\(C_0\)-semigroups associated with uniquely ergodic Kantorovich modifications of operators

1. Abel, U., Heilmann, M.: The complete asymptotic expansion for Bernstein–Durrmeyer operators with Jacobi weights. Mediterr. J. Math. 1, 487–499 (2004)

   Article  MathSciNet  MATH  Google Scholar 

2. Altomare, F., Campiti, M.: Korovkin-type Approximation Theory and its Applications. Walter de Gruyter, Berlin, Munich, Boston (1994)

   Book  MATH  Google Scholar 

3. Altomare, F., Cappelletti Montano, M., Leonessa, V., Raşa, I.: Markov Operators, Positive Semigroups and Approximation Processes. Walter de Gruyter, Berlin, Munich, Boston (2014)

   MATH  Google Scholar 

4. Altomare, F., Raşa, I.: On some classes of diffusion equations and related approximation problems. In: de Bruin, M.G., Mache, D.H., Szabados, J. (eds.) Trends and Applications in Constructive Approximation. International Series of Numerical Mathematics, vol. 151, pp. 13–26. Birkhäuser Verlag, Basel (2005)

   Chapter  Google Scholar 

5. Altomare, F., Raşa, I.: Lipschitz contractions, unique ergodicity and asymptotics of Markov semigroups. Bolletino U. M. I 9, 1–17 (2012)

   MathSciNet  MATH  Google Scholar 

6. Berens, H., Xu, Y.: On Bernstein–Durrmeyer polynomials with Jacobi weights. In: Approximation Theory and Functional Analysis (College Station, TX, 1990), pp. 25–46. Academic Press, Boston (1991)

7. Heilmann, M., Raşa, I.: Eigenstructure and iterates for uniquely ergodic Kantorovich modifications of operators. Positivity 21, 897–910 (2017). https://doi.org/10.1007/s11117-016-0441-1

   Article  MathSciNet  MATH  Google Scholar 

8. Mugnolo, D., Rhandi, A.: On the domain of a Fleming–Viot-type operator on an \(L^p\)-space with invariant measure. Note Mat. 31(1), 139–148 (2011)

   MathSciNet  MATH  Google Scholar 

Download references