Introduction to Mathematical Structures and Proofs

  • Larry J. Gerstein

Part of the Undergraduate Texts in Mathematics book series (UTM)

Table of contents

  1. Front Matter
    Pages i-xiii
  2. Larry J. Gerstein
    Pages 1-35
  3. Larry J. Gerstein
    Pages 37-107
  4. Larry J. Gerstein
    Pages 109-140
  5. Larry J. Gerstein
    Pages 141-189
  6. Larry J. Gerstein
    Pages 191-275
  7. Larry J. Gerstein
    Pages 277-348
  8. Larry J. Gerstein
    Pages 349-373
  9. Back Matter
    Pages 375-401

About this book


As a student moves from basic calculus courses into upper-division courses in linear and abstract algebra, real and complex analysis, number theory, topology, and so on, a "bridge" course can help ensure a smooth transition. Introduction to Mathematical Structures and Proofs is a textbook intended for such a course, or for self-study.  This book introduces an array of fundamental mathematical structures. It also explores the delicate balance of intuition and rigor—and the flexible thinking—required to prove a nontrivial result.  In short, this book seeks to enhance the mathematical maturity of the reader.

 The new material in this second edition includes a section on graph theory, several new sections on number theory (including primitive roots, with an application to card-shuffling), and a brief introduction to the complex numbers (including a section on the arithmetic of the Gaussian integers). Solutions for even numbered exercises are available on for instructors adopting the text for a course. 

From a review of the first edition:

"...Gerstein wants—very gently—to teach his students to think. He wants to show them how to wrestle with a problem (one that is more sophisticated than "plug and chug"), how to build a solution, and ultimately he wants to teach the students to take a statement and develop a way to prove it...Gerstein writes with a certain flair that I think students will find appealing. ...I am confident that a student who works through Gerstein's book will really come away with (i) some mathematical technique, and (ii) some mathematical knowledge….

Gerstein’s book states quite plainly that the text is designed for use in a transitions course.  Nothing benefits a textbook author more than having his goals clearly in mind, and Gerstein’s book achieves its goals.  I would be happy to use it in a transitions course.”

—Steven Krantz, American Mathematical Monthly


Cantor's theorems Fundamental Theorem of Arithmetic counting principles mathematical induction number-theoretic functions proof techniques relations and partitions set constructions transition course

Authors and affiliations

  • Larry J. Gerstein
    • 1
  1. 1.University of California, Santa BarbaraSanta BarbaraUSA

Bibliographic information

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