33 research outputs found
Lin's method for heteroclinic chains involving periodic orbits
We present an extension of the theory known as Lin's method to heteroclinic
chains that connect hyperbolic equilibria and hyperbolic periodic orbits. Based
on the construction of a so-called Lin orbit, that is, a sequence of continuous
partial orbits that only have jumps in a certain prescribed linear subspace,
estimates for these jumps are derived. We use the jump estimates to discuss
bifurcation equations for homoclinic orbits near heteroclinic cycles between an
equilibrium and a periodic orbit (EtoP cycles)
Lineamientos para un programa de estabilización de ajuste drástico
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Desinflación a la hiperestanflación, Perú 1985-1990
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