Undergraduate Texts in Mathematics (UTM) is a series of undergraduate-level textbooks in mathematics published by Springer-Verlag. The books in this series, like the other Springer-Verlag mathematics series, are small yellow books of a standard size. As of April 2008, there are a hundred and forty four titles in the series.

The books in this series tend to be written at a more elementary level than the similar Graduate Texts in Mathematics series, although there is a fair amount of overlap between the two series in terms of material covered and difficulty level.

List of books

• Abbott, S (2002). Understanding Analysis.
• Armstrong, M.A. (1983). Basic Topology.
• Armstrong, M.A. (1988). Groups and Symmetry.
• Apostol, Tom M. (1998). Introduction to Analytic Number Theory.
• Axler, S (1997). Linear Algebra Done Right. Second Edition,
• Bak, Joseph; Donald J. Newman (2001). Complex Analysis.
• Banchoff, Th.; Wermer, J (1993). Linear Algebra Through Geometry. Second Edition,
• Beardon, A.F (1997). Limits: A New Approach to Real Analysis.
• Beck, M.; Robins, S. (2007). Computing the Continuous Discretely.
• Berberian, S.K. (1998). A First Course in Real Analysis.
• Bix, R (2006). Conics and Cubics: A Concrete Introduction to Algebraic Curves.
• Breamaud, P. (1994). An Introduction to Probabilistic Modeling.
• Bressoud, D.M. (1989). Factorization and Primality Testing.
• Brickman, L. (1998). Mathematical Introduction to Linear Programming and Game Theory.
• Browder, A. (2001). Mathematical Analysis: An Introduction.
• Buchmann, J. (2004). Introduction to Cryptography.
• Buskes, G.; van Rooij, A. (1997). Topological Spaces: From Distance to Neighborhood.
• Callahan, J.J. (2001). The Geometry of Spacetime: An Introduction to Special and General Relativity.
• Carter, M.; van Brunt, B. (2000). The Lebesgue-Stieltjies Integral: A Practical Introduction.
• Cederberg, J.N. (2004). A Course in Modern Geometries. Second Edtion,
• Chambert-Loir,, A. (2005). A Field Guide to Algebra.
• Childs, L.N. (2000). A Concrete Introduction to Higher Algebra.
• Chung, D.; AitSahlia, F (2003). Elementary Probability Theory with Stochastic Processes.
• Cox, D; Little, J et al. (2008). Ideals, Varieties, and Algorithms. Second Edition,
• Croom, F.H. (1978). Basic Concepts of Algebraic Topology.
• Cull, P. (2005). Difference Equations: From Rabbits to Chaos.
• Curtis, Charles W. (1999). Linear Algebra: An Introductory Approach.
• Daepp, U. (2003). Reading, Writing, and Proving: A Closer Look at Mathematics.
• Devlin, Keith (1993). The Joy of Sets, Fundamentals of Contemporary Set Theory. 2nd Edition,
• Dixmier, J. (1984). General Topology.
• Driver, R.D. (1995). Why Math?.
• Ebbinghaus, H.-D.; J.Flum, W. Thomas (1994). Mathematical Logic. 2nd Edition,
• Halmos, Paul R. (1974). Naive Set Theory.
• Jones, Gareth A. (1998). Elementary Number Theory.
• Moschovakis, Yiannis N. (1994). Notes on Set Theory.
• Stillwell, John Mathematics and Its History. 2nd edition,
• Thorpe, John A. (1979). Basic Topology.

References

External links

• Springer-Verlag's Summary of Undergraduate Texts in Mathematics