A dynamical system in the space of convex quadrangles
Abstract
Let us consider a family F(α,β,γ,δ) of convex quadrangles in the plane with given angles \α,β,γ,δ\ and with the perimeter 2π. Such quadrangle Q∈ F(α,β,γ,δ) can be considered as a point (x1,x2,x3,x4)∈R4, where \x1,x2,x3,x4\ are lengths of edges. Then to F a finite open segment I⊂R4 is corresponded. A quadrangle in F, that corresponds to the midpoint of I is called a balanced quadrangle. Let M be the set of balanced quadrangles. The function f:M M is defined in the following way: angles of the balanced quadrangle Q', Q'=f(Q), are numerically equal to edges of Q. The map f defines a dynamical system in the space of balanced quadrangles. In this work we study properties of this system.
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