A Simple Exponential Integral Representation of the Generalized Marcum Q-Function QM (a, b) for Real-Order M with Applications

_ This article derives a new exponential-type integral representation for the generalized M-th order Marcum Q-function, , when M is not necessarily an integer. Our new representation includes a well-known result due to Helstrom for the special case of positive integer M and an additional integral correction term that vanishes when M is an integer. The new form has both computational utility (numerous existing computational algorithms for are limited to integer M) and analytical utility (e.g., performance analysis of selection diversity in bivariate Nakagami-m fading with arbitrary fading severity index, computation of the complementary cumulative distribution function of a noncentral chi-square random variable for both odd and even orders, unified analysis of correlated binary and quaternary modulations over generalized fading channels, development of a Markovian threshold model for packet errors in correlated Nakagami-m fading channels and so on). Our alternative representation for also leads into a new, exact exponential integral formula for the cumulative distribution function (CDF) of signal-to-noise ratio (SNR) at the output of a dual-diversity selection combiner in correlated Nakagami-m fading (including the non-integer fading index case), which several researchers in the past have concluded as unobtainable. Simple yet tight upper and lower bounds for (for any arbitrary real order ) are also derived.