Number of the records: 1
dynamika nelineárna
SYS d017711 LBL 00000nz--a2200000o--4500 005 20250606214342.9 008 921228|||anznnbabn-----------|-a|a------ 040 $b slo $a DNLM $d BA006 065 $a E05.599.850 065 $a H01.548.675 066 $a 01 $c 03 150 $a dynamika nelineárna $x HI $2 slo 450 $w v $a Chaos Theory $2 eng 450 $w v $a Models, Nonlinear $2 eng 550 $7 sllk_us_auth*d017709 $Y Fractals $w b $a fraktály 550 $7 sllk_us_auth*d017709 $Y Fractals $w p $a fraktály 665 $a 94 $2 eng 665 $a Mathematics (1974-1993) $2 eng 665 $a Models, Biological (1970-1993) $2 eng 680 9-
$i The study of systems which respond disproportionately (nonlinearly) to initial conditions or perturbing stimuli. Nonlinear systems may exhibit chaos which is classically characterized as sensitive dependence on initial conditions. Chaotic systems, while distinguished from more ordered periodic systems, are not random. When their behavior over time is appropriately displayed (in phase space), constraints are evident which are described by strange attractors. Phase space representations of chaotic systems, or strange attractors, usually reveal fractal (FRACTALS) self-similarity across time scales. Natural, including biological, systems often display nonlinear dynamics and chaos. $2 eng 680 $a a math principle applied to theoret models $2 eng 750 -2
$a Nonlinear Dynamics $2 eng 980 $x M
Number of the records: 1