The reducible double confluent Heun equation and a general symmetric unfolding of the origin

Abstract

The reducible double confluent Heun equation (DCHE) is the only DCHE whose general symmetric unfolding leads to a Fuchsian equation. Contrary to general Heun equation the unfolded Fuchsian equation has 5 singular points : xL=-, xR=, xLL=-1/, xRR=1/ and x∞=∞. We prove that the monodromy matrix around the regular resonant singularity at the origin is realizable as a limit of the product of the monodromy matrices around resonant singularities xL and xR when 0 while the Stokes matrix at the irregular singularity at the origin is a limit of the part of the monodromy matrix around the resonant singularity xL. We also show that the reducible DCHE possesses a holomorphic solution in the whole C* if and only if the parameters of the equation are connected by a Bessel function of first kind and order depending on the non-zero chracteristic exponent at the origin.