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Numerical analysis, R. L. Burden (PWS-Kent, 1993). 105 ALGEBRA. • Set Theory and Related Topics, S.Lipschutz (Schaum Series). • Elementary linear algebra ...
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DEPARTMENT OF MATHEMATICS

X1 101 MATHEMATICS • Core Maths for A-level, L. Bostock and S. Chandler (Thornes, 1990). • Further pure mathematics, L. Bostock, S. Chandler, and C. Rourke (Thornes, 1982). • Understanding pure mathematics, A. J. Sadler and D. W. S. Thorning (Oxford, 1987). • A course in pure mathematics, M. Gow (Hodder and Stoughton, 1960). 103 PROGRAMMING • FORTRAN 90/95 explained, M. Metcalf and J. Reid (Oxford Science Publications, 1998). 104 COMPUTATIONAL MATHEMATICS • Numerical analysis, R. L. Burden (PWS-Kent, 1993). 105 ALGEBRA • Set Theory and Related Topics, S.Lipschutz (Schaum Series). • Elementary linear algebra, S. I. Grossman 5th ed. (Saunders, 1994). • Numbers and Proofs, R.Allenby (Arnold). • A Course in Pure Mathematics, M.Gow (Hodder and Stoughton, 1960). 106 CALCULUS • Calculus, R. S. Finney and G. B. Thomas (Addison-Wesley, 1994). • Salas and Hille’s calculus: one and several variables (Wiley, 1995). • Calculus, F. Ayres (McGraw-Hill, 1990). • Guide to mathematical method, J. Gilbert (Macmillan, 1991). • Calculus, Hughes-Hallet, Gleason et al. (Wiley). 107 GEOMETRY AND VECTORS • Pure mathematics 2, L. Bostock and S. Chandler (Thornes, 1990). • Calculus, R. S. Finney and G. B. Thomas (Addison-Wesley, 1994).

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MATHEMATICAL COMMUNICATION • The Oxford Guide to English Grammar, J.Eastwood (OUP). • Grammar and Meaning, H.Jackson (Longmans). • The Complete Plain Words, E.Gowers (HMSO, 1986). • A Short Account of the History of Mathematics, W.W.Rouse Ball (Dover). • Essays on the Philosophy of Mathematics, R.L.Goodstein (Leicester UP, 1965). • Riddles in Mathematics, E.P.Northrop (Penguin, 1960). • An Enquiry into Meaning and Truth, B.Russell (Penguin, 1962). • 100% Mathematical Proof, R.Garnier and J.Taylor (Wiley, 1996). • An Introduction to Mathematical Reasoning, P.J.Eccles (CUP). • The Method of Mathematical Induction, I.S.Sominskii (Pergamon, 1961). • What is Mathematics, R.Courant and H.Robbins (OUP, 1951). • A Mathematician’s Apology, G.H.Hardy (CUP). • Descartes Dream, P.J.Davis and R.Hersh (Harvester Press, 1986). • The Mathematical Experience, P.J.Davis and R.Hersh (Birkhauser, 1980). • A Mathematician’s Miscellany, J.E.Littlewood (Methuen).

X2 201A CALCULUS • Calculus, T. Apostol (Blaisdell). • Salas and Hille’s calculus: one and several variables (Wiley, 1995). • Advanced engineering mathematics, E. Kreyszig (Wiley, 1988). 201B LINEAR ALGEBRA • 3000 solved problems in linear algebra, S. Lipschutz (Schaum series) (McGraw Hill, 1989). • Schaum’s outline of theory and problems of linear algebra, S. Lipschutz (McGraw Hill, 1991). • Linear algebra done right, S. Axler (Springer). • Algebra, P. M. Cohn, vol.1 (Wiley, 1974). • A survey of modern algebra, S. MacLane and G. Birkhoff (Collier-MacMillan, 1965).

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202 MATHEMATICAL METHODS • Schaum’s outline of theory and problems of complex variables : with an introduction to conformal mapping and its appreciation, M. Spiegel (McGraw Hill, 1974). • Advanced engineering mathematics, E. Kreyszig (Wiley, 1988). • Schaum’s outline of theory and problems of advanced mathematics for engineers and scientists, M. Spiegel (McGraw Hill, 1980). • Schaum’s outline of theory and problems of vector analysis : and an introduction to tensor analysis, M. Spiegel (McGraw Hill, 1974). 203A DYNAMICAL SYSTEMS • Ordinary differential equations, D. K. Arrowsmith and C. M. Place (Chapman and Hall, 1982). • Nonlinear differential equations and dynamical systems, F. Verhulst (Springer-Verlag, 1990). • Introduction to differential equations with boundary value problems, W. R. Derrick and S. I. Grossman (West, 1987). • Introduction to nonlinear systems, J. Berry (Arnold, 1996). 203B ANALYSIS • An introduction to analysis, J. Mikusinski and P. Mikusinski (Wiley, 1993). • Analysis, P. E. Kopp (Arnold). 204A APPLIED MATHEMATICS • Case studies in mathematical modelling / edited by D.J.G. James and J.J. McDonald (Stanley Thornes, 1981). • Principles of mechanics, J.L.Synge & B.A.Griffith (McGraw-Hill, 1959). • Waves : a mathematical account of the common types of wave motion, C. A. Coulson (Oliver and Boyd, 1943). • Mathematical theory of wave motion, G. R. Baldock and T. Bridgeman (Chichester : Ellis Horwood, 1980). 204B NUMERICAL MATHEMATICS • An introduction to numerical analysis, K. E. Atkinson (Wiley, 1989). • Numerical methods for engineers, D. V. Griffiths and I. M. Smith (Blackwell scientific, 1991). • Numerical solution of ordinary and partial differential equations, L. Fox (Pergamon, 1962). • An introduction to numerical linear algebra, L. Fox (Oxford UP, 1964).

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X3 300 SPECIAL TOPICS • Calculus on manifolds : a modern approach to classical theorems of advanced calculus, M. Spivak (Benjamin, 1965). • Principles and techniques of applied mathematics, B. Friedman (Wiley, 1966). • Fundamentals of differential equation, R. K. Nagle and E. B. Staff (Addison-Wesley, 1996). • Introduction to perturbation techniques, A. H. Nayfeh (Wiley, 1981). • Mathematical methods of physics, J. Mathews and R. L. Walker (Benjamin, 1970). • Theory and applications of stochastic differential equations, Z. Schuss (Wiley, 1980). • Nonlinear waves in one-dimensional dispersive systems, P. L. Bhatnagar (Oxford, 1979). 301 MATHEMATICAL METHODS • Schaum’s outline of theory and problems of advanced mathematics for engineers and scientists, M. Spiegel (McGraw Hill, 1980). • Schaum’s outline of theory and problems of linear algebra, S. Lipschutz (McGraw Hill, 1991). • Schaum’s outline of theory and problems of complex variables : with an introduction to conformal mapping and its appreciation, M. Spiegel (McGraw Hill, 1974). 302 DIFFERENTIAL EQUATIONS • Elementary differential equations and boundary value problems, W. E. Boyce and R. C. DiPrima (Wiley). • Introduction to differential equations with boundary value problems, W. R. Derrick and S. I. Grossman (West, 1987). • Fundamentals of differential equations, R. K. Nagle and E. B. Saff (Addison-Wesley). • Partial differential equations, P. Duchateau and D. W. Zachman (Schaum, McGrawHill). • Linear algebra done right, S. Axler (Springer). 303 DYNAMICAL SYSTEMS • Ordinary differential equations, D. K. Arrowsmith and C. M. Place (Chapman and Hall, 1982). • Nonlinear systems, P. Drazin (Cambridge).

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304 FLUID DYNAMICS • Elementary fluid dynamics, D. J. Acheson (Clarendon, 1990). • An introduction to fluid dynamics, G. K. Batchelor (CUP, 1967). • Physical fluid dynamics, D. J. Tritton (Oxford: Clarendon, 1988). 305 GROUPS AND METRIC SPACES • Basic algebra 1, N. Jacobson (Freeman, 1974). • Introduction to topology and modern analysis, G. F. Simmons (McGraw-Hill, 1963). • Algebra, P. M. Cohn (Wiley, 1974). 306 MATHEMATICAL MODELS AND MODELLING • Mathematical modelling, J. G. Andrews and R. R. McLone (Butterworths, 1976). • Thinking with models, T. L. Saaty and J. M. Alexander (Pergamon, 1981). 307 NUMERICAL ANALYSIS • Numerical solution of partial differential equations : with exercises and worked solutions, G. D. Smith (Oxford UP, 1965). • Numerical solution of partial differential equations by the finite element method, C. Johnson (Cambridge UP, 1987). • Numerical methods for partial differential equations, W. F. Ames (Academic Press, 1992). 308 QUANTUM MECHANICS • Quantum mechanics, F. Mandl (Wiley). • Basic quantum mechanics, J. M. Cassels (Macmillan). • Quantum physics, S. Gasiorowicz (Wiley, 1974).