A two-dimensional noninvertible map T:(x′,y′)=(x(1+aτ−y),(1−τ)y+τx2) proposed by Lorenz in 1989, depending on two parameters a and τ, is reconsidered. We show the two different bifurcation scenarios o
A two-dimensional noninvertible map T:(x′,y′)=(x(1+aτ−y),(1−τ)y+τx2) proposed by Lorenz in 1989, depending on two parameters a and τ, is reconsidered. We show the two different bifurcation scenarios o
A two-dimensional noninvertible map T:(x′,y′)=(x(1+aτ−y),(1−τ)y+τx2) proposed by Lorenz in 1989, depending on two parameters a and τ , is reconsidered. We show the two different bifurcati