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Abstract
This article is concerned with the approximation of the distributional behaviour of linear, time-invariant (LTI) systems. First, we review the different types of approximations of distributions by smooth functions and explain their significance in characterising system properties. Second, we consider the problem of changing the state of controllable LTI differential systems in a very short time. Thus, we establish an interesting relation between the time and volatility parameters of the Gaussian function and its derivatives in the approximation of distributional solutions. An algorithm is then proposed for calculating the distributional input and its smooth approximation which minimises the distance to an arbitrary target state. The optimal choice of the volatility parameter for the state transition is also derived. Finally, some complementary distance problems are also considered. The main results of this article are illustrated by numerous examples.
Acknowledgements
Part of the present version of this article has been presented in the 4th IFAC Symposium on System, Structure and Control Conference, 15–17th of September 2010, Ancona, Italy and in the Workshop ‘Advances in Mathematical Control Theory and Applications’, 19–20th of May 2011, Liverpool, UK. We are very grateful to Prof. Michael Malabre, Prof. Malcolm Smith, Prof. Jean-Jacques Loiseau and Dr Efstathios Antoniou for their helpful comments and remarks.