ANALYS A-L;

- L.Ahlfors: Complex analysis; an introduction to the theory of analytic functions of one complex variable.
A.C.Aitken: Determinants and matrices.
- T.Apostol: A century of calculus.
(Also given as parts I-II, see Brink in catalogue.)
- R.Beals: Advanced mathematical analysis.
E.Beckenbach: An introduction to inequalities.
R.Bellman: Differential-difference equations.
R.Bellman: Methods of nonlinear analysis.
B.Birkeland: Calculus and algebra with Mathcad 2000.
R.P.Boas: A primer of real functions.
- D.Bressoud: A radical approach to real analysis.
J.C.Burkill: The Lebesgue integral.
- A century of calculus; The R.W.Brink selected papers reprinted from the American matemath, I-II.
H.S.Carslaw: Theory of Fourier's series and integrals.
- K.-C.Chaang: Over and over again.
- R.Churchill: Introduction to complex variables and applications.
- R.Courant: Differential and integral calculus, I-II.
- R.Courant: Introduction to calculus and analysis I.
P.J.Davis: Spirals; from Theodorus to chaos.
J.Dieudonné: Foundations of modern mathematics.
G.F.R.Duff: Partial differntial equations.
H.B.Dwight: Tables of integrals and other mathematical data.
R.E.Edwards: Fourier series; a modern introduction.
D.Farmer: Knots and surfaces.
E.Fogelmarck: Analytisk geometri.
T.Fort: Finite differences and difference equations in the real domain.
C.Fox: An introduction to the calculus of variation.
P.Franklin: Methods of advanced calculus.
C.-E.Fröberg. Lärobok i numerisk analys.
I.M.Gélfand: Functions and graphs.
I.M.Gélfand: The method of coordinates.
M.Golomb: Elements of ordinary differential equations.
L.M.Graves: Theory of functions of real variables.
- J.A.Green: Sequences and series.
G.Hamel: Integralgleichungen; Einführung in Lehre und Gebrauch.
J.G.Hocking, G.S.Young: Topology.
C.Hyltén-Cavallius, L.Sandgren. Matematisk analys I-II.
E.Jahnke, F.Ende: Tables of functions; with formulae and curves.
- J.C.Jaeger: An introduction to the Laplace transformation.
R.E.Johnson: Calculus.
L.G.Kelly: Handbook of numerical methods and applications.
- K.Knopp: Theory of functionss, I-II.
- K.Knopp: Elemente der Funktionstheorie.
A.M.Kolmogorov: Elements of the theory of functions and functional analysis.
Vol.I. Metric and normed spaces,
Vol.II. Measure. The Lebesgue integral. Hilbert Space.
S.G.Krantz: Complex analysis; the geometric viewpoint.
S.G.Krantz: A panorama of harmonic analysis.
H.Lauwerier: Fractals, endlessly repeated geometrical figures.
S.Lefschetz: Lectures on differential equations.
H.Levy: Numerical studies in differential equations. Vol.I.