Abstract:
The theory and study of integral operators is a wide history. Specially, boundedness and
compactness properties of different integral operators have been widely studied on several
spaces. Due to this, there is a big interest to study this properties for the generalized
Volterra-type integral operator also and have been studied by many researchers acting
between different spaces. In this thesis, we studied the and compactness properties of
generalized Volterra-type integral operator acting on generalized Fock spaces F
φ
p
, where
0 < p ≤ ∞ and φ is a faster growing weight when compared with the Gaussian weight
function |z|
2
2
.