This paper analyzes the properties of panel unit root tests based on recursively detrended

data. The analysis is conducted while allowing for a (potentially) non-linear

trend function, which represents a more general consideration than the current state of

affairs with (at most) a linear trend. A new test statistic is proposed whose asymptotic

behavior under the unit root null hypothesis, and the simplifying assumptions of a polynomial

trend and iid errors is shown to be surprisingly simple. Indeed, the test statistic is

not only asymptotically independent of the true trend polynomial, but is in fact unique

in that it is independent also of the degree of the fitted polynomial. However, this invariance

property does not carry over to the local alternative, under which it is shown that

local power is a decreasing function of the trend degree. But while power does decrease,

the rate of shrinking of the local alternative is generally constant in the trend degree,

which goes against the common belief that the rate of shrinking should be decreasing in

the trend degree. The above results are based on simplifying assumptions. To compensate

for this lack of generality, a second, robust, test statistic is proposed, whose validity

does not require that the trend function is a polynomial or that the errors are iid.