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gptkbp:instance_of
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gptkb:Model
|
|
gptkbp:analyzes
|
three-dimensional space
|
|
gptkbp:can_be_represented_graphically_as
|
a 3 D plot
|
|
gptkbp:depicts
|
chaotic systems
|
|
gptkbp:describes
|
chaotic behavior
|
|
gptkbp:emulation
|
computational tools
|
|
gptkbp:example
|
strange attractor
mathematical chaos
|
|
gptkbp:exhibits
|
sensitive dependence on initial conditions
period doubling
|
|
gptkbp:has
|
two wings
|
|
gptkbp:has_applications_in
|
physics
|
|
gptkbp:has_been_visualized_using
|
computer simulations
|
|
gptkbp:has_inspired
|
art and literature
|
|
https://www.w3.org/2000/01/rdf-schema#label
|
the Lorenz attractor
|
|
gptkbp:introduced_in
|
gptkb:Edward_Lorenz
|
|
gptkbp:is_a_classic_case_of
|
deterministic chaos in nature
|
|
gptkbp:is_a_model_that_can_lead_to
|
unexpected outcomes
|
|
gptkbp:is_a_model_that_illustrates
|
the limits of predictability
|
|
gptkbp:is_a_phenomenon_that
|
natural systems
|
|
gptkbp:is_a_representation_of
|
chaotic dynamics.
|
|
gptkbp:is_a_subject_of
|
gptkb:scientific_research
gptkb:philosophy_of_science
engineering
complex systems
scientists and mathematicians
|
|
gptkbp:is_affected_by
|
external perturbations
|
|
gptkbp:is_analyzed_in
|
gptkb:Lyapunov_exponents
numerical methods
|
|
gptkbp:is_associated_with
|
deterministic chaos
bifurcation
|
|
gptkbp:is_characterized_by
|
a butterfly shape
|
|
gptkbp:is_cited_in
|
academic papers
|
|
gptkbp:is_described_as
|
three parameters
|
|
gptkbp:is_fundamental_to
|
chaotic motion
|
|
gptkbp:is_influenced_by
|
initial conditions
|
|
gptkbp:is_often_discussed_in
|
gptkb:literature
|
|
gptkbp:is_often_referenced_in
|
discussions about chaos theory
|
|
gptkbp:is_often_used_in
|
educational contexts
|
|
gptkbp:is_related_to
|
nonlinear dynamics
|
|
gptkbp:is_represented_in
|
Lorenz equations
|
|
gptkbp:is_studied_for
|
the behavior of complex systems
|
|
gptkbp:is_studied_in
|
gptkb:Mathematics
climate models
dynamical systems theory
|
|
gptkbp:is_used_in
|
weather prediction
|
|
gptkbp:key_concept
|
chaos theory
dynamic systems behavior
|
|
gptkbp:key_feature
|
the study of nonlinear systems
|
|
gptkbp:model
|
gptkb:wind
atmospheric convection
|
|
gptkbp:notable_examples
|
mathematical modeling in science
|
|
gptkbp:system
|
differential equations
|
|
gptkbp:was_a_demonstration_of
|
the unpredictability of systems
|
|
gptkbp:bfsParent
|
gptkb:Butterfly_Effect
|
|
gptkbp:bfsLayer
|
4
|