Joint BCAM-UPV/EHU Analysis and PDE seminar: Catalan operators in Operator Theory
Data: Og, Mai 9 2024
Ordua: 12:00-13:00
Lekua: UPV/EHU
Hizlariak: Pedro José Miana Sanz - Universidad de Zaragoza
Let $c=(C_n)_{n\ge 0}$ be the Catalan sequence and $T$ a linear and bounded operator on a Banach space $X$ such $4T$ is a power-bounded operator. The Catalan generating function is defined by the following Taylor series,
C(T) := \sum_{n=0}^\infty C_nT^n.
Note that the operator $C(T)$ is a solution of the quadratic equation $TY^2-Y+I=0.$ In this talk we study this algebraic equation in the case that $T$ is the infinitesimal generator of a C_0-semigroup. We express $C(T)$ by means of an integral representations which involves the resolvent operator $(\lambda-T)^{-1}$ or the C_0-semigroup. In the case that $T$ is a bounded operator, we define powers of the Catalan generating function $C(T)$ in terms of the Catalan triangle numbers. Finally, we give some particular examples to illustrate our results and some ideas to continue this research in the future. This is a research proyect with Alejandro Mahillo (Universidad de Zaragoza) and Natalia Romero (Universidad de La Rioja).
Antolatzaileak:
UPV/EHU & BCAM
Hizlari baieztatuak:
Pedro José Miana Sanz - Universidad de Zaragoza
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