Growth rate of eventually positive Kreiss bounded C0-semigroups on Lp and C(K)
Abstract
In this paper, we compare several Ces\`aro and Kreiss type boundedness conditions for a C0-semigroup on a Banach space and we show that those conditions are all equivalent for a positive semigroup on a Banach lattice. Furthermore, we give an estimate of the growth rate of a Kreiss bounded and eventually positive C0-semigroup (Tt)t 0 on certain Banach lattices X. We prove that if X is an Lp-space, 1<p<+∞, then \|Tt\| = O(t/(t)(1/p,1/p')) and if X is an (AL) or (AM)-space, then \|Tt\|=O(t1-ε) for some ε ∈ (0,1), improving previous estimates.
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