General system of cubic–quartic functional equations in quasi-β-normed spaces

IF 2.4 4区 计算机科学 Q2 COMPUTER SCIENCE, THEORY & METHODS
A. Bodaghi
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引用次数: 0

Abstract

In the current article, we define the multicubic–quartic mappings and describe them as an equation. We also study n-variable mappings, which are mixed type cubic–quartic in each variable and then give a characterization of such mappings. Indeed, we unify the general system of cubic–quartic functional equations defining a multimixed cubic–quartic mapping to a single equation, say, the multimixed cubic–quartic functional equation. Furthermore, we show under what conditions every multimixed cubic–quartic mapping can be multicubic, multiquartic and multicubic–quartic. In addition, by means of a known fixed-point result, we prove the Găvrua stability of multimixed cubic–quartic functional equations in the setting of quasi-β-normed spaces. One of the important results is that every multimixed cubic–quartic functional equation on a quasi-β-normed space is the Hyers–Ulam stable. Lastly, we investigate the hyperstability of multicubic -derivations on -algebras.
拟β-赋范空间中三次-四次泛函方程的一般系统
在本文中,我们定义了多元二次-四次映射,并将其描述为一个方程。我们还研究了n变量映射,它在每个变量中都是混合型三次-四次映射,然后给出了这种映射的一个特征。事实上,我们将定义多混合三次四次映射的三次-四次函数方程的一般系统统一为单个方程,例如多混合三次四次函数方程式。此外,我们还展示了在什么条件下,每个多混合三次-四次映射都可以是多bic、多quartic和多bic-quartic。此外,通过一个已知的不动点结果,我们证明了在拟β-赋范空间中多混合三次-四次函数方程的Găvrua稳定性。其中一个重要的结果是,准β-赋范空间上的每个多混合三次-四次泛函方程都是Hyers–Ulam稳定的。最后,我们研究了-代数上的多元bic-导子的超稳定性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
International Journal of General Systems
International Journal of General Systems 工程技术-计算机:理论方法
CiteScore
4.10
自引率
20.00%
发文量
38
审稿时长
6 months
期刊介绍: International Journal of General Systems is a periodical devoted primarily to the publication of original research contributions to system science, basic as well as applied. However, relevant survey articles, invited book reviews, bibliographies, and letters to the editor are also published. The principal aim of the journal is to promote original systems ideas (concepts, principles, methods, theoretical or experimental results, etc.) that are broadly applicable to various kinds of systems. The term “general system” in the name of the journal is intended to indicate this aim–the orientation to systems ideas that have a general applicability. Typical subject areas covered by the journal include: uncertainty and randomness; fuzziness and imprecision; information; complexity; inductive and deductive reasoning about systems; learning; systems analysis and design; and theoretical as well as experimental knowledge regarding various categories of systems. Submitted research must be well presented and must clearly state the contribution and novelty. Manuscripts dealing with particular kinds of systems which lack general applicability across a broad range of systems should be sent to journals specializing in the respective topics.
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