Govindan, T. E. Stability of stochastic neutral partial functional differential equations under Hölder type conditions. (English) Zbl 1240.60182 Differ. Integral Equ. 22, No. 5-6, 411-424 (2009). A stochastic neutral partial functional differential equation in a Hilbert space \[ d[x(t)+f(t,\pi _{t}x)]=[Ax(t)+a(t,\pi _{t}x)]\,dt+b(t,\pi _{t}x)dw(t),\quad t>0, \]\[ x(t)=\varphi (t),\quad t\in [-r,0], \] driven by a Hilbert space valued Wiener process is considered. The linear operator \(A\) is assumed to generate an analytic exponentially stable semigroup, \(\pi _{t}x(s)=x(t-r+s)\), \(f\) is Lipschitz, \(a\) and \(b\) may be little less than Lipschitz continuous and \(a\), \(b\) and \(f\) grow at most linearly (in appropriate norms). Sufficient conditions for existence, uniqueness, mean square and almost sure exponential stability of global mild solutions are addressed by means of the method of successive approximations. Reviewer: Martin Ondreját (Praha) MSC: 60H15 Stochastic partial differential equations (aspects of stochastic analysis) 35B35 Stability in context of PDEs 34K20 Stability theory of functional-differential equations Keywords:stability; stochastic partial differential equation × Cite Format Result Cite Review PDF