-20%
Analysis on Fock Spaces
Price range: ₹5,244.00 through ₹6,078.00
Fills the gap in existing literature concerning the natural Lp spaces of analytic functions First book on the market concerning Fock spaces, summarizing the most important results and techniques in one place, so that new comers, especially graduate students, have a convenient reference to the subject Features new and simpler proofs than the existing ones in the literature Includes exercises of various levels at the end of every chapter Contains an extensive bibliography
-20%
Analysis on Fock Spaces
Price range: ₹5,244.00 through ₹6,078.00
Fills the gap in existing literature concerning the natural Lp spaces of analytic functions First book on the market concerning Fock spaces, summarizing the most important results and techniques in one place, so that new comers, especially graduate students, have a convenient reference to the subject Features new and simpler proofs than the existing ones in the literature Includes exercises of various levels at the end of every chapter Contains an extensive bibliography
-20%
Spaces of Holomorphic Functions in the Unit Ball
Price range: ₹5,661.00 through ₹6,495.00
Only book to discuss spaces of holomorphic functions in the unit ball
-20%
Spaces of Holomorphic Functions in the Unit Ball
Price range: ₹5,661.00 through ₹6,495.00
Only book to discuss spaces of holomorphic functions in the unit ball
-20%
Theory of Bergman Spaces
Original price was: ₹5,512.00.₹4,410.00Current price is: ₹4,410.00.
15 years ago the function theory and operator theory connected with the Hardy spaces was well understood (zeros| factorization| interpolation| invariant subspaces| Toeplitz and Hankel operators, etc.). None of the techniques that led to all the information about Hardy spaces worked on their close relatives the Bergman spaces.
-20%
Theory of Bergman Spaces
Original price was: ₹5,512.00.₹4,410.00Current price is: ₹4,410.00.
15 years ago the function theory and operator theory connected with the Hardy spaces was well understood (zeros| factorization| interpolation| invariant subspaces| Toeplitz and Hankel operators, etc.). None of the techniques that led to all the information about Hardy spaces worked on their close relatives the Bergman spaces.