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Well‐posedness of fractional degenerate differential equations with finite delay on vector‐valued functional spaces

Abstract:	We study the well‐posedness of the fractional degenerate differential equations with finite delay $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0001$ on Lebesgue–Bochner spaces $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0002$ , periodic Besov spaces $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0003$ and periodic Triebel–Lizorkin spaces $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0004$ , where A and M are closed linear operators on a Banach space X satisfying $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0005$ , F is a bounded linear operator from $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0006$ (resp. $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0007$ and $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0008$ ) into X, where $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0009$ is given by $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0010$ when $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0011$ and $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0012$ . Using known operator‐valued Fourier multiplier theorems, we give necessary or sufficient conditions for the well‐posedness of $urn:x-wiley:0025584X:media:mana201600502:mana201600502-math-0013$ in the above three function spaces.

Keywords:	Well‐posedness fractional degenerate differential equation Fourier multiplier vector‐valued function spaces 34G10 34K13 35K65 47D06

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