In this paper, we prove the existence, uniqueness and stability of solutions of neutral stochastic innite delay dierential equations with Poisson jumps and Markovian switching in the phase space BC( (-\infty,0];R^d ) which is the family of bounded continuous R^d -valued functions \varphi dfined on (-\infty, 0] with norm ||\varphi||=sup _{-\infty < \theta <= 0} | \varphi (\theta)| under non-Lipschitz condition and weakened linear growth condition. The solutions are constructed by the successive approximation method. Also we prove the continuous dependence of solutions on the initial value.