Subpaving

In mathematics, a subpaving is a set of nonoverlapping boxes of Rⁿ. A subset X of Rⁿ can be approximated by two subpavings X⁻ and X⁺ such that X⁻ ⊂ X ⊂ X⁺. The three figures on the right show an approximation of the set X = {(x₁, x₂) ∈ R² | x₁² + x₂² + sin(x₁ + x₂) ∈ [4,9]} with different accuracies. The set X⁻ corresponds to red boxes and the set X⁺ contains all red and yellow boxes.

Subpavings which bracket a set with a low resolution

Subpavings which bracket the same set with a middle resolution

Subpavings which bracket the set with a high resolution

Combined with interval-based methods, subpavings are used to approximate the solution set of non-linear problems such as set inversion problems. [1] Subpavings can also be used to prove that a set defined by nonlinear inequalities is path connected [2] , to provide topological properties of such sets [3] , to solve piano-mover's problems [4] or to implement set computation [5] .

References

Jaulin, Luc; Walter, Eric (1993). "Set inversion via interval analysis for nonlinear bounded-error estimation" (PDF). Automatica. 29 (4): 1053–1064. doi:10.1016/0005-1098(93)90106-4.
Delanoue, N.; Jaulin, L.; Cottenceau, B. (2005). "Using interval arithmetic to prove that a set is path-connected" (PDF). Theoretical Computer Science. 351 (1).
Delanoue, N.; Jaulin, L.; Cottenceau, B. (2006). "Counting the Number of Connected Components of a Set and Its Application to Robotics" (PDF). Applied Parallel Computing, Lecture Notes in Computer Science. Lecture Notes in Computer Science. 3732 (1): 93–101. doi:10.1007/11558958_11. ISBN 978-3-540-29067-4.
Jaulin, L. (2001). "Path planning using intervals and graphs" (PDF). Reliable Computing. 7 (1).
Kieffer, M.; Jaulin, L.; Braems, I.; Walter, E. (2001). "Guaranteed set computation with subpavings" (PDF). In W. Kraemer and J. W. Gudenberg (Eds), Scientific Computing, Validated Numerics, Interval Methods, Kluwer Academic Publishers: 167–178. doi:10.1007/978-1-4757-6484-0_14. ISBN 978-1-4419-3376-8.

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[1] Jaulin, Luc; Walter, Eric (1993). "Set inversion via interval analysis for nonlinear bounded-error estimation" (PDF). Automatica. 29 (4): 1053–1064. doi:10.1016/0005-1098(93)90106-4.

[2] Delanoue, N.; Jaulin, L.; Cottenceau, B. (2005). "Using interval arithmetic to prove that a set is path-connected" (PDF). Theoretical Computer Science. 351 (1).

[3] Delanoue, N.; Jaulin, L.; Cottenceau, B. (2006). "Counting the Number of Connected Components of a Set and Its Application to Robotics" (PDF). Applied Parallel Computing, Lecture Notes in Computer Science. Lecture Notes in Computer Science. 3732 (1): 93–101. doi:10.1007/11558958_11. ISBN 978-3-540-29067-4.

[4] Jaulin, L. (2001). "Path planning using intervals and graphs" (PDF). Reliable Computing. 7 (1).

[5] Kieffer, M.; Jaulin, L.; Braems, I.; Walter, E. (2001). "Guaranteed set computation with subpavings" (PDF). In W. Kraemer and J. W. Gudenberg (Eds), Scientific Computing, Validated Numerics, Interval Methods, Kluwer Academic Publishers: 167–178. doi:10.1007/978-1-4757-6484-0_14. ISBN 978-1-4419-3376-8.