Abstract
For sequences of independent and identically distributed random variables, Bahadur (1966), obtained, under certain mild coniditions an elegant almost sure represetation of a sample quantile as an average of independent and identically distributed centered random variables plus a remainder term converging to zero almost surely at a faster rate. J. K . Ghosh (1971), obtained, under milder regularity conditions, a weaker version of the result. The present paper obtains under certain conditions Bahadur type results for non-stationary ø-mixing processes and J. K. Ghosh type results for non-stationary strongly mixed processes.
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