ANALYS M-Ö

A.MacFarlane: Vector analysis and quaterions.
- A.A.Markoff: Differenzenrechnung.
J.Malmquist, V.Stenström, S.Danielsson: Matematisk analys. Vol. I-III.
N.W.McLachlan: Ordinary non-linear differential equations in engineering and physical science.
G.H.Meyer: Initial problems for boundary value problems theory and application to invariant imbedding.
- S.G.Michlin: Mathematical physics; an advanced course.
- S.G.Michlin: Integral equations and their applications to certain problems in mechanics, mathematical physics and technology.
L.M.Milne-Thomson: The calculus of finite differences.
V.V.Nemytskii, V.V.Stepanov: Qualitive theory of differential equations.
- Nordic Congress of Mathematians: Analysis, algebra and computers in mathematical research; proceedings of the twenty-first Nordic Congress. Ed. Gyllenberg/Persson.
N.E.Nörlund: Vorlesungen über Differenzrechnung.
- Moigno-Lindelöf: Calcul des Variation.
H.-O.Peitgen: The beauty of fractals; images of complex dynamical systems.
- O.Perron: Irrationalzahlen
Revolutions in differential equations; exploring ODEs with modern technology. Ed. J.Michael.
- C.H.Richardson: An introductionto the method of finite differences.
- M.Rosenlicht: An introduction to analysis.;
D.E.Rutherford: Vektoranalys med tillämpningar; inom differentialgeometri,mekanik och potentialteori.
- D.E.Rutherford: Vector methods applied to differential geometry, mechanics and potential theory.
T.L.Saaty: Nonlinear mathematics.
- G.Sansone: Orthogonal functions.
I.A.Sneddon: Elements of partial differential equations.
D.M.Y.Sommerville: Analytic geometry of three dimensions.
B.Spain: Tensor calculus.
M.R.Spiegel: Schaum's outline of theory and problems of real varibles; Lesbesgue measure and integration, with applications.
- M.R.Spiegel: Schaum's outline of theory and problems of advanced mathematics for engineers and scientists.
- M.R.Spiegel: Schaum's outline of theory and problems of finite differences and difference equations.
W.J.Sternberg, T.L.Smith: The theory of potential and spherical harmonics.
Students research projects in calculus. Ed. M.Cohen et.al.
- J.L.Synge: The hypercircle in mathematical physics.
A.F.Timan: Theory of approximation of functions of a real variable.
- T.Tönisson: Högre matematematik för poeter och andra matematiska oskulder.
W.Walther: Einführung in die Theorie der Distributionen.
R.Weinstock: Calculus of variation; with applications to physics and engineering.
D.V.Widder: The Laplace transform.
D.V.Widder: Advanced calculus.
- A.H.Zemanian: Distribution theory; an introduction to generalized functions, with applications.
L.Zippin: Uses of infinity.