Mathematics

University of California, Berkeley

This is an archived copy of the 2014-15 guide. To access the most recent version of the guide, please visit http://guide.berkeley.edu/.

About the Program

Bachelor of Arts (BA)

The Department of Mathematics offers an undergraduate major program in mathematics, leading to the Bachelor of Arts (BA) degree. Major programs within the Department provide excellent preparation for advanced degrees in math, physical sciences, economics, and industrial engineering as well as graduate study in business, education, law, and medicine. They also prepare students for post-baccalaureate positions in business, technology, industry, teaching, government, and finance.

Students majoring in Mathematics may also choose to major with a Teaching Concentration. The new teaching concentration is designed to increase the number and quality of math teachers.

Admission to the Major

Students should contact an undergraduate adviser in 964 or 965 Evans Hall about requirements for admission to the major.

Honors Program

In addition to completing the requirements for the major in mathematics, students in the honors program must:

  1. Earn a grade point average (GPA) of at least 3.5 in upper division and graduate courses in the major and at least 3.3 in all courses taken at the University
  2. Complete either MATH 196, in which they will write a senior honors thesis, or pass two graduate mathematics courses with a grade of at least A-
  3. Receive the recommendation of the Head Adviser.

Students interested in the honors program should consult with an adviser early in their program, preferably by their junior year.

Minor Program

The Department offers a minor in Mathematics.

To declare a minor, a student must fulfill the following requirements:

  1. Be a declared major in a program other than Mathematics
  2. Be in good standing (minimum 2.0 overall GPA at Berkeley)
  3. Be enrolled in the final class(es) for the minor

To complete/confirm the minor: Once enrolled in the final course/courses to complete the Mathematics Minor, fill out a "Completion of L&S Minor" form available from the College of Letters and Science Advising Office in 206 Evans or from the L&S Advising website. Turn in to the Undergraduate Advisers in 964 or 965 Evans:

  1. the completed petition for the minor; and
  2. a copy of transcripts (unofficial transcripts are accepted) showing the student's completed math courses. 

When final grades are available, the Department will certify completion of the Mathematics Minor to the Registrar’s Office. The notation will appear on students' transcripts even if they have not yet completed their degree.

Other Major Offered by the Department of Mathematics

Applied Mathematics  (Major only)

Visit Department Website

Major Requirements

In addition to the University, campus, and college requirements, listed on the College Requirements tab, students must fulfill the below requirements specific to their major program.

General Guidelines

  1. All courses taken to fulfill the major requirements below must be taken for graded credit, other than courses listed which are offered on a Pass/No Pass basis only. Other exceptions to this requirement are noted as applicable.
  2. No more than one upper-division course may be used to simultaneously fulfill requirements for a student's major and minor programs, with the exception of minors offered outside of the College of Letters and Science.
  3. A minimum grade point average (GPA) of 2.0 must be maintained in both upper- and lower-division courses used to fulfill the major requirements.

For information regarding residence requirements and unit requirements, please see the College Requirements tab.

Major Requirements: Pure Mathematics

Lower-division
MATH 1ACalculus4
MATH 1BCalculus4
MATH 53Multivariable Calculus4
MATH 54Linear Algebra and Differential Equations4
MATH 55Discrete Mathematics 14
Upper-divison
MATH 104Introduction to Analysis4
MATH 110Linear Algebra4
MATH 113Introduction to Abstract Algebra4
MATH 185Introduction to Complex Analysis4
Two semi-electives:
Select one course from two of the following three areas:
Computing:
Numerical Analysis
Geometry:
The Classical Geometries
Metric Differential Geometry
Elementary Differential Topology
Elementary Algebraic Topology
Elementary Algebraic Geometry
Logic and Foundations:
Mathematical Logic
Introduction to the Theory of Sets
Incompleteness and Undecidability
Two Electives: Select at least two additional upper-division or graduate mathematics courses must be taken 2
1

COMPSCI 70 can be substituted for MATH 55 for students with a double major in Computer Science or Electrical Engineering and Computer Science

2

These two electives must receive the Faculty Adviser's written approval on the Course Approval Form which is then returned to an Undergraduate Adviser in 964 or 965 Evans for the student's file. Courses in other departments may count toward this requirement provided they have substantial mathematical content and are offered for at least 3 units each. 

Major Requirements: Mathematics with a Teaching Concentration
Lower-division
STAT 20Introduction to Probability and Statistics4
or STAT 25 Course Not Available
MATH 1ACalculus4
MATH 1BCalculus4
MATH 53Multivariable Calculus4
MATH 54Linear Algebra and Differential Equations4
MATH 55Discrete Mathematics 14
Upper-division
MATH 110Linear Algebra4
MATH 113Introduction to Abstract Algebra4
Select two of the following:
Numerical Analysis
The Classical Geometries
Introduction to the Theory of Sets
MATH 151Mathematics of the Secondary School Curriculum I4
MATH 152Mathematics of the Secondary School Curriculum II4
MATH 153Mathematics of the Secondary School Curriculum III4
MATH 160History of Mathematics4
Recommended courses:
Sudents are encouraged, though not required, to take, the following:
MATH 104Introduction to Analysis4
MATH 115Introduction to Number Theory4
MATH 185Introduction to Complex Analysis4
1

COMPSCI 70 can be substituted for MATH 55 for students with a double major in Computer Science or Electrical Engineering and Computer Science.

 

Minor Requirements

Students who have a strong interest in an area of study outside their major often decide to complete a minor program. These programs have set requirements and are noted officially on the transcript in the memoranda section, but they are not noted on diplomas.

General Guidelines

  1. All courses taken to fulfill the minor requirements below must be taken for graded credit.
  2. A minimum of three of the upper-division courses taken to fulfill the minor requirements must be completed at UC Berkeley.
  3. A minimum grade point average (GPA) of 2.0 is required for courses used to fulfill the minor requirements.
  4. Courses used to fulfill the minor requirements may be applied toward the Seven-Course Breadth Requirement, for Letters and Science students.
  5. No more than one upper-division course may be used to simultaneously fulfill requirements for a student's major and minor programs.
  6. All minor requirements must be completed prior to the last day of finals during the semester in which the student plans to graduate. If  cannot finish all courses required for the minor by that time, please see a College of Letters and Science adviser.
  7. All minor requirements must be completed within the unit ceiling. (For further information regarding the unit ceiling, please see the College Requirements tab.)

 Requirements

Lower-division
MATH 1ACalculus4
MATH 1BCalculus4
MATH 53Multivariable Calculus4
MATH 54Linear Algebra and Differential Equations4
Upper-division
MATH 104Introduction to Analysis4
MATH 110Linear Algebra4
MATH 113Introduction to Abstract Algebra4
MATH 185Introduction to Complex Analysis4
One Elective: Select one additional upper-division Math course4

College Requirements

Undergraduate students in the College of Letters and Science must fulfill the following requirements in addition to those required by their major program.

For detailed lists of courses that fulfill college requirements, please see the College of Letters and Sciences  page in this bulletin. 

Entry Level Writing

All students who will enter the University of California as freshmen must demonstrate their command of the English language by fulfilling the Entry Level Writing Requirement. Fulfillment of this requirement is also a prerequisite to enrollment in all reading and composition courses at UC Berkeley. 

American History and American Institutions

The American History and Institutions requirements are based on the principle that a U.S. resident graduated from an American university should have an understanding of the history and governmental institutions of the United States.

American Cultures

American Cultures is the one requirement that all undergraduate students at Cal need to take and pass in order to graduate. The requirement offers an exciting intellectual environment centered on the study of race, ethnicity and culture of the United States. AC courses offer students opportunities to be part of research-led, highly accomplished teaching environments, grappling with the complexity of American Culture.

Quantitative Reasoning

The Quantitative Reasoning requirement is designed to ensure that students graduate with basic understanding and competency in math, statistics, or computer science. The requirement may be satisfied by exam or by taking an approved course.

Foreign Language

The Foreign Language requirement may be satisfied by demonstrating proficiency in reading comprehension, writing, and conversation in a foreign language equivalent to the second semester college level, either by passing an exam or by completing approved course work.

Reading and Composition

In order to provide a solid foundation in reading, writing and critical thinking the College requires two semesters of lower division work in composition. Students must complete a first-level reading and composition course by the end of their second semester and a second-level course by the end of their fourth semester.

Breadth Requirements

The undergraduate breadth requirements provide Berkeley students with a rich and varied educational experience outside of their major program. As the foundation of a liberal arts education, breadth courses give students a view into the intellectual life of the University while introducing them to a multitude of perspectives and approaches to research and scholarship.  Engaging students in new disciplines and with peers from other majors, the breadth experience strengthens interdisciplinary connections and context that prepares Berkeley graduates to understand and solve the complex issues of their day.

Unit Requirements

  • 120 total units, including at least 60 L&S units

  • Of the 120 units, 36 must be upper division units

  • Of the 36 upper division units, 6 must be taken in courses offered outside your major department

Residence Requirements

For units to be considered in "residence," you must be registered in courses on the Berkeley campus as a student in the College of Letters and Science. Most students automatically fulfill the residence requirement by attending classes here for four years. In general, there is no need to be concerned about this requirement, unless you go abroad for a semester or year or want to take courses at another institution or through University Extension during your senior year. In these cases, you should make an appointment to see an adviser to determine how you can meet the Senior Residence Requirement.

Note: Courses taken through UC Extension do not count toward residence.

Senior Residence Requirement

After you become a senior (with 90 semester units earned toward your B.A. degree), you must complete at least 24 of the remaining 30 units in residence in at least two semesters. To count as residence, a semester must consist of at least 6 passed units. Intercampus Visitor, EAP, and UC Berkeley-Washington Program (UCDC) units are excluded.

You may use a Berkeley summer session to satisfy one semester of the Senior Residence Requirement, provided that you successfully complete 6 units of course work in the Summer Session and that you have been enrolled previously in the College.

Modified Senior Residence Requirement

Participants in the UC Education Abroad Program (EAP) or the UC Berkeley-Washington Program (UCDC) may meet a Modified Senior Residence Requirement by completing 24 (excluding EAP) of their final 60 semester units in residence. At least 12 of these 24 units must be completed after you have completed 90 units.

Upper Division Residence Requirement

You must complete in residence a minimum of 18 units of upper division courses (excluding EAP units), 12 of which must satisfy the requirements for your major.

Student Learning Goals

Learning Goals for the Major

Mathematics is the language of science. In Galileo’s words:

Philosophy is written in this grand book, the universe, which stands continually open to our gaze. But the book cannot be understood unless one first learns to comprehend the language and read the characters in which it is written. It is written in the language of mathematics, and its characters are triangles, circles, and other geometric figures, without which it is impossible to understand a single word of it. Without those, one is wandering in a dark labyrinth.

Mathematics majors learn the internal workings of this language, its central concepts and their interconnections. These involve structures going far beyond the geometric figures to which Galileo refers. Majors also learn to use mathematical concepts to formulate, analyze, and solve real-world problems. Their training in rigorous thought and creative problem-solving is valuable not just in science, but in all walks of life.

Skills

By the time of graduation, majors should have acquired the following knowledge and skills:

  1. Analytical skills
    • An understanding of the basic rules of logic
    • The ability to distinguish a coherent argument from a fallacious one, both in mathematical reasoning and in everyday life
    • An understanding of the role of axioms or assumptions
    • The ability to abstract general principles from examples
  2. Problem-solving and modeling skills (important for all, but especially for majors in Applied Mathematics)
    • The ability to recognize which real-world problems are subject to mathematical reasoning
    • The ability to make vague ideas precise by representing them in mathematical notation, when appropriate
    • Techniques for solving problems expressed in mathematical notation
  3. Communication skills
    • The ability to formulate a mathematical statement precisely
    • The ability to write a coherent proof
    • The ability to present a mathematical argument verbally
    • Majors in Mathematics with a Teaching Concentration should acquire familiarity with techniques for explaining K-12 mathematics in an accessible and mathematically correct manner.
  4. Reading and research skills
    • Sufficient experience in mathematical language and foundational material to be well-prepared to extend one’s mathematical knowledge further through independent reading
    • Exposure to and successful experience in solving mathematical problems presenting substantial intellectual challenge

Courses

Mathematics

MATH 1A Calculus 4 Units

This sequence is intended for majors in engineering and the physical sciences. An introduction to differential and integral calculus of functions of one variable, with applications and an introduction to transcendental functions.

MATH 1B Calculus 4 Units

Continuation of 1A. Techniques of integration; applications of integration. Infinite sequences and series. First-order ordinary differential equations. Second-order ordinary differential equations; oscillation and damping; series solutions of ordinary differential equations.

MATH H1B Honors Calculus 4 Units

Honors version of 1B. Continuation of 1A. Techniques of integration; applications of integration. Infinite sequences and series. First-order ordinary differential equations. Second-order ordinary differential equations; oscillation and damping; series solutions of ordinary differential equations.

MATH 10A Methods of Mathematics: Calculus, Statistics, and Combinatorics 4 Units

This sequence is intended for majors in the life sciences. Introduction to differential and integral calculus of functions of one variable. Representation of data, elementary probability theory, statistical models, and testing.

MATH 10B Methods of Mathematics: Calculus, Statistics, and Combinatorics 4 Units

Elementary combinatorics and discrete probability theory. Introduction to graphs, matrix algebra, linear equations, difference equations, and differential equations.

MATH 16A Analytic Geometry and Calculus 3 Units

This sequence is intended for majors in the life and social sciences. Calculus of one variable; derivatives, definite integrals and applications, maxima and minima, and applications of the exponential and logarithmic functions.

MATH 16B Analytic Geometry and Calculus 3 Units

Continuation of 16A. Application of integration of economics and life sciences. Differential equations. Functions of many variables. Partial derivatives, constrained and unconstrained optimization.

MATH 24 Freshman Seminars 1 Unit

The Berkeley Seminar Program has been designed to provide new students with the opportunity to explore an intellectual topic with a faculty member in a small-seminar setting. Berkeley Seminars are offered in all campus departments, and topics vary from department to department and semester to semester.

MATH 32 Precalculus 4 Units

Polynomial and rational functions, exponential and logarithmic functions, trigonometry and trigonometric functions. Complex numbers, fundamental theorem of algebra, mathematical induction, binomial theorem, series, and sequences.

MATH N32 Precalculus 4 Units

Polynomial and rational functions, exponential and logarithmic functions, trigonometry and trigonometric functions. Complex numbers, fundamental theorem of algebra, mathematical induction, binomial theorem, series, and sequences.

MATH 39A Freshman/Sophomore Seminar 2 - 4 Units

Freshman and sophomore seminars offer lower division students the opportunity to explore an intellectual topic with a faculty member and a group of peers in a small-seminar setting. These seminars are offered in all campus departments; topics vary from department to department and from semester to semester.

MATH 49 Supplementary Work in Lower Division Mathematics 1 - 3 Units

Students with partial credit in lower division mathematics courses may, with consent of instructor, complete the credit under this heading.

MATH 53 Multivariable Calculus 4 Units

Parametric equations and polar coordinates. Vectors in 2- and 3-dimensional Euclidean spaces. Partial derivatives. Multiple integrals. Vector calculus. Theorems of Green, Gauss, and Stokes.

MATH H53 Honors Multivariable Calculus 4 Units

Honors version of 53. Parametric equations and polar coordinates. Vectors in 2- and 3-dimensional Euclidean spaces. Partial derivatives. Multiple integrals. Vector calculus. Theorems of Green, Gauss, and Stokes.

MATH W53 Multivariable Calculus 4 Units

Parametric equations and polar coordinates. Vectors in 2- and 3-dimensional Euclidean spaces. Partial derivatives. Multiple integrals. Vector calculus. Theorems of Green, Gauss, and Stokes.

MATH 54 Linear Algebra and Differential Equations 4 Units

Basic linear algebra; matrix arithmetic and determinants. Vector spaces; inner product as spaces. Eigenvalues and eigenvectors; linear transformations. Homogeneous ordinary differential equations; first-order differential equations with constant coefficients. Fourier series and partial differential equations.

MATH H54 Honors Linear Algebra and Differential Equations 4 Units

Honors version of 54. Basic linear algebra: matrix arithmetic and determinants. Vectors spaces; inner product spaces. Eigenvalues and eigenvectors; linear transformations. Homogeneous ordinary differential equations; first-order differential equations with constant coefficients. Fourier series and partial differential equations.

MATH 55 Discrete Mathematics 4 Units

Logic, mathematical induction sets, relations, and functions. Introduction to graphs, elementary number theory, combinatorics, algebraic structures, and discrete probability theory.

MATH 74 Transition to Upper Division Mathematics 3 Units

The course will focus on reading and understanding mathematical proofs. It will emphasize precise thinking and the presentation of mathematical results, both orally and in written form. The course is intended for students who are considering majoring in mathematics but wish additional training.

MATH 91 Special Topics in Mathematics 4 Units

Topics to be covered and the method of instruction to be used will be announced at the beginning of each semester that such courses are offered. See department bulletins.

MATH 96 College Algebra 2 Units

Elements of college algebra. Designed for students who do not meet the prerequisites for 32. Offered through the Student Learning Center.

MATH 98 Supervised Group Study 1 - 4 Units

Directed Group Study, topics vary with instructor.

MATH 98BC Berkeley Connect 1 Unit

Berkeley Connect is a mentoring program, offered through various academic departments, that helps students build intellectual community. Over the course of a semester, enrolled students participate in regular small-group discussions facilitated by a graduate student mentor (following a faculty-directed curriculum), meet with their graduate student mentor for one-on-one academic advising, attend lectures and panel discussions featuring department faculty and alumni, and go on field trips to campus resources. Students are not required to be declared majors in order to participate.

MATH 99 Supervised Independent Study 1 - 4 Units

Supervised independent study by academically superior, lower division students. 3.3 GPA required and prior consent of instructor who is to supervise the study. A written proposal must be submitted to the department chair for pre-approval.

MATH C103 Introduction to Mathematical Economics 4 Units

Selected topics illustrating the application of mathematics to economic theory. This course is intended for upper-division students in Mathematics, Statistics, the Physical Sciences, and Engineering, and for economics majors with adequate mathematical preparation. No economic background is required.

MATH 104 Introduction to Analysis 4 Units

The real number system. Sequences, limits, and continuous functions in R and R. The concept of a metric space. Uniform convergence, interchange of limit operations. Infinite series. Mean value theorem and applications. The Riemann integral.

MATH H104 Honors Introduction to Analysis 4 Units

Honors section corresponding to 104. Recommended for students who enjoy mathematics and are good at it. Greater emphasis on theory and challenging problems.

MATH 105 Second Course in Analysis 4 Units

Differential calculus in Rn: the derivative as a linear map; the chain rule; inverse and implicit function theorems. Lebesgue integration on the line; comparison of Lebesgue and Riemann integrals. Convergence theorems. Fourier series, L2 theory. Fubini's theorem, change of variable.

MATH 110 Linear Algebra 4 Units

Matrices, vector spaces, linear transformations, inner products, determinants. Eigenvectors. QR factorization. Quadratic forms and Rayleigh's principle. Jordan canonical form, applications. Linear functionals.

MATH H110 Honors Linear Algebra 4 Units

Honors section corresponding to course 110 for exceptional students with strong mathematical inclination and motivation. Emphasis is on rigor, depth, and hard problems.

MATH 113 Introduction to Abstract Algebra 4 Units

Sets and relations. The integers, congruences, and the Fundamental Theorem of Arithmetic. Groups and their factor groups. Commutative rings, ideals, and quotient fields. The theory of polynomials: Euclidean algorithm and unique factorizations. The Fundamental Theorem of Algebra. Fields and field extensions.

MATH H113 Honors Introduction to Abstract Algebra 4 Units

Honors section corresponding to 113. Recommended for students who enjoy mathematics and are good at it. Greater emphasis on theory and challenging problems.

MATH 114 Second Course in Abstract Algebra 4 Units

Further topics on groups, rings, and fields not covered in Math 113. Possible topics include the Sylow Theorems and their applications to group theory; classical groups; abelian groups and modules over a principal ideal domain; algebraic field extensions; splitting fields and Galois theory; construction and classification of finite fields.

MATH 115 Introduction to Number Theory 4 Units

Divisibility, congruences, numerical functions, theory of primes. Topics selected: Diophantine analysis, continued fractions, partitions, quadratic fields, asymptotic distributions, additive problems.

MATH 116 Cryptography 4 Units

Construction and analysis of simple cryptosystems, public key cryptography, RSA, signature schemes, key distribution, hash functions, elliptic curves, and applications.

MATH 118 Fourier Analysis, Wavelets, and Signal Processing 4 Units

Introduction to signal processing including Fourier analysis and wavelets. Theory, algorithms, and applications to one-dimensional signals and multidimensional images.

MATH 121A Mathematical Tools for the Physical Sciences 4 Units

Intended for students in the physical sciences who are not planning to take more advanced mathematics courses. Rapid review of series and partial differentiation, complex variables and analytic functions, integral transforms, calculus of variations.

MATH 121B Mathematical Tools for the Physical Sciences 4 Units

Intended for students in the physical sciences who are not planning to take more advanced mathematics courses. Special functions, series solutions of ordinary differential equations, partial differential equations arising in mathematical physics, probability theory.

MATH 123 Ordinary Differential Equations 4 Units

Existence and uniqueness of solutions, linear systems, regular singular points. Other topics selected from analytic systems, autonomous systems, Sturm-Liouville Theory.

MATH 125A Mathematical Logic 4 Units

Sentential and quantificational logic. Formal grammar, semantical interpretation, formal deduction, and their interrelation. Applications to formalized mathematical theories. Selected topics from model theory or proof theory.

MATH 126 Introduction to Partial Differential Equations 4 Units

Waves and diffusion, initial value problems for hyperbolic and parabolic equations, boundary value problems for elliptic equations, Green's functions, maximum principles, a priori bounds, Fourier transform.

MATH 127 Mathematical and Computational Methods in Molecular Biology 4 Units

Introduction to mathematical and computational problems arising in the context of molecular biology. Theory and applications of combinatorics, probability, statistics, geometry, and topology to problems ranging from sequence determination to structure analysis.

MATH 128A Numerical Analysis 4 Units

Programming for numerical calculations, round-off error, approximation and interpolation, numerical quadrature, and solution of ordinary differential equations. Practice on the computer.

MATH 128B Numerical Analysis 4 Units

Iterative solution of systems of nonlinear equations, evaluation of eigenvalues and eigenvectors of matrices, applications to simple partial differential equations. Practice on the computer.

MATH 130 The Classical Geometries 4 Units

A critical examination of Euclid's Elements; ruler and compass constructions; connections with Galois theory; Hilbert's axioms for geometry, theory of areas, introduction of coordinates, non-Euclidean geometry, regular solids, projective geometry.

MATH 135 Introduction to the Theory of Sets 4 Units

Set-theoretical paradoxes and means of avoiding them. Sets, relations, functions, order and well-order. Proof by transfinite induction and definitions by transfinite recursion. Cardinal and ordinal numbers and their arithmetic. Construction of the real numbers. Axiom of choice and its consequences.

MATH 136 Incompleteness and Undecidability 4 Units

Functions computable by algorithm, Turing machines, Church's thesis. Unsolvability of the halting problem, Rice's theorem. Recursively enumerable sets, creative sets, many-one reductions. Self-referential programs. Godel's incompleteness theorems, undecidability of validity, decidable and undecidable theories.

MATH 140 Metric Differential Geometry 4 Units

Frenet formulas, isoperimetric inequality, local theory of surfaces in Euclidean space, first and second fundamental forms. Gaussian and mean curvature, isometries, geodesics, parallelism, the Gauss-Bonnet-Von Dyck Theorem.

MATH 141 Elementary Differential Topology 4 Units

Manifolds in n-dimensional Euclidean space and smooth maps, Sard's Theorem, classification of compact one-manifolds, transversality and intersection modulo 2.

MATH 142 Elementary Algebraic Topology 4 Units

The topology of one and two dimensional spaces: manifolds and triangulation, classification of surfaces, Euler characteristic, fundamental groups, plus further topics at the discretion of the instructor.

MATH 143 Elementary Algebraic Geometry 4 Units

Introduction to basic commutative algebra, algebraic geometry, and computational techniques. Main focus on curves, surfaces and Grassmannian varieties.

MATH 151 Mathematics of the Secondary School Curriculum I 4 Units

Theory of rational numbers based on the number line, the Euclidean algorithm and fractions in lowest terms. The concepts of congruence and similarity, equation of a line, functions, and quadratic functions.

MATH 152 Mathematics of the Secondary School Curriculum II 4 Units

Complex numbers and Fundamental Theorem of Algebra, roots and factorizations of polynomials, Euclidean geometry and axiomatic systems, basic trigonometry.

MATH 153 Mathematics of the Secondary School Curriculum III 4 Units

The real line and least upper bound, limit and decimal expansion of a number, differentiation and integration, Fundamental Theorem of Calculus, characterizations of sine, cosine, exp, and log.

MATH 160 History of Mathematics 4 Units

History of algebra, geometry, analytic geometry, and calculus from ancient times through the seventeenth century and selected topics from more recent mathematical history.

MATH 170 Mathematical Methods for Optimization 4 Units

Linear programming and a selection of topics from among the following: matrix games, integer programming, semidefinite programming, nonlinear programming, convex analysis and geometry, polyhedral geometry, the calculus of variations, and control theory.

MATH 172 Combinatorics 4 Units

Basic combinatorial principles, graphs, partially ordered sets, generating functions, asymptotic methods, combinatorics of permutations and partitions, designs and codes. Additional topics at the discretion of the instructor.

MATH 185 Introduction to Complex Analysis 4 Units

Analytic functions of a complex variable. Cauchy's integral theorem, power series, Laurent series, singularities of analytic functions, the residue theorem with application to definite integrals. Some additional topics such as conformal mapping.

MATH H185 Honors Introduction to Complex Analysis 4 Units

Honors section corresponding to Math 185 for exceptional students with strong mathematical inclination and motivation. Emphasis is on rigor, depth, and hard problems.

MATH 189 Mathematical Methods in Classical and Quantum Mechanics 4 Units

Topics in mechanics presented from a mathematical viewpoint: e.g., hamiltonian mechanics and symplectic geometry, differential equations for fluids, spectral theory in quantum mechanics, probability theory and statistical mechanics. See department bulletins for specific topics each semester course is offered.

MATH 191 Experimental Courses in Mathematics 1 - 4 Units

The topics to be covered and the method of instruction to be used will be announced at the beginning of each semester that such courses are offered. See departmental bulletins.

MATH 195 Special Topics in Mathematics 4 Units

Lectures on special topics, which will be announced at the beginning of each semester that the course is offered.

MATH 196 Honors Thesis 4 Units

Independent study of an advanced topic leading to an honors thesis.

MATH 197 Field Study 1 - 4 Units

For Math/Applied math majors. Supervised experience relevant to specific aspects of their mathematical emphasis of study in off-campus organizations. Regular individual meetings with faculty sponsor and written reports required. Units will be awarded on the basis of three hours/week/unit.

MATH 198 Directed Group Study 1 - 4 Units

Topics will vary with instructor.

MATH 198BC Berkeley Connect 1 Unit

Berkeley Connect is a mentoring program, offered through various academic departments, that helps students build intellectual community. Over the course of a semester, enrolled students participate in regular small-group discussions facilitated by a graduate student mentor (following a faculty-directed curriculum), meet with their graduate student mentor for one-on-one academic advising, attend lectures and panel discussions featuring department faculty and alumni, and go on field trips to campus resources. Students are not required to be declared majors in order to participate.

MATH 199 Supervised Independent Study and Research 1 - 4 Units

Faculty

Professors

Ian Agol, Professor.

Denis Auroux, Professor. Mirror symmetry, symplectic topology.
Research Profile

Richard E. Borcherds, Professor. Mathematics, lie algebras, vertex algebras, automorphic forms.
Research Profile

F. Michael Christ, Professor. Mathematics, harmonic analysis, partial differential equations, complex analysis in several variables, spectral analysis of Schrodinger operators.
Research Profile

David Eisenbud, PhD, Professor. Mathematics, algebraic geometry, commutative algebra, computation.
Research Profile

Lawrence C. Evans, Professor. Optimization theory, nonlinear partial differential equations, calculus of variations.
Research Profile

Edward Frenkel, Professor. Mathematics, representation theory, integrable systems, mathematical physics.
Research Profile

Alexander B. Givental, Professor. Mathematics, mathematical physics, symplectic geometry, singularities, mirror symmetry.
Research Profile

F. Alberto Grunbaum, Professor. Medical imaging, x-ray crystallography, imaging of structures of biological interest, classical and quantum random walks, matrix valued orthogonal polynomials, quasi birth-and-death processes.
Research Profile

Ming Gu, PhD, Professor. Mathematics, scientific computing, numerical linear algebra, adaptive filtering, system and control theory, differential and integral equations.
Research Profile

Mark D Haiman, Professor. Mathematics, algebraic geometry, algebra, combinatorics, diagonal coinvariants, Hilbert schemes.
Research Profile

Ole H. Hald, Professor. Mathematics, numerical analysis.
Research Profile

Leo A. Harrington, Professor. Mathematics, model theory, recursion theory, set theory.
Research Profile

Jenny Harrison, Professor. Mathematics, geometric analysis.
Research Profile

Olga V. Holtz, Professor. Numerical analysis, matrix and operator theory, approximation theory, wavelets and splines, orthogonal polynomials and special functions, analysis of algorithms and computational complexity.
Research Profile

Michael Hutchings, Professor. Mathematics, low dimensional, symplectic topology, geometry.
Research Profile

John W. Lott, Professor.

David Nadler, Professor.

Arthur E. Ogus, Professor. Mathematics, algebraic geometry, algebraic differential equations, log poles.
Research Profile

Martin Olsson, PhD, Professor.

Lior Pachter, Professor. Mathematics, applications of statistics, combinatorics to problems in biology.
Research Profile

Nicolai Reshetikhin, Professor. Mathematics, representation theory, mathematical physics, low-dimensional topology.
Research Profile

Fraydoun Rezakhanlou, Professor. Mathematics, probability theory, partial differential equations.
Research Profile

Kenneth A. Ribet, Professor. Mathematics, algebraic geometry, algebraic number theory.
Research Profile

Marc A. Rieffel, Professor. Mathematics, operator algebras, non-commutative harmonic analysis, quantum geometry.
Research Profile

Thomas Warren Scanlon, Professor. Mathematics, model theory, applications to number theory.
Research Profile

Vera Serganova, Professor. Mathematics, Super-representation theory.
Research Profile

James A. Sethian, Professor. Mathematics, applied mathematics, partial differential equations, computational physics, level set Methods, computational fluid mechanics and materials sciences. fast marching methods.
Research Profile

Theodore A. Slaman, PhD, Professor. Mathematics, recursion theory.
Research Profile

Zvezdelina Stankova, Professor.

John Steel, PhD, Professor. Mathematics, descriptive set theory, set theory, fine structure.
Research Profile

John Strain, Professor. Mathematics, numerical analysis, applied mathematics, fast algorithms, materials science.
Research Profile

Bernd Sturmfels, PhD, Professor. Mathematics, combinatorics, computational algebraic geometry.
Research Profile

Daniel Ioan Tataru, Professor. Mathematics, partial differential equations, nonlinear waves.
Research Profile

Peter Teichner, PhD, Professor. Topology, quantum field theory.
Research Profile

Constantin Teleman, Professor. Lie algebras, algebraic geometry, Lie groups, topology, topological quantum field theory.
Research Profile

Dan Virgil Voiculescu, Professor. Random matrices, pperator algebras, free probability theory.
Research Profile

Paul A. Vojta, Professor. Mathematics, algebraic geometry, diophantine geometry, Nevanlinna theory, Arakelov theory.
Research Profile

Mariusz Wodzicki, Professor. Analysis, mathematics, Non-commutative and algebraic geometry, K-theory.
Research Profile

W. Hugh Woodin, Professor. Mathematics, set theory, large cardinals.
Research Profile

Maciej Zworski, Professor. Mathematics, partial differential equations, mathematical physics, mathematical aspects of quantum mechanics, scattering theory, microlocal analysis.
Research Profile

Associate Professors

Antonio Montalban, Associate Professor.

Per-Olof Persson, Associate Professor. Applied mathematics, numerical methods, computational fluid and solid mechanics.
Research Profile

Sug Woo Shin, Associate Professor.

Katrin Wehrheim, Associate Professor.

Jon Wilkening, Associate Professor.

Lauren Williams, PhD, Associate Professor.

Assistant Professors

Richard H Bamler, Assistant Professor.

Lin Lin, Assistant Professor.

Vivek Vijay Shende, Assistant Professor.

Xinyi Yuan, Assistant Professor.

Adjunct Faculty

Paul Concus, Adjunct Faculty. Fluid mechanics, numerical analysis, applied mathematics, capillarity.
Research Profile

Contact Information

Department of Mathematics

970 Evans Hall

Phone: 510-642-6550

Fax: 510-642-8204

Visit Department Website

Department Chair

Arthr Ogus, PhD

949 Evans Hall

Phone: 510-642-8065

ogus@math.berkeley.edu

Vice-Chair for Undergraduate Affair

Fraydoun Rezahkanlou, PhD

803 Evans Hall

Phone: 510-642-2838

rezakhan@berkeley.edu

Director of Student Services

Rebecca Pauling

967 Evans Hall

Phone: 510-642-2479

rpauling@berkeley.edu

Undergraduate Student Affairs Officer

Thomas Brown

965 Evans Hall

Phone: 510-643-9292

brown@math.berkeley.edu

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