Geodesic
The Largest Class of Hereditary Systems Defining a C 0 Semigroup on the Product Space
Canadian journal of mathematics, Tome 32 (1980) no. 4, pp. 969-978

Voir la notice de l'article provenant de la source Cambridge University Press

The object of this paper is to characterize the largest class of autonomous linear hereditary differential systems which generates a strongly continuous semigroup of class C 0 on the product space Mp = Rn × Lp(-h, 0), 1 ≦ p < ∞, 0 < h ≦ + ∞ (R is the field of real numbers and Lp(– h, 0) is the space of equivalence classes of Lebesgue measurable maps x:[ – h, 0] ⌒ R → R n which are p-integrable in [ –h, 0] ⌒R.) Our results extend and complete those of [4] and [15], [16] for linear hereditary differential equations possessing “finite memory” (h < + ∞ ) and those of [14], [5] and [6] in the “infinite memory case (h = + ∞ )”.Consider the autonomous linear hereditary differential equation(1.1) where x(t) ∊ R n , x:[–h, 0] ⌒ R → R n is defined as xt(θ) = x(t + θ), C(–h, 0) is the space of bounded continuous functions [–h, 0] ⌒ R → R n and L:C(–h, 0) → R n is a continuous linear map. 
Delfour, M. C. The Largest Class of Hereditary Systems Defining a C 0 Semigroup on the Product Space. Canadian journal of mathematics, Tome 32 (1980) no. 4, pp. 969-978. doi: 10.4153/CJM-1980-074-8
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