Title :
An ϵ arithmetic for removing degeneracies
Author_Institution :
Ecole Nat. Superieure des Mines de Saint-Etienne, France
Abstract :
Symbolic perturbation by infinitely small values removes degeneracies in geometric algorithms and enables programmers to handle only generic cases: there are a few such cases, whereas there are an overwhelming number of degenerate cases. Current perturbation schemes have limitations. To overcome them, the paper proposes to use an ε-arithmetic, i.e. to represent in an explicit way infinitely small numbers and to define arithmetic operations (+,-,*,/,<,=) on them
Keywords :
algorithm theory; computational geometry; digital arithmetic; perturbation techniques; symbol manipulation; ϵ arithmetic; arithmetic operations; degeneracy removal; explicit representation; generic cases; geometric algorithms; infinitely small values; programmers; symbolic perturbation; Arithmetic; Computer crashes; Data structures; Libraries; Parallel processing; Perturbation methods; Polynomials; Programming profession; Terminology; Testing;
Conference_Titel :
Computer Arithmetic, 1995., Proceedings of the 12th Symposium on
Conference_Location :
Bath
Print_ISBN :
0-8186-7089-4
DOI :
10.1109/ARITH.1995.465353
