It is well known that a family of tent-like maps with bounded derivatives has no linear response for typical deterministic perturbations changing the value of the turning point. In this note we prove the following result: if we consider a tent-like family with a cusp at the turning point, we recover the linear response. More precisely, let Tɛ be a family of such cusp maps generated by changing the value of the turning point of T₀ by a deterministic perturbation and let hɛ be the corresponding invariant density. We prove that ϵ ↦ h ϵ is differentiable in L¹ and provide a formula for its derivative.
Linear response due to singularities
Stefano Galatolo
2024-01-01
Abstract
It is well known that a family of tent-like maps with bounded derivatives has no linear response for typical deterministic perturbations changing the value of the turning point. In this note we prove the following result: if we consider a tent-like family with a cusp at the turning point, we recover the linear response. More precisely, let Tɛ be a family of such cusp maps generated by changing the value of the turning point of T₀ by a deterministic perturbation and let hɛ be the corresponding invariant density. We prove that ϵ ↦ h ϵ is differentiable in L¹ and provide a formula for its derivative.File in questo prodotto:
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