Author:
Publisher:
ISBN:
Category : Differentiable mappings
Languages : en
Pages : 28
Book Description
On the Differentiability of Fuzzy-valued Mappings and the Stability of a Fuzzy Differential Equation
Author:
Publisher:
ISBN:
Category : Differentiable mappings
Languages : en
Pages : 28
Book Description
Publisher:
ISBN:
Category : Differentiable mappings
Languages : en
Pages : 28
Book Description
Theoretical Evaluation of Elliptic Integrals Based on Compupter Graphics
Author: Valério Ramos Batista
Publisher:
ISBN:
Category : Computer simulation
Languages : en
Pages : 26
Book Description
Publisher:
ISBN:
Category : Computer simulation
Languages : en
Pages : 26
Book Description
Critical and Subcritical Elliptic Systems in Dimension Two
Author: Djairo Guedes de Figueiredo
Publisher:
ISBN:
Category : Boundary value problems
Languages : en
Pages : 26
Book Description
Publisher:
ISBN:
Category : Boundary value problems
Languages : en
Pages : 26
Book Description
Comparison of Genomic Sequences Using the Hamming Distance
Author: Hildete Prisco Pinheiro
Publisher:
ISBN:
Category : Amino acid sequence
Languages : en
Pages : 28
Book Description
Publisher:
ISBN:
Category : Amino acid sequence
Languages : en
Pages : 28
Book Description
Characterization of Solutions in Variational Problems
Author:
Publisher:
ISBN:
Category : Calculus of variations
Languages : en
Pages : 30
Book Description
Publisher:
ISBN:
Category : Calculus of variations
Languages : en
Pages : 30
Book Description
Ordinary And Partial Differential Equations For The Beginner
Author: Laszlo Szekelyhidi
Publisher: World Scientific Publishing Company
ISBN: 9814725013
Category : Mathematics
Languages : en
Pages : 254
Book Description
This textbook is intended for college, undergraduate and graduate students, emphasizing mainly on ordinary differential equations. However, the theory of characteristics for first order partial differential equations and the classification of second order linear partial differential operators are also included. It contains the basic material starting from elementary solution methods for ordinary differential equations to advanced methods for first order partial differential equations.In addition to the theoretical background, solution methods are strongly emphasized. Each section is completed with problems and exercises, and the solutions are also provided. There are special sections devoted to more applied tools such as implicit equations, Laplace transform, Fourier method, etc. As a novelty, a method for finding exponential polynomial solutions is presented which is based on the author's work in spectral synthesis. The presentation is self-contained, provided the reader has general undergraduate knowledge.
Publisher: World Scientific Publishing Company
ISBN: 9814725013
Category : Mathematics
Languages : en
Pages : 254
Book Description
This textbook is intended for college, undergraduate and graduate students, emphasizing mainly on ordinary differential equations. However, the theory of characteristics for first order partial differential equations and the classification of second order linear partial differential operators are also included. It contains the basic material starting from elementary solution methods for ordinary differential equations to advanced methods for first order partial differential equations.In addition to the theoretical background, solution methods are strongly emphasized. Each section is completed with problems and exercises, and the solutions are also provided. There are special sections devoted to more applied tools such as implicit equations, Laplace transform, Fourier method, etc. As a novelty, a method for finding exponential polynomial solutions is presented which is based on the author's work in spectral synthesis. The presentation is self-contained, provided the reader has general undergraduate knowledge.
Towards the Mathematics of Quantum Field Theory
Author: Frédéric Paugam
Publisher: Springer Science & Business Media
ISBN: 3319045644
Category : Science
Languages : en
Pages : 485
Book Description
This ambitious and original book sets out to introduce to mathematicians (even including graduate students ) the mathematical methods of theoretical and experimental quantum field theory, with an emphasis on coordinate-free presentations of the mathematical objects in use. This in turn promotes the interaction between mathematicians and physicists by supplying a common and flexible language for the good of both communities, though mathematicians are the primary target. This reference work provides a coherent and complete mathematical toolbox for classical and quantum field theory, based on categorical and homotopical methods, representing an original contribution to the literature. The first part of the book introduces the mathematical methods needed to work with the physicists' spaces of fields, including parameterized and functional differential geometry, functorial analysis, and the homotopical geometric theory of non-linear partial differential equations, with applications to general gauge theories. The second part presents a large family of examples of classical field theories, both from experimental and theoretical physics, while the third part provides an introduction to quantum field theory, presents various renormalization methods, and discusses the quantization of factorization algebras.
Publisher: Springer Science & Business Media
ISBN: 3319045644
Category : Science
Languages : en
Pages : 485
Book Description
This ambitious and original book sets out to introduce to mathematicians (even including graduate students ) the mathematical methods of theoretical and experimental quantum field theory, with an emphasis on coordinate-free presentations of the mathematical objects in use. This in turn promotes the interaction between mathematicians and physicists by supplying a common and flexible language for the good of both communities, though mathematicians are the primary target. This reference work provides a coherent and complete mathematical toolbox for classical and quantum field theory, based on categorical and homotopical methods, representing an original contribution to the literature. The first part of the book introduces the mathematical methods needed to work with the physicists' spaces of fields, including parameterized and functional differential geometry, functorial analysis, and the homotopical geometric theory of non-linear partial differential equations, with applications to general gauge theories. The second part presents a large family of examples of classical field theories, both from experimental and theoretical physics, while the third part provides an introduction to quantum field theory, presents various renormalization methods, and discusses the quantization of factorization algebras.
The American Mathematical Monthly
Author:
Publisher:
ISBN:
Category : Electronic journals
Languages : en
Pages : 556
Book Description
Includes section "Recent publications."
Publisher:
ISBN:
Category : Electronic journals
Languages : en
Pages : 556
Book Description
Includes section "Recent publications."
Ordinary Differential Equations
Author: William A. Adkins
Publisher: Springer Science & Business Media
ISBN: 1461436184
Category : Mathematics
Languages : en
Pages : 807
Book Description
Unlike most texts in differential equations, this textbook gives an early presentation of the Laplace transform, which is then used to motivate and develop many of the remaining differential equation concepts for which it is particularly well suited. For example, the standard solution methods for constant coefficient linear differential equations are immediate and simplified, and solution methods for constant coefficient systems are streamlined. By introducing the Laplace transform early in the text, students become proficient in its use while at the same time learning the standard topics in differential equations. The text also includes proofs of several important theorems that are not usually given in introductory texts. These include a proof of the injectivity of the Laplace transform and a proof of the existence and uniqueness theorem for linear constant coefficient differential equations. Along with its unique traits, this text contains all the topics needed for a standard three- or four-hour, sophomore-level differential equations course for students majoring in science or engineering. These topics include: first order differential equations, general linear differential equations with constant coefficients, second order linear differential equations with variable coefficients, power series methods, and linear systems of differential equations. It is assumed that the reader has had the equivalent of a one-year course in college calculus.
Publisher: Springer Science & Business Media
ISBN: 1461436184
Category : Mathematics
Languages : en
Pages : 807
Book Description
Unlike most texts in differential equations, this textbook gives an early presentation of the Laplace transform, which is then used to motivate and develop many of the remaining differential equation concepts for which it is particularly well suited. For example, the standard solution methods for constant coefficient linear differential equations are immediate and simplified, and solution methods for constant coefficient systems are streamlined. By introducing the Laplace transform early in the text, students become proficient in its use while at the same time learning the standard topics in differential equations. The text also includes proofs of several important theorems that are not usually given in introductory texts. These include a proof of the injectivity of the Laplace transform and a proof of the existence and uniqueness theorem for linear constant coefficient differential equations. Along with its unique traits, this text contains all the topics needed for a standard three- or four-hour, sophomore-level differential equations course for students majoring in science or engineering. These topics include: first order differential equations, general linear differential equations with constant coefficients, second order linear differential equations with variable coefficients, power series methods, and linear systems of differential equations. It is assumed that the reader has had the equivalent of a one-year course in college calculus.
Geometric Configurations of Singularities of Planar Polynomial Differential Systems
Author: Joan C. Artés
Publisher: Springer Nature
ISBN: 3030505707
Category : Mathematics
Languages : en
Pages : 699
Book Description
This book addresses the global study of finite and infinite singularities of planar polynomial differential systems, with special emphasis on quadratic systems. While results covering the degenerate cases of singularities of quadratic systems have been published elsewhere, the proofs for the remaining harder cases were lengthier. This book covers all cases, with half of the content focusing on the last non-degenerate ones. The book contains the complete bifurcation diagram, in the 12-parameter space, of global geometrical configurations of singularities of quadratic systems. The authors’ results provide - for the first time - global information on all singularities of quadratic systems in invariant form and their bifurcations. In addition, a link to a very helpful software package is included. With the help of this software, the study of the algebraic bifurcations becomes much more efficient and less time-consuming. Given its scope, the book will appeal to specialists on polynomial differential systems, pure and applied mathematicians who need to study bifurcation diagrams of families of such systems, Ph.D. students, and postdoctoral fellows.
Publisher: Springer Nature
ISBN: 3030505707
Category : Mathematics
Languages : en
Pages : 699
Book Description
This book addresses the global study of finite and infinite singularities of planar polynomial differential systems, with special emphasis on quadratic systems. While results covering the degenerate cases of singularities of quadratic systems have been published elsewhere, the proofs for the remaining harder cases were lengthier. This book covers all cases, with half of the content focusing on the last non-degenerate ones. The book contains the complete bifurcation diagram, in the 12-parameter space, of global geometrical configurations of singularities of quadratic systems. The authors’ results provide - for the first time - global information on all singularities of quadratic systems in invariant form and their bifurcations. In addition, a link to a very helpful software package is included. With the help of this software, the study of the algebraic bifurcations becomes much more efficient and less time-consuming. Given its scope, the book will appeal to specialists on polynomial differential systems, pure and applied mathematicians who need to study bifurcation diagrams of families of such systems, Ph.D. students, and postdoctoral fellows.