ALGEBRA TALTEORI KOMBINATORIK A-L



- F.Almgren: Plateau's problem; an introction to varifold geometry.
- E.Artin: Galois theory; lectures delivered at the Univ. of Notre Dame.
- D.Asche: An introduction to groups.
R.B.Ash: A primer of abstract mathematics.
A.Baker: A concise introduction to the theory of numbers.
H.F.Baker: Principles of geometry. Vol. 1-2.
- T.Barnard, H.Neill: Matehematical groups.
- A.H.Beiler: Recreations in the theory of numbers; the queen of mathematics entertains.
- N.L.Biggs: Discrete mathematics
W.Blaschke: Einführung in die Differentialgeometrie.
L.M.Blumenthal: A modern view of geometry.
K.P.Bogart: Introductory combinatorics.
- V.Boltyanski, A.Soifer: Geometrical etudes in combinatorial mathematics.
R.Bonola: Non-Euclidean geometry; a critical and historical study of its development.
B.Bunch: Reality's mirror; exploring the matter of symmetry.
M.Burrow: Representaion theory of finite groups.
F.Carlson: Lärobok i geometri. Vol. 1-2.
F.Carlson: Rymdgeometri.
- J.Carstensen: Grafteori.
J.Carstensen: Talteori.
G.J.Chaitin: Exploring randomness.
C-C Chen, K-M Koh: Principles and techniques in combinatorics.
J.Clark, D.A.Holton: A first look at graph theory.
- J.Cofman: Numbers and shapes revisited; more problems for young mathematicians.
J.H.Conway, R.K.Guy: Boken om tal.
J.H.Conway: On numbers and games.
- J.H.Conway: The sensual (quadratic) form.
H.S.M.Coxeter: Non-Euclidean geometry.
H.S.M.Coxeter: Projective geometry.
- H.S.M.Coxeter, S.L.Greitzer: Geometry revisited.
H.B.Curry: A theory of formal deducibility.
- K.Dam: Firfarveproblemet.
- G.Davidoff, P.Sarnak, A.Valette: Elementary number theory, group theory, and Ramanujan graphs.
R.Dedekind: Essays on the theory of numbers.
- R.A.Dunlap: The golden ratio and Fibonacci numbers.
R.A.Frazer, W.J.Duncan, A.R.Collar: Elementary matrices and some applications to dynamics and differential equations.
- I.M.Gelfand, A.Shen: Algebra.
Geometry at work; a collection of papers showing applications of geometry. Ed. C.A.Gorini.
- S.W.Golomb: Polyominoes; puzzles, patterns, problems, and packings.
R.L.Goodstein, E.J.F.Primrose: Axiomatic projective geometry.
- I.Grossman, W.Magnus: Groups and their graphs.
W.Haack: Elementare Differentialgeometrie.
- C.R.Hadlock: Field theory and its classical problems.
P.R.Halmos: Finite dimensional vector spaces.
R.Honsberger: Episodes in 19th and 20th century Euclidean geometry.
S.Hugget, D.Jordan; A topological aperitif.
- N.H.Ibragimov: Modern gruppanalys; en inledning till Lies lösningsmetoder av ickelinjära differentialekvationer.
O.A.Ivanov: Easy as p?; an introduction to higher mathematics.
T.H.Jackson: From polynomials to sums of squares.
H.R.Jacobs: Geometry.
N.Jacobsson: Lectures in abstract algebra, vol 1; basic concepts.
N.Jacobsson: Lectures in abstract algebra, vol 2; linear algebra.
N.Jacobsson: Lectures in abstract algebra, vol 3; theory of fields and Galois theory.
B.Jonsson, A.Tarski: Direct decompositions of finite algebraic systems.
E.v.Kamke: Mengenlehre.
E.F.Krause: Taxicab geometry; an adventure in non-Euclidean geometry.
A.G.Kurosch: Algebraische Gleichungen beliebigen Grades.
- E.Landfriedt: Thetafunktionen und hyperelliptische Funktionen.
- S.Lipschutz: Shaum's outline of theory and problems of discrete mathematics.
- S.Lipschutz: Shaum's outline of theory and problems of linear algebra.
- D.E.Littlewood: The theory of group characters and matrix representations of groups.
J.Lützen: Cirklens kvadratur, vinklens tredeling og terningens fordobling; fra oldtidens geometri til moderne algebra.