Geodesic
COMPARISON BETWEEN USUAL AND VECTOR TIME DERIVATIVES
Glasgow mathematical journal, Tome 45 (2003) no. 1, pp. 167-172

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We prove two comparison theorems between the time derivative of a real function $u(x, t)$ such that $u(\cdot,t)$ belongs to L$^1 (\Omega)$ for all $t$, and the time derivative of the vector function $\skew2\hat{u}(t) = u(\cdot, t)$.
DOI : 10.1017/S001708950200112X
Mots-clés : 47D03, 47H20 
LÓPEZ-POUSO, ÓSCAR. COMPARISON BETWEEN USUAL AND VECTOR TIME DERIVATIVES. Glasgow mathematical journal, Tome 45 (2003) no. 1, pp. 167-172. doi: 10.1017/S001708950200112X
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     title = {COMPARISON {BETWEEN} {USUAL} {AND} {VECTOR} {TIME} {DERIVATIVES}},
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