Compact almost automorphic dynamics of non-autonomous differential equations with exponential dichotomy and applications to biological models with delay
Abstract
In the present work, we prove that, if A(·) is a compact almost automorphic matrix and the system x'(t) = A(t)x(t)\, , possesses an exponential dichotomy with Green function G(·, ·), then its associated system y'(t) = B(t)y(t)\, , where B(·) ∈ H(A) (the hull of A(·)) also possesses an exponential dichotomy. Moreover, the Green function G(·, ·) is compact Bi-almost automorphic in R2, this implies that G(·, ·) is 2 - like uniformly continuous, where 2 is the principal diagonal of R2, an important ingredient in the proof of invariance of the compact almost automorphic function space under convolution product with kernel G(·, ·). Finally, we study the existence of a positive compact almost automorphic solution of non-autonomous differential equations of biological interest having non-linear harvesting terms and mixed delays.
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