Abstract
This paper continues investigation of a very weak arithmetic FQ∼ that results from the well-known Robinson arithmetic Q by not assuming that addition and multiplication are total functions and, secondly, by weakening the classical logic to the basic mathematical fuzzy logic BL∀ . This investigation was started in the paper [5] where the first Gödel incompleteness of FQ∼ is proved. Here we first discuss Q∼ over the Gödel fuzzy logic G∀, or alternatively over the intuitionistic predicate logic, showing essential incompleteness and essential undecidability; then we prove essential undecidability of FQ∼ , show a variant of the second Gödel incompleteness theorem for an extension of FQ∼ and present a model of the last theory which is fuzzy , has commutative addition and multiplication and non-associative addition