Geometry and operator theory on quaternionic Hilbert spaces

Abstract: In this article, we study the geometry and operator theory on quaternionic Hilbert spaces. As it is well-known, Cowen-Douglas operators are a class of non-normal operators related to complex geometry on complex Hilbert spaces. Our purpose is to generalize this concept on quaternionic Hilbert spaces. At the beginning, we study a class of complex holomorphic curves which naturally induce complex vector bundles as sub-bundles in the product space of the base space and a quaternionic Hilbert space. Then we introdu… Show more

“…We expect that, by using the notion of quaternionic Cowen-Douglas operators related to geometry of quaternionic Hilbert spaces developed in [10] and further suitable arguments, may achieve affirmative answer to the Question 3.8.…”

Strongly irreducible factorization of quaternionic operators and Riesz decomposition theorem

“…We expect that, by using the notion of quaternionic Cowen-Douglas operators related to geometry of quaternionic Hilbert spaces developed in [10] and further suitable arguments, may achieve affirmative answer to the Question 3.8.…”

Strongly irreducible factorization of quaternionic operators and Riesz decomposition theorem

Some Invariants of $$U(1,1;\mathbb {H})$$ and Diagonalization

Strongly irreducible factorization of quaternionic operators and Riesz decomposition theorem