Commutation relations for Schramm-Loewner evolutions

In this paper we describe the covering relation in the lattice of the equational theories of commutative semigroups. We use the description and the methods worked out in an earlier paper by the second author [1994, Trans. Amer. Math. Soc. 342, 275-306].

## Abstract We consider an initial‐boundary value problem for the non‐linear evolution equation equation image in a cylinder __Q~t~__ = Ω × (0, __t__), where __T__[__u__] = __yu~xx~__ + __u~yy~__ is the Tricomi operator and __l__(__u__) a special differential operator of first order. In [10] we p

Solutions of a class of Cauchy problems are compared with solutions of related perturbed problems. Holder continuous dependence on the perturbation parame-ẗer is established for the difference of these solutions using the logarithmic convexity method. Results are also obtained under weaker restricti