A relationship between various types of dichotomy (Q1603145)

The author considers the linear system \[ {dx\over dt}= A(t) x,\quad t\geq 0,\tag{1} \] with piecewise continuous function \(A\) and the solution matrix \(X(t)\), \(X(0)= E\). \(ED\) is the set of all \(A\) for which (1) is exponential dichotonomous. Equation (1) is called to be \(L^p\)-dichotomous, \(0< p\leq\infty\), if there exists a pair of complementary projections \(P_1\) and \(P_2\) and a constant \(K>0\) such that \[ \int^t_0\|X(t)P_1 X^{-1}(\tau)\|^p d\tau+ \int^\infty_t\|X(t) P_2X^{-1}(\tau)\|^p d\tau\leq K,\;t\geq 0. \] \(L^pD\) is the set of all \(A\) for which (1) is \(L^p\)-dichotomous. The important relation \[ ED= L^pD\cap L^\infty D,\quad p> 0, \] is proved.