Check this post regularly for updates on the link status of various books!
Update 1 :
A new and improved (better clean up, OCRed, bookmarked) version of Tarasov’s book This Amazingly Symmetric World has been upped.
The link in the main post has also been updated.
Will try to re-up the rest (new and improved versions) of Tarasov with two new additions (Laser Physics, and Laser Physics and Applications) this week.
Check this post for more updates, till we get back on track.
D
All the links to all the post are dead!
Will see what can be done, and update you soon.
Thanks NK for pointing out.
Update: will start uploading enhanced/better versions of all files soon.
D
We now come to Lobachevskian Geometry by A. S. Smogorzhevsky in the Little Mathematics Library series.
As the title of the book suggests the book is about one of the non-Euclidean geometries viz. the one by Lobachevsky. The back cover of the book says:
The author, the late Alexander Smogorzhevsky, D.Sc., was professor of mathematics at Kiev Polytechnical Institute and a specialist in Lobachevskian geometiy. He began his career as a school teacher in the Vinnitsa Region of the Ukraine, and later lectured at Kiev Polytechnical Institute for nearly forty years. He published over a hundred papers, both of original research and of a popularizing character, many of them devoted to non-Euclidean geometry: The Theory of Geometrical Constructions in Lobachevskian Space, On Some Plane Curves in Lobachevskian Geometry, and Lobachevsky’s Basic Ideas, to name a few.
And the Author’s Note before the book begins says:
The aim of this book is to acquaint the reader with the fundamentals of Lobachevsky’s non-Euclidean geometry.
The famous Russian mathematician N. I. Lobachevsky was an outstanding thinker, to whom is credited one of the greatest mathematical discoveries, the construction of an original geometric
system distinct from Euclid’s geometry. The reader will find
a brief biography of N. I. Lobachevsky in Sec. I.Euclidean and Lobachevskian geometries have much in common,
differing only in their definitions, theorems and formulas as
regards the parallel-postulate. To clarify the reasons for these
differences we must consider how the basic geometric concepts
originated and developed, which is done in Sec. 2.Apart from a knowledge of school plane geometry and trigonometry reading our pamphlet calls for a knowledge of the transformation known as inversion, the most important features of which are reviewed in Sec. 3. We hope that the reader will be able to grasp its principles with profit to himself and without great difficulty, since it, and Sec. 10, play very important, though ancillary, role in our exposition.
The book was translated from the Russian by V. Kisin and was first published by Mir in 1976 with reprint in 1982.
and here
In the Little Mathematics Library series we now come to Remarkable Curves, by a very remarkable author A. I. Markushevich. I am saying that he is remarkable as he has many good books under his sleeve, some of which we may see in the future.
As the title suggests the books takes the reader through various curves and how they can be materialised, just have a look at the table of contents below. The preface of the book says:
This book has been written mainly for high school students, but it will also be helpful to anyone studying on their own whose mathematical education is confined to high school mathematics. The book is based on a lecture I gave to Moscow schoolchildren of grades 7 and 8 (13 and 14 years old).
In preparing the lecture for publication I expanded the material,while at the same time trying not to make the treatment any less accessible. The most substantial addition is Section 13 on the ellipse, hyperbola and parabola viewed as conic sections.
For the sake of brevity most of the results on curves are given with-
out proof, although in many cases their proofs could have been given
in a form that readers could understand.The third Russian edition is enlarged by including the results on
Pascal’s and Brianchon’s theorems (on inscribed and circumscribed
hexagons), the spiral of Archimedes, the catenary, the logarithmic
spiral and the involute of a circle.
The book was translated from the Russian by Yu. A. Zdorovov and was first published by Mir in 1980.
and here
We now come to Proof in Geometry in by A. I. Fetisov in the Little Mathematics Library series.
The Introduction of the book says:
The pupils often fail to understand why truths should be proved that seem quite evident without proof, the proofs often appearing to be excessively complicated and cumbersome. It sometimes happens, too, that a seemingly clear and convincing proof turns out, upon closer scrutiny, to be incorrect.
This booklet was written with the aim of helping pupils clear up the following points:
1. What is proof?
2. What purpose does a proof serve?
3. What form should a proof take?
4. What may be accepted without proof in geometry?
The book was translated from the Russian by Mark Samokhvalov and was first publised by Mir in 1978. This books was also published in the Topics in Mathematics series by Heath in 1963 and this edition was translated by Theodore M. Switz and Luise Lange. Dover [in 2006] has republished this book along with Mistakes in Geometric Proofs by Y. S. Dubnov as one single volume.
and here
We now come to The Monte Carlo Method by I. M. Sobol in the Little Mathematics Library series. The book has a random number table as one of the appendices, which is sort of out dated, when we have access to computers so easily.
In the Preface the author says:
Everybody had at some moment used the words “probability”
and “random variable”. The intuitive idea of the probability (considered as frequency) corresponds more or less to the true meaning of this concept. But as a rule the intuitive idea of the random variable differs quite considerably from the mathematical definition. Thus, the notion of the probability is assumed known in Sec. 2, and only the more complicated notion of the random variable is clarified. This section cannot replace a course in the probability
theory: the presentation is simplified and proofs are omitted.
But it still presents certain concept of the random variables sufficient for understanding of Monte Carlo techniques.The basic aim of this book is to prompt the specialists in various branches of knowledge to the fact that there are problems in their fields that can be solved by the Monte Carlo method.
The book was translated from the Russian by V. I. Kisin and was first published by Mir in 1975. This book was also published as Popular Lectures in Mathematics by University of Chicago in 1974, and this edition was translated by by Robert Messer, John Stone, and
Peter Fortini.
The table of contents for (LML edition) is as follows:
Preface 7
Introduction 9
Sec. 1. General 9
Chapter I. Simulation of Random Variables 14
Sec. 2. Random Variables. 14
Sec. 3. Generation of Random Variables by Electronic Computers 25
Sec. 4. Transformations of Random Variables 30
Chapter II. Examples of Application of the Monte Carlo Method 39
Sec. 5. Simulation of a Mass Servicing System 39
Sec. 6. Computation or Quality and Reliability of Complex Devices 44
Sec. 7. Computation of Neutron Transmission Through a Plate 51
Sec. 8. Calculation of a Definite Integral 58
Appendix 64
Sec. 9. Proofs of Selected Statements 64
Sec. 10. On Pseudo-Random Numbers 70
Random Number Table 74
Bibliography 77
In the Little Mathematics Library now we come to Systems of Linear Inequalities by A. S. Solodovnikov.
This booklet is one of longest in the LML series, having more than 120 pages. The back cover of the book says the following about the book.
The book tells about the relation of systems of linear inequalies to convex polyhedra, gives a description of the set of all solutions of a system of linear inequalities, analyses the questions of compatibility and incompatibility; finally, it gives an insight into linear programming as one of the topics in the theory of systems of linear inequalities. The last section but one gives a proof of the duality theorem of linear programming. The book is intended for senior pupils and all amateur mathematicians.
And the preface adds
Until recently one might think that linear inequalities would forever
remain an object of purely mathematical work. The situation
has changed radically since the mid 40s of this century when there
arose a new area of applied mathematics -linear programmingwith
important applications in the economy and engineering. Linear
programming is in the end nothing but a part (though a very important one) of the theory of systems of linear inequalities.
It is exactly the aim of this small book to acquaint the reader
with the various aspects of the theory of systems of linear inequalities, viz. with the geometrical aspect of the matter and some of the methods for solving systems connected with that aspect, with certain purely algebraic properties of the systems, and with questions of linear programming. Reading the book will not require any knowledge beyond the school course in mathematics.
The book was translated from the Russian by Vladamir Shokurov and was first published by Mir in 1979.
You can get the book here and here.
There is a Spanish version of this as well (credits to IA user danni229)
The following is the table of contents
CONTENTS
Preface 7
1. Some Facts from Analytic Geometry 8
2. Visualization of Systems of Linear Inequalities In Two or Three Unknowns 17
3. The Convex Hull of a System of Points 22
4. A Convex Polyhedral Cone 25
5. The Feasible Region of a System of Linear Inequalities in Two Unknowns 31
6. The Feasible Region of a System in Three Unknowns 44
7. Systems of Linear Inequalities in Any Number of Unknowns 52
8. The Solution of a System of Linear Inequalities ‘by Successive Reduction of the Number of Unknowns 57
9. Incompatible Systems 64
10. A Homogeneous System of Linear Inequalities. The Fundamental Set of Solutions 69
11. The Solution of a Nonhomogeneous System of Inequalities 81
12. A Linear Programming Problem 84
13. The Simplex Method 91
14. The Duality Theorem in Linear Programming 101
1.5. Transportation Problem 107
After a break we being with our postings again. To start, we will see a title in the Little Mathematics Library which is a`natural continuation’ of last post, this one is called Induction in Geometry and the authors are L. I. Golovina and I. M. Yaglom. One of the authors, I. M Yaglom, has written many excellent books in mathematics, we will maybe try to cover them in the future.
The preface says:
This little book is intended primarily for high school pupils, teachers of mathematics and students in teachers training colleges majoring in physics or mathematics. It deals with various applications of the method of mathematical induction to solving geometric problems and was intended by the authors as a natural continuation of I. S. Sominsky’s booklet The Method of Mathematical Induction published (in English) by Mir Publishers in1975. Our book contains 38 worked examples and 45 problems accompanied by brief hints. Various aspects of the method of mathematical induction are treated in them in a most instructive way. Some of the examples and problems may be of independent interest as well.
The book was translated from the Russian by Leonid Levant and was first published by Mir in 1979. This was also published in the Topics in Mathematics series in 1963, and was translated by A.W. Goodman and Olga A. Titelbaum.
You can get the book here and here.
The book contains following sections:
Introduction: The Method of Mathematical Induction 7
Sec. 1. Calculation by Induction 12
Sec. 2. Proof by Induction 20
Map Colouring 33
Sec. 3. Construction by Induction 63
Sec. 4. Finding Loci by Induction 73
Sec. 5. Definition by Induction 80
Sec. 6. Induction on the Number of Dimensions 98
1. Calculation bv Induction on the Number of Dimensions 106
2. Proof by Induction on the Number of Dimensions 109
3. Finding Loci by Induction on the Number of Dimensions 126
4. Definition by Induction on the Number of Dimensions 130
References 132
In the Little Mathematics Library we now come to the book called The Method of Mathematical Induction by I. S. Sominsky (aka Sominskii).
In the foreword it is said:
The method of mathematical induction, which is the subject of this book, is widely applicable in all departments of mathematics, from the elementary school course up to branches of higher mathematics only lately investigated. It is clear, therefore, that even a school course of mathematics cannot be studied seriously without mastering this method. Ideas of mathematical induction, moreover, have a wide general significance and acquaintance with them also has an importance for those whose interests are far removed from mathematics and its applications.
…
This book is meant for pupils in the higher forms of secondary schools, first year students in universities, teacher training colleges and technical colleges. It would also be useful for discussion in a school mathematical society.
The book was translated from Russian by Martin Greendlinger and was first published by Mir in 1975. Previous to that this booklet was also published in the West under the series of Topics in Mathematics (TiM) and also under Popular Lectures in Mathematics (PLM) Vol. 1. The link below is from the PLM version and was translated by Halina Moss, and was edited by I. N. Sneddon ans was published by Pergamon in 1961.
The essentials of the method and some simple examples of its use are given in Chapter I and in the first section of Chapter II. To study these it is sufficient for the reader to be familiar with the course of mathematics in the seven year school period. The remaining sections of this book are fully accessible to the reader who has mastered the mathematics course of a full secondary school.
All credits to the original uploader.
Update: 11 December 2015 | Added Internet Archive Link
You can get the book here.
Update: 10 October 2021 | Added PLM Link
The book was also published as a part of Popular Lectures in Mathematics series in 1961.
PLM version here.
Contents:
Foreword vii
INTRODUCTION 1
CHAPTER I
The Method of Mathematical Induction 3
CHAPTER II
Examples and Exercises 12
CHAPTER III
The Proof by Induction of Some Theorems of Elementary Algebra 39
CHAPTER IV
Solutions 45
We now come to another book in the Little Mathematics Library titled Stereographic Projection by B. A. Rosenfeld and N. D. Sergeeva. As the title suggests the book deals with projections on planes.
The present booklet is devoted to proofs of the aforesaid properties of the stereographic projection and to the presentation of some of its applications. The booklet consists of eight sections dealing with different properties of projections. …The booklet is aimed to be used in the senior grades of the high schools and by the first- and second-year students.
The book was translated from the Russian by Vitaly Kisin and was first published by Mir in 1977. All credits to the original uploader.
and here
Mir Books 