An approximation of matrix exponential by a truncated Laguerre series
Abstract
The Laguerre functions ln,τα, n=0,1,…, are constructed from generalized Laguerre polynomials. The functions ln,τα depend on two parameters: scale τ>0 and order of generalization α>-1, and form an orthogonal basis in L2[0,∞). Let the spectrum of a square matrix A lie in the open left half-plane. Then the matrix exponential HA(t)=eAt, t>0, belongs to L2[0,∞). Hence the matrix exponential HA can be expanded in a series HA=Σn=0∞ Sn,τ,α,A\,ln,τα. An estimate of the norm HA-Σn=0N Sn,τ,α,A\,ln,ταL2[0,∞) is proposed. Finding the minimum of this estimate over τ and α is discussed. Numerical examples show that the optimal α is often almost 0, which essentially simplifies the problem.
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