We consider two topics of event history analysis: proportional hazards regression and competing risks models. Both are studied within new semiparametric formulations and the aim is to develop a full Bayesian treatment. The hazard regression model we consider is a variant of the Cox model, as it postulates a logistic relative risk function. The Bayesian construction involves a beta process for the cumulative baseline hazard and a Jeffreys-type density for the regression coefficients. The posterior distribution is derived and a Bernstein-von Mises (BvM) theorem is reached for our class of priors. Competing risks data describe failure times with multiple endpoints. We model cause-specific hazards (CSH) via the conditional probability of a failure type and the overall hazard. We propose a beta process for the overall cumulative hazard and derive a BvM theorem for the posterior of the CSHs.