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Pathways to hyperchaos in a three-dimensional quadratic map
The European Physical Journal PlusThis paper deals with various routes to hyperchaos with all three positive Lyapunov exponents in a three-dimensional quadratic map. The map under consideration displays strong hyperchaoticity in the sense that in a wider range of parameter space, the ...
S. S. Muni
semanticscholar +3 more sources
Anti-integrability for Three-Dimensional Quadratic Maps
SIAM Journal on Applied Dynamical Systems, 2022 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Amanda E. Hampton, James D. Meiss
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Modified chaotic quadratic map with improved robust region
International Journal of Information Technology (Singapore), 2023Talha Umar +2 more
exaly +2 more sources
Bifurcation structure of the nonautonomous quadratic map
Physical Review A, 1985info:eu-repo/semantics ...
Kapral, Raymond, Mandel, Paul
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1999
There are several ways to examine the dynamics of the quadratic map defined by f r (x) = rx(1−x). The image above is from a demonstration that shows the bifurcation diagram for f r , while allowing the user to move a slider (the red line) which causes the corresponding cobweb plot to appear as well.
S. Wagon
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There are several ways to examine the dynamics of the quadratic map defined by f r (x) = rx(1−x). The image above is from a demonstration that shows the bifurcation diagram for f r , while allowing the user to move a slider (the red line) which causes the corresponding cobweb plot to appear as well.
S. Wagon
openaire +2 more sources
A rigorous lower bound for the stability regions of the quadratic map
Physica D: Nonlinear Phenomena, 2009Warwick Tucker, Daniel Wilczak
exaly +2 more sources
Additivity of Quadratic Maps on JB Algebras
Lobachevskii Journal of Mathematics, 2019 In line with several results ranging from operator algebras to ring theory, this paper discusses automatic additivity of maps satisfying particular multiplicative properties, thereby outlining an entangling between the multiplicative and additive structures. The structures under scrutiny are JB-algebras and quadratic maps between them: for JB-algebras \
Hamhalter J., Turilova E.
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