Rigorous numerics of tubular, conic, star-shaped neighborhoods of slow manifolds for fast-slow systems

Abstract

We provide a rigorous numerical computation method to validate tubular neighborhoods of normally hyperbolic slow manifolds with the explicit radii for the fast-slow system equation* cases x' = f(x,y,ε), and y' =εg(x,y,ε). & cases equation* Our main focus is the validation of the continuous family of eigenpairs \λi(y;ε), ui(y;ε)\i=1n of fx(hε(y),y,ε) over the slow manifold Sε= \x = hε(y)\ admitting the graph representation. In order to obtain such a family, we apply the interval Newton-like method with rigorous numerics. The validated family of eigenvectors generates a vector bundle over Sε determining normally hyperbolic eigendirections rigorously. The generated vector bundle enables us to construct a tubular neighborhood centered at slow manifolds with explicit radii. Combining rate conditions for providing smoothness of center-(un)stable manifolds, we can validate smooth tubular neighborhoods with diffeomorphic family of affine change of coordinates, as well as several extensions such as conic and star-shaped neighborhoods. Our procedure provides a systematic construction of smooth neighborhoods of slow manifolds in an explicit range [0,ε0] of ε with rigorous numerics.