SoSe 2012 » Algebraic, Topological and Physical Aspects of Computing
Ziegler
Aktuelles
| 03.06.2012 | Due to a temporal collision, the exercise session on June 8th is replaced by a lecture on June 5 (Tuesday) at 9h50 in S2|15-401 |
| 24.05.2012 | On June 1st we have to temporarily reschedule the exercise session from 11:45 to 13:00. |
Veranstalter
| Name |
Raum |
Tel. |
| Ziegler, Martin | | |
Vorlesung
| Tag | Uhrzeit | in Raum |
|---|
| Donnerstags | 16:15 - 17:55 | S2|15-201 |
Literatur
- Brattka&Ziegler: Computability in Linear Algebra, pp.187-211 in Theoretical Computer Science vol.326
- Real Computation with Least Discrete Advice, http://dx.doi.org/10.1016/j.apal.2011.12.030
- Pauly&Ziegler: Relative Computability and Uniform Continuity of Relations, arXiv:1105.3050
- Ziegler&Koolen: Kolmogorov Complexity Theory over the Reals, Electronic Notes in Theoretical Computer Science vol.221 (2008).
- Brattka,Hertling,Weihrauch: Tutorial on Computable Analysis, www.springerlink.com/index/q8m3614067427312.pdf
- Weihrauch: Computable Analysis
- Morris: Topology without Tears, http://uob-community.ballarat.edu.au/~smorris/topology.htm
- P.Boldi&S.Vigna: "Equality is a Jump", http://dx.doi.org/10.1016/S0304-3975(98)00283-7
- K.Meer&M.Ziegler: "An explicit solution to Post's Problem over the reals", http://dx.doi.org/10.1016/j.jco.2006.09.004
- Blum,Shub,Smale: "On a Theory of Computation and Complexityover the real numbers", projecteuclid.org/euclid.bams/1183555121
Übung
| Nr. | Zeit | in Raum |
|---|
| 1 | Freitags, 11:40 - 12:40 | S215/201 |
Contents
- Topological Aspects
- Recap on Recursive Analysis
- Cauchy computable reals, signed-digit expansions
- Computing real functions and relations
- Examples: power series, ε-tests
- The (sometimes so-called) Main Theorem
- Computable Weierstraß Approximation Theorem
- Computing closed subsets; union and intersection
- Representations
- (In-)Computability in Linear Algebra and Geometry
- Convex Hull and 2D Point Location
- Determinant and rank
- Solving systems of linear equations
- Diagonalizing symmetric matrices
- Uniform Continuity for Multivalued Functions
- Hemi, weak and strong continuity
- Henkin continuity and the signed-digit relation
- A generalized Main Theorem
- and its converse
- Computing with Discrete Advice
- Above examples revisited
- Least discrete advice: quantitative
and combinatorial aspects of topology
- Witnesses of k-wise discontinuity for functions
- and for relations
- Examples: LLPO and MLPO
- Least advice for solving linear equations
- Least advice for symmetric matrix diagonalization
- Least advice for finding some eigenvector
- Revising Computation
- finitely many mind-changes
- naive Cauchy computation
- Algebraic Aspects
- Recap on the Blum-Shub-Smale Model
- Examples: computational geometry, linear algebra, algebraic geometry
- Canonical path decomposition, undecidability
- Reminder on field extensions and degrees; Lindemann-Weierstraß
- Comparison to Computable Analysis
- Uncomputable ex and sqrt,
computable Heaviside and decidable graph(sqrt)
- A continuous BSS-computable function
incomputable in Recursive Analysis
- Real Kolmogorov Complexity and Transcendence Degree
- Discrete Kolmogorov complexity
- NP-Completeness over the Reals
- Physical Aspects
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