Different interpretations of triangular norms and related operations

A number of open problems on triangular norms and related operators was posed during the 24th Linz seminar on fuzzy set theory "Triangular norms and related operators in many-valued logics" held in February 2003. They are collected here, together with some other open problems in this context and wit

T-and aT-compositions , i.e., composite operations of sup-T and inf--aT, and relationships among ~-, etT-operators and t-norm are considered. It is shown that, if a composite fuzzy relational equation by T-composition has solutions, then a greatest one exists, and that if a similar equation by etr-c

It is shown that if A and B are positive operators on a separable complex Hilbert space, and if | • | is any unitarily invariant norm, then

We establish lower bounds for norms and CB-norms of elementary operators on B(H ). Our main result concerns the operator T a,b x = axb + bxa and we show T a,b a b , proving a conjecture of M. Mathieu. We also establish some other results and formulae for T a,b cb and T a,b for special cases.