• Corpus ID: 116694817

Graduate Texts in Mathematics

  title={Graduate Texts in Mathematics},
  author={Kenneth S. Brown and Hsiao-Lan Liu},
Graduate Texts in Mathematics bridge the gap between passive study and creative understanding, offering graduate-level introductions to advanced topics in mathematics. The volumes are carefully written as teaching aids and highlight characteristic features of the theory. Although these books are frequently used as textbooks in graduate courses, they are also suitable for individual study. Series Editors: Sheldon Axler, San Francisco State University Kenneth Ribet, University of California… 
Recursion-Closed Algebraic Theories
  • J. Gallier
  • Computer Science
    J. Comput. Syst. Sci.
  • 1981
Computing with Algebraic Automorphic Forms
These are the notes of a five-lecture course presented at the Computations with Modular Forms summer school, aimed at graduate students in number theory and related areas. Sections 1–4 give a sketch
Some issues about the introduction of first concepts in linear algebra during tutorial sessions at the beginning of university
Certain mathematical concepts were not introduced to solve a specific open problem but rather to solve different problems with the same tools in an economic formal way or to unify several approaches:
Computability in principle and in practice in algebraic number theory: Hensel to Zassenhaus
This work examines links among the works of Kurt Hensel, Helmut Hasse, Olga Taussky, and Hans Zassenhaus to demonstrate ways in which ideas from the old tradition influenced the new.
Galois Martingales and the Hyperbolic Subset of the p-adic Mandelbrot Set
in Knoxville and in Berea, Kentucky, he set out for New England to attend Amherst College in Amherst, Massachusetts. During the summers he worked on a research project with professor Jan Pearce of
1925 – 2007
V ictor L. Klee passed away on August 17, 2007, in Lakewood, Ohio. Born in San Francisco in 1925, he received his Ph.D. in mathematics from the University of Virginia in 1949. In 1953 he moved to the
Geometry and Complexity Theory
This introduction to algebraic complexity theory for graduate students and researchers in computer science and mathematics features concrete examples that demonstrate the application of geometric techniques to real world problems.
Arithmetic groups and their generalizations : what, why, and how
In one guise or another, many mathematicians are familiar with certain arithmetic groups, such as $\mathbf{Z}$ or $\textrm{SL}(n,\mathbf{Z})$. Yet, many applications of arithmetic groups and many
Introducing Curves
These notes supplement the lectures and provide practise exercises. We begin with some material you will have met before, perhaps in other forms, to set some terminology and notation. Further details
Elements of Algebraic Geometry and Commutative Algebra
In this chapter we summarize the basic elements of algebraic geometry and commutative algebra that are useful in the study of (modular) invariant theory. Normally, these techniques are most useful in