H-Toeplitz operators on Fock space

Abstract: This paper explores H-Toeplitz operators on the Fock space, unifying aspects of Toeplitz and Hankel operators while introducing novel structural properties. We derive explicit matrix representations for these operators with respect to the orthonormal basis of monomials, analyze their commutativity, and establish compactness criteria. Key results include the characterization of commuting H-Toeplitz operators with harmonic symbols and the proof that non-zero H-Toeplitz operators cannot be Hilbert-Schmidt. Additionally, we introduce directed H-Toeplitz graphs to visualize adjacency relations encoded by these operators, demonstrating their structural patterns through indegree and outdegree sequences. Our findings bridge theoretical operator theory with graphical representations, offering insights into the interplay between analytic function spaces and operator algebras.