Zahvaljujući kontaktu sa Galjom Kovaljevom iz Američkog matematičkog društva, Narodna biblioteka u Jagodini je od pre nekoliko dana bogatija za lepu zbirku matematičke literature na engleskom jeziku. Ovi naslovi namenjeni najviše studentima Učiteljskog fakulteta, ali i učenicima srednjih škola, biće dostupni korisnicima najkasnije od Nove godine. Evo i spiska knjiga:
Bibliography of Orthogonal Polynomials, by Shohat, Hille, and Walsh
Introduction to p-adic numbers and valuation theory, by Tachman
The Theory of Numbers and Diophantine Analysis, by Carmichael
The Arithmetic Theory of Quadratic Forms (C.M. 10)
Infinite Series, by J.M. Hyslop
Summation of Series, by Jolley
Topics in Number Theory, by LeVeque
Topics in Number Theory, Volume II, by LeVeque
Studies in Number Theory, by LeVeque
Irrational Numbers, by Niven
The Theory of Algebraic Numbers (C.M. 9)
Fibbonacci Numbers, by Vorob’ev
First-Order Functional Calculus, by Geoffrey Keene
Non-Euclidian Geometry, by Sommerville
Category Theory, by Herrlich and Strecker
Convexity, by H.G. Eggleston
Boolean Algebra and Its Applications, by Flegg
Naive Set Theory, by Halmos (2 copies)
Mengenlehre, by Hausdorff
Applied Boolean Algebra, by Hohn
Theory of Sets, by Kamke
Convex Figures and Polyhedra, by Lyusternik
Axiomatic Set Theory, by Suppes
Axiomatic Set Theory, by Suppes
Convex Sets, by Valentine
Convex Figures, by Yaglom and Boltyanskii
Problems in Plane Geometry, by Horblit and Nielsen
Elementary Mathematics, Volume 2, by Klein
College Geometry, by Nathan Altshiller Court
Analytic Geometry, by C.O. Oakley
Theory of Graphs, by Ore
General Topology, by Kelley
Elements of General Topology, by Bushaw
Topology, by E.M. Patterson
Undergraduate Topology, by Kasriel
Algebraic Topology, an Introduction, by Massey
Calculus of Variations, by Bliss
Studies in Modern Analysis, by Buck
Foundations of Modern Analysis, by Dieudonne
Measure Theory, by Halmos
Real and Abstract Analysis, by Hewitt and Stromberg
Problem Book I by Knopp
Problem Book II, by Knopp
Real Analysis, by McShane and Botts
Real Analysis, by Roysden
Real and Complex Analysis, by Rudin
Linear Operators in Hilbert Space, by Schmeidler
Introduction to Hilbert Space, by Halmos
Complex Analysis, by Ahlfors
Advanced Complex Calculus, by Miller
Functions of a Complex Variable, by E.G. Phillips
Functions of a Complex Variable, by Curtiss
Functions of a Complex Variable, by Macrobert
Ordinary Differential Equations, by Arnold
Stability Theory of Differential Equations, by Bellamn
The Theory of Ordinary Differential Equations, by J.C. Burkill
Partial Differentiation, by R.P. Gillespie
Lectures on Cauchy’s Problem, by Hadamord
Integration of Ordinary Differential Equations, by E.L. Ince
Vector Methods, by D.E. Rutherford
Studies in Applied Mathematics, by Taub
Foundations of Geometry and Induction, by Jean Nicod
Projective Geometry, by Young
The Real Projective Plane, by Coxeter
Foundations of Geometry, by Russell
Projective Geometry, by T.E. Faulkner
Plane Projective Geometry, by Hoopkins and Halls
Lectures in Projective Geometry, by A. Seidenberg
Projective and Euclidean Geometry, by Fishback
Geometry and Symmetry, by Paul B. Yale