Time-dependent operators on some non-orientable projective orbifolds (Q2795293)

The language of Clifford algebra allows a factorization of the heat operator which also works for the Schrödinger operator. The paper deals with the extension of this theory to non-orientable orbifolds including cylinders and tori. For this class of orbifolds, the associated Cauchy kernels for the parabolic Dirac operator and the heat operator as well as the Schrödinger kernels are constructed. The paper is based on a former paper by the first author [J. Math. Anal. Appl. 427, No. 2, 669--685 (2015; Zbl 1316.58028)]. The paper is well readable since all necessary tools (Spin and pin structures, non-orientable projective counterparts of cylinders and tori) are introduced in detail. Following a generalized Bergman-Hodge-type decomposition proposed in basic works by Gürlebeck and the reviewer, the authors obtain solution representations to the inhomogeneous regularized Schrödinger equation in orbifolds (in complete analogy to the Euclidean case). Schrödinger-Bergman projections are introduced. Technically very sophisticated proofs are necessary to deduce the corresponding representation results.