- P-ISSN1226-0657
- E-ISSN2287-6081
- KCI
ISSN : 1226-0657
Browse Articles
- 2024 (Vol.31)
- 2023 (Vol.30)
- 2022 (Vol.29)
- 2021 (Vol.28)
- 2020 (Vol.27)
- 2019 (Vol.26)
- 2018 (Vol.25)
- 2017 (Vol.24)
- 2016 (Vol.23)
- 2015 (Vol.22)
- 2014 (Vol.21)
- 2013 (Vol.20)
- 2012 (Vol.19)
- 2011 (Vol.18)
- 2010 (Vol.17)
- 2009 (Vol.16)
- 2008 (Vol.15)
- 2007 (Vol.14)
- 2006 (Vol.13)
- 2005 (Vol.12)
- 2004 (Vol.11)
- 2003 (Vol.10)
- 2002 (Vol.9)
- 2001 (Vol.8)
- 2000 (Vol.7)
- 1999 (Vol.6)
- 1998 (Vol.5)
- 1997 (Vol.4)
- 1996 (Vol.3)
- 1995 (Vol.2)
- 1994 (Vol.1)
Vol.14 No.1
Abstract
We study the topological magnitude of a special subset from the distribution subsets in a self-similar Cantor set. The special subset whose every element has no accumulation point of a frequency sequence as some number related to the similarity dimension of the self-similar Cantor set is of the first category in the self-similar Cantor set.
Abstract
The aim of this paper is to study the superstability problem of the cosine type functional equation f(x+y)+f(x+<TEX>${\sigma}y$</TEX>)=2g(x)g(y).
Abstract
We introduce the notion of pre-convergence of p-stacks and characterize the pre-interior, pre-closure, separation axioms and pre-continuity on a topological space by using pre-convergence of p-stacks. We also introduce the notion of p-precompactness and investigate its properties in terms of pre-convergence of p-stacks.
Abstract
We investigate the modified Hyers-Ulam-Rassias stability for the following mixed type functional equation, i.e, cubic or quadratic type functional equation : 9f(x+y)-9f(x-y)+f(6y)=3f(x+3y)-3f(x-3y)+9f(2y).
Abstract
In this paper, we introduce and study a class of generalized multivalued quasivariational inclusions for fuzzy mappings, and establish its equivalence with a class of fuzzy fixed-point problems by using the resolvent operator technique. We suggest a new iterative algorithm for the generalized multivalued quasivariational inclusions. Further, we establish a few existence results of solutions for the generalized multivalued quasivariational inclusions involving <TEX>$F_r$</TEX>-relaxed Lipschitz and <TEX>$F_r$</TEX>-strongly monotone mappings, and discuss the convergence criteria for the algorithm.