoderová, Jana (advisor)
Thesis deals with problems of extreme searching in multivariable calculus. Searching maxima/minima of the function can be moreover specified to local extremes, global extremes or strict extremes. For finding extremes we use Sylvester's criterion, which helps us investigate the behavior of functions in stationary points. Stationary point is point, where maxima or minima of the function is expected.
The behavior of functions of several variables in terms of extremes
Beseda, Jiří ; Štarha, Pavel (referee) ; Hoderová, Jana (advisor)
Thesis deals with problems of extreme searching in multivariable calculus. Searching maxima/minima of the function can be moreover specified to local extremes, global extremes or strict extremes. Computations are mainly based on first derivations of the function that are set to be zero, in order to obtain the stationary point. Stationary point is point, where maxima or minima of the function is expected.
The behavior of functions of several variables in terms of extremes
Beseda, Jiří ; Votavová, Helena (referee) ; Hoderová, Jana (advisor)
Thesis deals with problems of extreme searching in multivariable calculus. Searching maxima/minima of the function can be moreover specified to local extremes, global extremes or strict extremes. For finding extremes we use Sylvester's criterion, which helps us investigate the behavior of functions in stationary points. Stationary point is point, where maxima or minima of the function is expected.
The behavior of functions of several variables in terms of extremes
Beseda, Jiří ; Štarha, Pavel (referee) ; Hoderová, Jana (advisor)
Thesis deals with problems of extreme searching in multivariable calculus. Searching maxima/minima of the function can be moreover specified to local extremes, global extremes or strict extremes. Computations are mainly based on first derivations of the function that are set to be zero, in order to obtain the stationary point. Stationary point is point, where maxima or minima of the function is expected.

See also: similar author names
5 Beseda, Jan
Interested in being notified about new results for this query?
Subscribe to the RSS feed.