![]() ![]() In college I wound up majoring in math, in part because I was no good at experiments. Science is the magic that actually works.Īnd so I learned to love math, but in a certain special way: as the key to physics. The mysterious symbols seemed like magic spells. But later, when I realized that by fiddling around with equations I could learn about the universe, I was hooked. I found long division insufferably boring, and refused to do my math homework, with its endless repetitive drills. My parents were a bit worried, because they knew physicists needed mathematics, and I didn’t seem very good at that. While I couldn’t understand it, I knew right away that I wanted to. When I was eight, he gave me a copy of the college physics textbook he wrote. Whenever my uncle came to town, he’d open his suitcase, pull out things like magnets or holograms, and use them to explain physics to me. My uncle Albert Baez, father of the famous folk singer Joan Baez, worked for UNESCO, helping developing countries with physics education. ![]() The great mathematician Leonhard Euler dreamt this up in 1745.Īs a kid I liked physics better than math. It’s not obvious that you can describe this using a polynomial equation, but you can. You get a curve with three sharp corners called a “deltoid”, shown in red above. For example, roll a circle inside a circle three times as big. You will find further guides and resources at the web page on examinations at UiO.We can describe many interesting curves with just polynomials. Special exam arrangements due to individual needs.Withdrawal during an examination / Resitting an examination.This course offers both postponed and resit of examination. Grades are awarded on a scale from A to F, where A is the best grade and F is a fail. You may write your examination paper in Norwegian, Swedish, Danish or English. Language of examinationĬourses taught in English will only offer the exam paper in English. No examination support material is allowed. It will also be counted as one of the three attempts to sit the exam for this course, if you sit the exam for one of the following courses: MAT9210 – Algebraic Geometry I Examination support material This course has 1 mandatory assignment that must be approved before you can sit the final exam. Examinationįinal oral exam which counts 100 % towards the final grade. Upon the attendance of three or fewer students, the lecturer may, in conjunction with the Head of Teaching, change the course to self-study with supervision. The course may be taught in Norwegian if the lecturer and all students at the first lecture agree to it. MAT4220 – Algebraic geometry II (discontinued).Ħ hours of lectures/exercises every week extending over the first half the spring term. If you are not already enrolled as a student at UiO, please see our information about admission requirements and procedures for international applicants. Nordic citizens and applicants residing in the Nordic countries may apply to take this course as a single course student. Students enrolled in other Master's Degree Programmes can, on application, be admitted to the course if this is cleared by their own study programme. Students admitted at UiO must apply for courses in Studentweb. are familiar with applications of algebraic methods in geometry.know the Bezout theorem and can use it in geometric applications.know the properties of the Hilbert polynomial and can compute it for selected projective varieties.can use blowing up to resolve plane curve singularities.can decide whether an algebraic variety is singular.can perform computations with morphisms and rational maps between algebraic varieties.know the relation between dimension in commutative rings and in algebraic sets.know the definitions and basic properties of algebraic varieties.There is a particular emphasis on concrete examples. Introduction to algebraic curves and varieties. It covers the concepts of dimension, singularities, curves and intersection theory form a geometric and an algebraic point of view. Algebraic geometry is a classical subject with a modern face that studies geometric objects defined by polynomial equations in several variables. The course introduces the basic objects in algebraic geometry: Affine and projective varieties and maps between them. ![]()
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