Uniform inferences in econometrics

This dissertation consists of three essays on constructing confidence sets in a model with discontinuous asymptotic distribution.; The first essay provides theoretical justification for some existing methods of constructing confidence intervals for the sum of coefficients in autoregressive models. I show that the methods of Stock (1991), Andrews (1993), and Hansen (1998) provide asymptotically valid confidence intervals, whereas the block bootstrap method of Romano and Wolf (2001) does not. In addition, I generalize the three valid methods to a larger class of statistics. I also clarify the difference between uniform and point-wise asymptotic approximations.; The second essay discriminates between the three methods validity of which is proven in the first essay. I show that Hansen's (1998) method for confidence set construction achieves a second order improvement in local to unity asymptotic approach compared with Stock's (1991) and Andrews' (1993) methods.; The third essay considers instrumental variable regression with a single endogenous variable and the potential presence of weak instruments. I construct confidence sets for the coefficient on the single endogenous regressor by inverting tests robust to weak instruments. I suggest a numerically simple algorithm for finding the Conditional Likelihood Ratio (CLR) confidence sets. The full descriptions of possible forms of the CLR, Anderson-Rubin (AR) and Lagrange Multiplier (LM) confidence sets are given. I show that the CLR confidence sets has nearly shortest expected arc length among similar symmetric invariant confidence sets in a circular model. I also prove that the CLR confidence set is asymptotically valid in a model with non-normal errors.