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Bibliografie

Journal Article

Distributed stabilisation of spatially invariant systems: positive polynomial approach

Augusta Petr, Hurák Z.

: Multidimensional Systems and Signal Processing vol.24, p. 3-21

: CEZ:AV0Z10750506

: 1M0567, GA MŠk

: Multidimensional systems, Algebraic approach, Control design, Positiveness

: 10.1007/s11045-011-0152-5

: http://library.utia.cas.cz/separaty/2013/TR/augusta-0382623.pdf

: http://dx.doi.org/10.1007/s11045-011-0152-5

(eng): The paper gives a computationally feasible characterisation of spatially distributed controllers stabilising a linear spatially invariant system, that is, a system described by linear partial differential equations with coefficients independent on time and location. With one spatial and one temporal variable such a system can be modelled by a 2-D transfer function. Stabilising distributed feedback controllers are then parametrised as a solution to the Diophantine equation ax + by = c for a given stable bi-variate polynomial c. The paper is built on the relationship between stability of a 2-D polynomial and positiveness of a related polynomial matrix on the unit circle. Such matrices are usually bilinear in the coefficients of the original polynomials. For low-order discrete-time systems it is shown that a linearising factorisation of the polynomial Schur-Cohn matrix exists. For higher order plants and/or controllers such factorisation is not possible as the solution set is non-convex and one has to resort to some relaxation. For continuous-time systems, an analogue factorisation of the polynomial Hermite-Fujiwara matrix is not known.

: BC