On the Theories of Triangular Sets

## Abstract We consider the sets definable in the countable models of a weakly o‐minimal theory __T__ of totally ordered structures. We investigate under which conditions their Boolean algebras are isomorphic (hence __T__ is p‐__ω__‐categorical), in other words when each of these definable sets adm

The experimental acquisition of large multidimensional (three-and four-dimensional) data sets is very timeconsuming and it is not uncommon that an experiment requires several days of acquisition time. Most of this time is required for good resolution on all spectroscopic axes, rather than for signal

This paper is concerned with topological set theory, and particularly with Skala's and Manakos' systems for which we give a topological characterization of the models. This enables us to answer natural questions about those theories, reviewing previous results and proving new ones. One of these show

## Abstract Let __M__ be an arbitrary structure. Then we say that an __M__ ‐formula __φ__ (__x__) __defines a stable set in__ __M__ if every formula __φ__ (__x__) ∧ __α__ (__x__, __y__) is stable. We prove: If __G__ is an __M__ ‐definable group and every definable stable subset of __G__ has __U__ ‐

This work concerns nonstrict Archimedean triangular norms and cardinalities of fuzzy sets. Values of those t-norms are expressed in the language of Hamming distances between some fuzzy sets. We apply this optics to two important types of cardinalities, namely generalized FGCounts and generalized sig