This paper deals with the Lipschitz property of triangular subnorms. Unlike the case of triangular norms,for these operations the problem is still open and presents an interesting variety of situations. We provide some characterization results by weakening the notion of convexity,introducing two generalized versions of convexity for real functions,called alfa-lower convexity and sub-convexity.The alfa-lower convex and subconvex real mappings present characteristics quite different from the usual convex real mappings. We will discuss the link between such kind of functions and the generators, and their pseudoinverse, of continuous Archimedean triangular subnorms.
Lipschitz Continuity of Triangular Subnorms
GHISELLI RICCI, Roberto;
2014
Abstract
This paper deals with the Lipschitz property of triangular subnorms. Unlike the case of triangular norms,for these operations the problem is still open and presents an interesting variety of situations. We provide some characterization results by weakening the notion of convexity,introducing two generalized versions of convexity for real functions,called alfa-lower convexity and sub-convexity.The alfa-lower convex and subconvex real mappings present characteristics quite different from the usual convex real mappings. We will discuss the link between such kind of functions and the generators, and their pseudoinverse, of continuous Archimedean triangular subnorms.I documenti in SFERA sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.