Degenerate fractional differential equations in locally convex spaces with a $\sigma$-regular pair of operators

IF 0.5 Q3 MATHEMATICS Ufa Mathematical Journal Pub Date : 2016-01-01 DOI:10.13108/2016-8-4-98
M. Kostic, V. Fedorov
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引用次数: 12

Abstract

We consider a degenerate fractional order differential equationDα t Lu(t) = Mu(t) in a Hausdorff sequentially complete locally convex space. Under the p-regularity of the operator pair (L,M), we find the phase space of the equation and the family of its resolving operators. We show that the identity image of the latter coincides with the phase space. We prove an unique solvability theorem and obtain the form of the solution to the Cauchy problem for the corresponding inhomogeneous equation. We give an example of application the obtained abstract results to studying the solvability of the initial boundary value problems for the partial differential equations involving entire functions on an unbounded operator in a Banach space, which is a specially constructed Frechét space. It allows us to consider, for instance, a periodic in a spatial variable x problem for the equation with a shift along x and with a fractional order derivative with respect to time t.
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用正则算子对退化局部凸空间中的分数阶微分方程
考虑Hausdorff序列完备局部凸空间中的退化分数阶微分方程d α t Lu(t) = Mu(t)。在算子对(L,M)的p正则性下,我们得到了方程的相空间及其解析算子族。我们证明了后者的恒等像与相空间重合。证明了相应的非齐次方程的柯西问题的唯一可解定理,得到了柯西问题的解的形式。我们给出了一个应用所得到的抽象结果在Banach空间(这是一个特殊构造的frech空间)上研究无界算子上包含整个函数的偏微分方程初边值问题的可解性的例子。它允许我们考虑,例如,一个关于空间变量x的周期问题对于一个方程,它沿着x移动并且对时间t有分数阶导数。
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