We propose a general framework of a hierarchical structure, consisting of several levels of activities, for typical software related corporate hierarchy using multi-agent system. This work identifies the functionality of each level. Each and every level is considered as agent who is described further using fuzzy analysis. Our framework consists of six levels within which first five levels are considered as agents followed by the human interaction at the lowermost level. These agents interact with each other to produce a desired result for the client based on autonomous decisions which are decided through fuzzy reasoning with the help of predefined databases. A layered architecture has been proposed in this paper for showing a corporate office hierarchy in a cost effective manner. In general, management employees of the corporate system draw a huge amount of money for their activities. Our ultimate aim is to reduce the cost of the existing corporate system by observing and controlling the behavioral characteristics of each level of hierarchy by replacing typical manual operations with agents [1,2]. We have presented a case study or practical engineering example along with the description of each agent.
The purpose of this article is to explore different types of solutions for the Kadomtsev-Petviashvili-modified Kadomtsev-Petviashvili (KP-mKP) equation which is termed as KP-Gardner equation, extensively used to model strong nonlinear internal waves in (
1
+
2
)-dimensions on the stratified ocean shelf. This evolution equation is also used to describe weakly nonlinear shallow-water wave and dispersive interracial waves traveling in a mildly rotating channel with slowly varying topography. Introducing Liu’s approach regarding the complete discrimination system for polynomial and the trial equation technique, a set of new solutions to the KP-mKP equation containing Jacobi elliptic function have been derived. It is found that these analytical solutions numerically exhibit different nonlinear structures such as solitary waves, shock waves, and periodic wave profiles. The reliability and effectiveness are confirmed from the numerical graphs of the solutions. Finally, the existence and validity of the various topological structures of the solutions are confirmed from the phase portrait of the dynamical system. Based on this investigation, it is confirmed that the method is not only suited for obtaining the classification of the solutions but also for qualitative analysis, which means that it can also be extended to other fields of application.
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