
Academic Year:  2015/6 
Owning Department/School:  Department of Mathematical Sciences 
Credits:  6 
Level:  Masters UG & PG (FHEQ level 7) 
Period: 
Semester 1 
Assessment Summary:  EX 100% 
Assessment Detail: 

Supplementary Assessment: 
MA40043 Mandatory Extra Work (where allowed by programme regulations) 
Requisites: 
Before taking this module you must take MA20216 AND take MA20218
While taking this module you must take MA30041 
Description:  Aims: To introduce and study abstract spaces and general ideas in analysis, to apply them to examples, and to lay the foundations for the MA4 unit in functional analysis. Learning Outcomes: By the end of the unit, students should be able to state and prove the principal theorems relating to uniform continuity and uniform convergence for real functions on metric spaces, compactness in spaces of continuous functions, and elementary Hilbert space theory, and to apply these notions and the theorems to simple examples. Skills: Numeracy T/F, A Problem Solving T/F, A Written Communication F (on problem sheets) Content: Topics will be chosen from the following: Uniform continuity and uniform limits of continuous functions on [0,1]. Abstract StoneWeierstrass Theorem. Uniform approximation of continuous functions. Polynomial and trigonometric polynomial approximation, separability of C[0,1]. Total Boundedness. Diagonalisation. AscoliArzelà Theorem. Complete metric spaces. Baire Category Theorem. Nowhere differentiable function. Completion of a metric space. Innerproduct spaces. Hilbert spaces. CauchySchwarz inequality, parallelogram identity. Examples. Orthogonality, GramSchmidt process. Bessel's inequality, Pythagoras' Theorem. Projections and subspaces. Orthogonal complements. Complete orthonormal sets in separable Hilbert spaces. 
Programme availability: 
MA40043 is Optional on the following programmes:Department of Computer Science
