Sentence examples for mappings in both from inspiring English sources

Many researchers studied the existence and convergence theorems of those single-valued mappings in both Hilbert spaces and Banach spaces (e.g., see [16 23]).

In this paper, we prove some fixed point theorems for N-generalized hybrid mappings in both uniformly convex metric spaces and CAT ( 0 ) spaces.

Many researchers have studied the fixed point theorems of those mappings in both Hilbert spaces and Banach spaces (e.g., see [32, 33, 36 38]).

In [6], we continued to study the influence of computational errors on the convergence of iterates of nonexpansive mappings in both Banach and metric spaces.

Around 60% of reads are merged in the Unique filter step, suggesting they have either unique mappings in one of the pseudogenomes or identical mappings in both of them.

In this sense, the article shows that Roma street vendors project their flexible space-in-the-making by using 'emotional landscapes' as 'tentative mappings' in their travels, both narrated and practised.

The results obtained for step mappings in Section 3 both generalize and improve some results derived in [5 7] (see Remark 3.1).

Various chemo- and genoarchitectonic mappings suggest in both cases a fundamental organization into compact core portions and surrounding dispersed shell domains (Milhouse 1973; Chou et al. 2001; Choi et al. 2005; Segal et al. 2005; McClellan et al. 2006; Lee et al. 2012; Puelles et al. 2012).

Future directions to be pursued in the context of this research include the investigation of the case where both mappings in Zhang and Song's theorem are multivalued.

In 1995, Lim and Xu [25] proved a fixed point theorem for uniformly Lipschitzian mappings in metric spaces with both property (P) and uniform normal structure, which extended the result of Khamsi [23].

In 1995, Lim and Hong-Kun Xu [13] proved a fixed point theorem for uniformly Lipschitzian mappings in metric spaces with both property (P) and uniform normal structure, which extends the result of Khamsi [11].