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*Author(s)*

*Book*

*Title*1 | Riley K.F. and Hobson M. P. | Essential Mathematical Methods for the physical sciences |

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2 | Riley K.F. and Hobson M. P. | Student Solution Manual for Essential Mathematical Methods for the Physical Sciences |

Review; This Student Solution Manual provides complete solutions to all the odd-numbered problems in Essential Mathematical Methods for the Physical Sciences. It takes students through each problem step-by-step, so they can clearly see how the solution is reached, and understand any mistakes in their own working. Students will learn by example how to select an appropriate method, improving their problem-solving skills. |
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2 | Daniel Zwillinger | Hand book of differential equations |

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3 | Daniel Zwillinger | Hand book of differential equations 3rd ed. |

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4 | Niels Walet | Mathematical methods for Physics |

5 | James Nearing | Mathematical methods for Physics |

Review; Having the right answer doesn’t guarantee understanding. Encouraging students’ development of intuition, this original work begins with a review of basic mathematics and advances to infinite series, complex algebra, differential equations, and Fourier series. Succeeding chapters explore multivariable and vector calculus, partial differential equations, numerical and complex analysis, tensors, complex analysis, and more. 2010 edition. |
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6 | I.S. Gradshteyn and I.M. Ryzhik | Table of Integrals, Series, and Products 7th Edition |

Review; The Table of Integrals, Series, and Products is the major reference source for integrals in the English language. It is essential for mathematicians, scientists, and engineers, who rely on it when identifying and subsequently solving extremely complex problems. The Sixth Edition is a corrected and expanded version of the previous edition. It was completely reset in order to add more material and to enhance the visual appearance of the information. To preserve compatibility with the previous edition, the original numbering system for entries has been retained. New entries and sections have been inserted in a manner consistent with the original scheme. Whenever possible, new entries and corrections have been checked by means of symbolic computation.… |
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7 | Peter Szekeres | A course in modern mathematical physics: groups, Hilbert space and differential geometry |

Review; This book provides an introduction to the mathematics of modern physics, presenting concepts and techniques in mathematical physics at a level suitable for advanced undergraduates and beginning graduate students. The aim is to introduce the reader to modern mathematical thinking within a physics setting. Topics covered include tensor/exterior algebra, differential geometry, topology, Lie groups and Lie algebras, distribution theory, fundamental analysis and Hilbert spaces. The book includes exercises and worked examples, to test the students’ understanding of the various concepts, as well as extending the themes covered in the main text. The book will be suitable for mathematical and theoretical physicists as well as applied mathematicians. |
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7 | P. Szekeres | Solutions to problems of A course in Mathematical Physics; Groups, Hilbert Spaces and Differential Geometry |

8 | WILLI-HANS STEEB | Problems and Solutions in Theoretical and Mathematical Physics VOLUME I |

Review; The purpose of this book is to supply a collection of problems together with their detailed solution which will prove to be valuable to students as well as to research workers in the fields of mathematics, physics, engineering and other sciences. The topics range in difficulty from elementary to advanced. Almost all problems are solved in detail and most of the problems are self-contained. All relevant definitions are given. Students can learn important principles and strategies required for problem solving. Teachers will also find this text useful as a supplement, since important concepts and techniques are developed in the problems. The material was tested in the author’s lectures given around the world.The book is divided… |
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