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Best Selling Books
See Yourself in Cyber: Security Careers Beyond Hacking
₹ 2,800.00
In See Yourself in Cyber: Security Careers Beyond Hacking, information security strategist and educator Ed Adams delivers a unique and insightful discussion of the many different ways the people in your organization—inhabiting a variety of roles not traditionally associated with cybersecurity—can contribute to improving its cybersecurity backbone. You’ll discover how developers, DevOps professionals, managers, and others can strengthen your cybersecurity. You’ll also find out how improving your firm’s diversity and inclusion can have dramatically positive effects on your team’s talent.
See Yourself in Cyber: Security Careers Beyond Hacking
₹ 2,800.00
In See Yourself in Cyber: Security Careers Beyond Hacking, information security strategist and educator Ed Adams delivers a unique and insightful discussion of the many different ways the people in your organization—inhabiting a variety of roles not traditionally associated with cybersecurity—can contribute to improving its cybersecurity backbone. You’ll discover how developers, DevOps professionals, managers, and others can strengthen your cybersecurity. You’ll also find out how improving your firm’s diversity and inclusion can have dramatically positive effects on your team’s talent.
-21%
Fractional Stochastic Differential Equations
Published on 2024
Original price was: ₹ 13,313.00.₹ 10,650.00Current price is: ₹ 10,650.00.
This book provides a thorough conversation on the underpinnings of Covid-19 spread modelling by using stochastics nonlocal differential and integral operators with singular and non-singular kernels. The book presents the dynamic of Covid-19 spread behaviour worldwide. It is noticed that the spread dynamic followed process with nonlocal behaviours which resemble power law, fading memory, crossover and stochastic behaviours. Fractional stochastic differential equations are therefore used to model spread behaviours in different parts of the worlds. The content coverage includes brief history of Covid-19 spread worldwide from December 2019 to September 2021, followed by statistical analysis of collected data for infected, death and recovery classes.
-21%
Fractional Stochastic Differential Equations
Original price was: ₹ 13,313.00.₹ 10,650.00Current price is: ₹ 10,650.00.
This book provides a thorough conversation on the underpinnings of Covid-19 spread modelling by using stochastics nonlocal differential and integral operators with singular and non-singular kernels. The book presents the dynamic of Covid-19 spread behaviour worldwide. It is noticed that the spread dynamic followed process with nonlocal behaviours which resemble power law, fading memory, crossover and stochastic behaviours. Fractional stochastic differential equations are therefore used to model spread behaviours in different parts of the worlds. The content coverage includes brief history of Covid-19 spread worldwide from December 2019 to September 2021, followed by statistical analysis of collected data for infected, death and recovery classes.
-20%
Anisotropic hp-Mesh Adaptation Methods
Original price was: ₹ 7,607.00.₹ 6,086.00Current price is: ₹ 6,086.00.
Mesh adaptation methods can have a profound impact on the numerical solution of partial differential equations. If devised and implemented properly, adaptation significantly reduces the size of the algebraic systems resulting from the discretization, while ensuring that applicable error tolerances are met. In this monograph, drawing from many years of experience, the authors give a comprehensive presentation of metric-based anisotropic hp-mesh adaptation methods.
A large part of this monograph is devoted to the derivation of computable interpolation error estimates on simplicial meshes, which take into account the geometry of mesh elements as well as the anisotropic features of the interpolated function. These estimates are then used for the optimization of corresponding finite element spaces in a variety of settings. Both steady and time dependent problems are treated, as well as goal-oriented adaptation. Practical aspects of implementation are also explored, including several algorithms. Many numerical experiments using the discontinuous Galerkin method are presented to illustrate the performance of the adaptive techniques.This monograph is intended for scientists and researchers, including doctoral and master-level students. Portions of the text can also be used as study material for advanced university lectures concerning a posteriori error analysis and mesh adaptation.
-20%
Anisotropic hp-Mesh Adaptation Methods
Original price was: ₹ 7,607.00.₹ 6,086.00Current price is: ₹ 6,086.00.
Mesh adaptation methods can have a profound impact on the numerical solution of partial differential equations. If devised and implemented properly, adaptation significantly reduces the size of the algebraic systems resulting from the discretization, while ensuring that applicable error tolerances are met. In this monograph, drawing from many years of experience, the authors give a comprehensive presentation of metric-based anisotropic hp-mesh adaptation methods.
A large part of this monograph is devoted to the derivation of computable interpolation error estimates on simplicial meshes, which take into account the geometry of mesh elements as well as the anisotropic features of the interpolated function. These estimates are then used for the optimization of corresponding finite element spaces in a variety of settings. Both steady and time dependent problems are treated, as well as goal-oriented adaptation. Practical aspects of implementation are also explored, including several algorithms. Many numerical experiments using the discontinuous Galerkin method are presented to illustrate the performance of the adaptive techniques.This monograph is intended for scientists and researchers, including doctoral and master-level students. Portions of the text can also be used as study material for advanced university lectures concerning a posteriori error analysis and mesh adaptation.
-20%
Elliptic Carleman Estimates and Applications to Stabilization and Controllability, Volume I
Original price was: ₹ 12,362.00.₹ 9,890.00Current price is: ₹ 9,890.00.
This monograph explores applications of Carleman estimates in the study of stabilization and controllability properties of partial differential equations, including the stabilization property of the damped wave equation and the null-controllability of the heat equation. All analysis is performed in the case of open sets in the Euclidean space; a second volume will extend this treatment to Riemannian manifolds.The first three chapters illustrate the derivation of Carleman estimates using pseudo-differential calculus with a large parameter. Continuation issues are then addressed, followed by a proof of the logarithmic stabilization of the damped wave equation by means of two alternative proofs of the resolvent estimate for the generator of a damped wave semigroup.The authors then discuss null-controllability of the heat equation, its equivalence with observability, and how the spectral inequality allows one to either construct a control function or prove the observability inequality.The final part of the book is devoted to the exposition of some necessary background material: the theory of distributions, invariance under change of variables, elliptic operators with Dirichlet data and associated semigroup, and some elements from functional analysis and semigroup theory.
-20%
Elliptic Carleman Estimates and Applications to Stabilization and Controllability, Volume I
Original price was: ₹ 12,362.00.₹ 9,890.00Current price is: ₹ 9,890.00.
This monograph explores applications of Carleman estimates in the study of stabilization and controllability properties of partial differential equations, including the stabilization property of the damped wave equation and the null-controllability of the heat equation. All analysis is performed in the case of open sets in the Euclidean space; a second volume will extend this treatment to Riemannian manifolds.The first three chapters illustrate the derivation of Carleman estimates using pseudo-differential calculus with a large parameter. Continuation issues are then addressed, followed by a proof of the logarithmic stabilization of the damped wave equation by means of two alternative proofs of the resolvent estimate for the generator of a damped wave semigroup.The authors then discuss null-controllability of the heat equation, its equivalence with observability, and how the spectral inequality allows one to either construct a control function or prove the observability inequality.The final part of the book is devoted to the exposition of some necessary background material: the theory of distributions, invariance under change of variables, elliptic operators with Dirichlet data and associated semigroup, and some elements from functional analysis and semigroup theory.