1 - Principles of functional analysis |
2 - A course in functional analysis |
3 - Banach space theory. The basis for linear and nonlinear analysis |
4 - Orlicz spaces and generalized Orlicz spaces |
5 - Topology of singular space and constructible sheaves |
6 - Classical Banach spaces. I : Sequence spaces |
7 - Convex functions and Orlicz spaces |
8 - Introduction to complex analytic geometry |
9 - Locally convex spaces over non-Archimedean valued fields |
10 - Methods of modern mathematical physics. I, Functional analysis - Revised and enlarged edition |