Automatic time continuity of positive matrix and operator semigroups
Abstract
We consider a matrix semigroup T: [0,∞) Rd × d without assuming any measurability properties and show that, if T is bounded close to 0 and T(t) 0 entrywise for all t, then T is continuous. This complements classical results for the scalar-valued case. We also prove an analogous result if T takes values in the positive operators over a sequence space.
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