Let $K$ be a closed convex cone with the nonempty interior in a real Banach space and let $cc(K)$ denote the family of all nonempty convex compact subsets of $K$. If ${F_{t}: tgeq 0}$ is a regular cosine family of continuous linear set-valuedfunctions $F_{t}colon Klongrightarrow cc(K)$, $xin F_{t}(x)$ for $tgeq 0$, $xin K$ and $F_{t}circ F_{s}=F_{s}circ F_{t}$ for $s,t geq 0$, then[D^{2}F_{t}(x)=F_{t}(H(x))]for $xin K$ and $tgeq 0$, where $D^{2}F_{t}(x)$ denotes the second Hukuhara derivative of $F_{t}(x)$ with respect to $t$ and $H(x)$ is the second Hukuhara derivative of this multifunction at $t=0$.
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机译:设$ K $为实Banach空间中具有非空内部的封闭凸锥,并令$ cc(K)$表示$ K $的所有非空凸紧致子集的族。如果$ {F_ {t}:t geq 0 } $是连续余弦线性设定值函数$ F_ {t} 冒号K longrightarrow cc(K)$,$ x 在F_ {t }(x)$ for $ t geq 0 $,$ x in K $和$ F_ {t} circ F_ {s} = F_ {s} circ F_ {t} $ for $ s,t geq 0 $,则 [D ^ {2} F_ {t}(x)= F_ {t}(H(x))]对于$ x in K $和$ t geq 0 $,其中$ D ^ {2} F_ {t}(x)$表示$ F_ {t}(x)$相对于$ t $的第二个Hukuhara导数,$ H(x)$是该多功能函数在$ t的第二个Hukuhara导数= 0 $。
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