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Mathematics HE in Europe. Bologna and some snapshots David Salinger. Bologna Process. 1998 Sorbonne Declaration 1999 Bologna Declaration 2001 Prague 2003 Berlin 2005 Bergen 2007 London. Sorbonne 1998. Two cycles, u/g and graduate (Dr or M) Credit transfer and semesters
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Mathematics HE in Europe Bologna and some snapshots David Salinger
Bologna Process • 1998 Sorbonne Declaration • 1999 Bologna Declaration • 2001 Prague • 2003 Berlin • 2005 Bergen • 2007 London
Sorbonne 1998 • Two cycles, u/g and graduate (Dr or M) • Credit transfer and semesters • Language proficiency • Students should spend at least one semester abroad Signed by France, Germany, Italy, UK
Bologna 1999 Creation of a European HE Area by 2010 • Common 2 cycle system • Credit transfer • Mobility of Staff and Students • Quality assurance • European dimension 29 European Countries
Prague 2001 • Not much change, but brought Rectors’ organisation (European Universities’ Association) and student organizations on board. • Added lifelong learning 33 Countries
Berlin: the process gathers pace • Added the third, doctoral cycle. • All countries should ratify the Lisbon Convention (recognition of qualifications) • From 2005 all students should receive a diploma supplement, free of charge • Overarching Qualifications Framework desired, but primary responsibility lies with the institution 40 Countries (incl.Russia)
Bergen 2005 • Partnership with HE Institutions • Specifications for Cycles 1 and 2 • (Part of) Salzburg declaration approved for Cycle 3 • Descriptors for the European Higher Education Area Qualifications Framework agreed 45 Countries
Not 3+2+3 The cycles are specified in terms of ECTS credits which themselves are defined a little vaguely in terms of time and learning outcomes. In practice this means the first cycle can last 3 to 4 years, the second 1 to 2 and the third 3 to 4.
Implementation • Most European Countries have put in place a Bachelor – Master– Doctorate system. • Still in transition • Grandes Ecoles untouched in France
Transition • Each country has its own traditions, so I can only caricature. I shall stick to Western Europe. • Broadly the old systems were for a nominal 4 or 5 years for the first degree, but students would take longer: in Germany much longer.
Bologna = no change? • 2+3=2+2+1=5 = 3+2 “=“ 3+1 • But students get a degree after 3 years.
Maths • Many different traditions of teaching maths but 3 generalities • Greater proportion of (possibly directed) examples classes, maybe more than lectures • Greater proportion allowed to fail • ‘Maths’ often means ‘Pure Maths’, at least to begin with (e.g. Spain)
France • Students taught at school in ‘preparatory’ classes for stiff entry competition. • Bac + 2 • 2 Maths + 1 Physics • Syllabus: Linear algebra, including dual spaces, bilinear maps; reduction of matrices; Cayley-Hamilton Theorem but not Jordan Canonical form.
Syllabus (cont) • Euclidean and affine geometry; conics; inner-product spaces (both real and complex) as far as Bessel’s inequality; reduction of quadratic forms. • Analysis and Differential Geometry going as far as Fréchet derivative in normed spaces. Completeness, compactness. Regulated integral. Power series, Fourier series. Linear and non-linear differential equations. Curves and surfaces.
Consequences • Students from Grandes Ecoles attend university courses. • Hence some syllabuses from year 3 take account of the classes preparatoires syllabus. • Year 3 can be tough for students who spend 1st two years at university. Measure and Probability is a standard component.
L(MD) at Paris-Sud • 6 routes: Economics-Maths, Maths Pure and Applied, Maths and Applications, Algebra-Analysis-Geometry(for teachers), Biomath & Biostats, Maths-Informatics • High proportion of pure maths to other. • Measure and Probability in year 3 in 1 path only • Language tuition is compulsory (5 ECTS)
Germany • Vor-Diplom + Diplom • Now Bachelor + Master • Heidelberg: vor-diplom year 1 basic study: Analysis 1-2, Linear Algebra 1-2 (4 hrs lecture + 3 hours class each per week), Programming course (4 hours); Semester 3 Analysis 3, Practical Maths, Proseminar (2 hrs) . Oral exams.
Heidelberg continued • Analysis: includes Lebesgue integral, Stokes theorem, Differential geometry, Fourier series
Is Germany Bologna compliant? • In principle but not in practice? These are but examples: with 45 Bologna signatories, there’s far more than can be said in 30 minutes.