Well-posedness of degenerate differential equations in H?lder continuous function spaces

Shangquan BU

doi:10.1007/s11464-014-0368-4

PDF(113 KB)

Front. Math. China ›› 2015, Vol. 10 ›› Issue (2) : 239-248. DOI: 10.1007/s11464-014-0368-4

RESEARCH ARTICLE

Well-posedness of degenerate differential equations in H?lder continuous function spaces

Shangquan BU

Author information +

History +

Abstract

Using known operator-valued Fourier multiplier results on vectorvalued Hölder continuous function spaces, we completely characterize the wellposedness of the degenerate differential equations $(M u)' (t) = A u (t) + f (t)$ for $t ∈ R$ in Hölder continuous function spaces $C a (R; X)$ <?Pub Caret?> by the boundedness of the M-resolvent of A, where A and M are closed operators on a Banach space X satisfying $D (A) ⊂ D (M)$ .

Keywords

Well-posedness / degenerate differential equation / $C ˙ α$ -multiplier / Höolder continuous function space

Cite this article

EndNote

Ris (Procite)

Bibtex

Download citation ▾

Shangquan BU. Well-posedness of degenerate differential equations in Hölder continuous function spaces. Front. Math. China, 2015, 10(2): 239‒248 https://doi.org/10.1007/s11464-014-0368-4

References

Publishing order | Descend order by publishing year | Descend order by cited within

[1]	Arendt W, Batty B, Bu S. Fourier multipliers for Hölder continuous functions and maximal regularity. Studia Math, 2004, 160: 23-51 CrossRef Google scholar

[2]	Arendt W, Batty C, Hieber M, Neubrander F. Vector-Valued Laplace Transforms and Cauchy Problems. Basel: Birkhäuser, 2001 CrossRef Google scholar

[3]	Bu S. Well-posedness of second order degenerate differential equations in vector-valued function spaces. Studia Math 2013, 214(1): 1-16 CrossRef Google scholar

[4]	Carroll R W, Showalter R E. Singular and Degenerate Cauchy Problems. Mathematics in Science and Engineering, 127. New York: Academic Press, 1976

[5]	Favini V, Yagi A. Degenerate Differential Equations in Banach Spaces. Pure Appl Math, 215. New York: Dekker, 1999

[6]	Lizama C, Ponce R. Periodic solutions of degenerate differential equations in vectorvalued function spaces. Studia Math, 2011, 202(1): 49-63 CrossRef Google scholar

[7]	Lizama C, Ponce R. Maximal regularity for degenerate differential equations with infinite delay in periodic vector-valued function spaces. Proc Edinb Math Soc, 2013, 56(3): 853-871 CrossRef Google scholar