A Geometric Drift Inequality for a Reflected Fractional Brownian Motion Process on the Positive Orthant

Abstract: We study a d-dimensional reflected fractional Brownian motion (RFBM) process on the positive orthant S = R d + , with drift r 0 ∈ R d and Hurst parameter H ∈ ( 1 2 , 1). Under a natural stability condition on the drift vector r 0 and reflection directions, we establish a geometric drift towards a compact set for the 1-skeleton chainZ of the RFBM process Z; that is, there exist β, b ∈ (0, ∞) and a compact setfor an exponentially growing Lyapunov function V : S → [1, ∞). For a wide class of Markov processes, suc… Show more

On moment stability properties for a class of state-dependent stochastic networks

On moment stability properties for a class of state-dependent stochastic networks

Bounds on exponential moments of hitting times for reflected processes on the positive orthant

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