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Karhunen-Loève expansions of α-Wiener bridges

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Barczy M., Iglói E.

Open Mathematics

2011

tom 9

nr 1

65-84

We study Karhunen-Loève expansions of the process(X t(α))t∈[0,T) given by the stochastic differential equation $$ dX_t^{(\alpha )} = - \frac{\alpha } {{T - t}}X_t^{(\alpha )} dt + dB_t ,t \in [0,T) $$, with the initial condition X 0(α) = 0, where α > 0, T ∈ (0, ∞), and (B t)t≥0 is a standard Wiener process. This process is called an α-Wiener bridge or a scaled Brownian bridge, and in the special case of α = 1 the usual Wiener bridge. We present weighted and unweighted Karhunen-Loève expansions of X (α). As applications, we calculate the Laplace transform and the distribution function of the L 2[0, T]-norm square of X (α) studying also its asymptotic behavior (large and small deviation).

Ograniczanie wyników

1 Open Mathematics

1 Barczy M.

1 Iglói E.

1 2011

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Karhunen-Loève expansions of α-Wiener bridges