-20%
Evolutionary Equations: Picard’s Theorem for Partial Differential Equations, and Applications
Price range: ₹3,576.00 through ₹4,410.00
This book is open access, which means that you have free and unlimited access Provides self-contained and comprehensive round up of the theory of evolutionary equations The matter is confined to elementary Hilbert space theory and complex analysis Easy access to challenging theory of time-dependent partial differential equations
-20%
Evolutionary Equations: Picard’s Theorem for Partial Differential Equations, and Applications
Price range: ₹3,576.00 through ₹4,410.00
This book is open access, which means that you have free and unlimited access Provides self-contained and comprehensive round up of the theory of evolutionary equations The matter is confined to elementary Hilbert space theory and complex analysis Easy access to challenging theory of time-dependent partial differential equations
-20%
The Callias Index Formula Revisited
Original price was: ₹3,948.00.₹3,159.00Current price is: ₹3,159.00.
These lecture notes aim at providing a purely analytical and accessible proof of the Callias index formula. In various branches of mathematics (particularly, linear and nonlinear partial differential operators, singular integral operators, etc.) and theoretical physics (e.g., nonrelativistic and relativistic quantum mechanics, condensed matter physics, and quantum field theory), there is much interest in computing Fredholm indices of certain linear partial differential operators.
-20%
The Callias Index Formula Revisited
Original price was: ₹3,948.00.₹3,159.00Current price is: ₹3,159.00.
These lecture notes aim at providing a purely analytical and accessible proof of the Callias index formula. In various branches of mathematics (particularly, linear and nonlinear partial differential operators, singular integral operators, etc.) and theoretical physics (e.g., nonrelativistic and relativistic quantum mechanics, condensed matter physics, and quantum field theory), there is much interest in computing Fredholm indices of certain linear partial differential operators.