Young Differential Equations with Power Type Nonlinearities
Abstract
In this note we give several methods to construct nontrivial solutions to the equation dyt=σ(yt) \, dxt, where x is a γ-H\"older Rd-valued signal with γ∈(1/2,1) and σ is a function behaving like a power function ||, with ∈(0,1). In this situation, classical Young integration techniques allow to get existence and uniqueness results whenever γ(+1)>1, while we focus on cases where γ(+1) 1. Our analysis then relies on some extensions of Young's integral allowing to cover the situation at hand.
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