Results 291 to 300 of about 2,530,049 (324)
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Gray codes and 1D quadratic maps
Electronics Letters, 1998Gabriel Alvarez, M Romera, F Montoya
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Geometry and Dynamics of Quadratic Rational Maps
Experimental Mathematics, 1993This article is an expository description of quadratic rational maps from the Riemann sphere to ...
John Milnor, null Milnor, Tan Lei
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Large Deviation Principle for Benedicks-Carleson Quadratic Maps
, 2011Since the pioneering works of Jakobson and Benedicks & Carleson and others, it has been known that a positive measure set of quadratic maps admit invariant probability measures absolutely continuous with respect to Lebesgue.
Y. Chung, Hiroki Takahasi
semanticscholar +1 more source
Bifurcation structure of the nonautonomous quadratic map
Physical Review A, 1985info:eu-repo/semantics ...
Kapral, Raymond, Mandel, Paul
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The quadratic differential of a map
1985The rank of the first differential ƒx determines the singularity classes ∑i. Consideration of the quadratic part of the map gives a more precise classification: we associate to each singularity a family of quadratic forms invariantly associated with it.
V. I. Arnold +2 more
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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.
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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.
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Quadratic Transformation for Planar Mapping of Implicit Surfaces
Journal of Mathematical Imaging and Vision, 2012zbMATH Open Web Interface contents unavailable due to conflicting licenses.
József Molnár, Dmitry Chetverikov
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1994
Let K be an infinite field of characteristic #2. For vector spaces X, Y over K of finite dimension, we defined a quadratic mapf: X→ Y by the following conditions : $$f(ax) = {a^2}f(x),a \in K,x \in X$$ (5.1) $$(x,y) \mapsto \frac{1}{2}[f(x + y) - f(x) - f(y)],x,y \in XS$$ (5.2) is bilinear [see (1.2) and (1.3)]. We denoted by Q(X, Y)
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Let K be an infinite field of characteristic #2. For vector spaces X, Y over K of finite dimension, we defined a quadratic mapf: X→ Y by the following conditions : $$f(ax) = {a^2}f(x),a \in K,x \in X$$ (5.1) $$(x,y) \mapsto \frac{1}{2}[f(x + y) - f(x) - f(y)],x,y \in XS$$ (5.2) is bilinear [see (1.2) and (1.3)]. We denoted by Q(X, Y)
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1994
Let f: R n→R m be a quadratic map. By definition there exist m quadratic forms f,... ,f m on R n such that $$f(x) = ({f_1}(x),...,{f_m}(x)),x \in {R^n}$$ .
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Let f: R n→R m be a quadratic map. By definition there exist m quadratic forms f,... ,f m on R n such that $$f(x) = ({f_1}(x),...,{f_m}(x)),x \in {R^n}$$ .
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On the non-monotonicity of entropy for a class of real quadratic rational maps
Journal of Modern Dynamics, 2020Khashayar Filom, Kevin M Pilgrim
exaly