Method for treating functions as vectors in e,g, Hilbert space theory using integral equations, involves describing some applications of theory of Hilbert spaces to integral equations based on topological methods of functional analysis
	RAMACHANDRAN V; CHIDAMBARAM K; NAVEENCHANDRAN P; SUNDARARAJ M; HUSSAIN H J; BABU V R; SUNDARARAJAN M; RAJU B V K; SIVA M
	2023-10-16
专利权人	BHARATH HIGHER EDUCATION & RES INST (BHAR-Non-standard)
申请日期	2023-10-16
专利号	IN202341069853-A
成果简介	NOVELTY - The method involves treating functions as vectors in a Hilbert space by Hilbert space theory. Quantum physicists are used to solve difficult differential and integral equations by using mere algebra to describe many interesting phenomenon including EPR paradox (entanglement), quantum teleportation, and quantum telecloning. Reader is assumed to include background in linear algebra and real analysis with a discussion of three notions that are fundamental to field of functional analysis, such as metric spaces, normed linear spaces, and inner product spaces. USE - Method for treating functions as vectors in a Hilbert space i.e. Hilbert space theory using integral equations, Users include but are not limited to Volterra, Fredholm, Integro Differential, Singular and Abel's integral equations. ADVANTAGE - The method enables solving the integral equation in an efficient manner. The method allows the integral equations to be solved in a simple manner, thus reducing the computational complexity of the equation solving method, and hence improving the solvability of the equations in an effective manner.
IPC 分类号	G06F-017/16 ; G06F-030/33 ; G06N-010/00 ; G16C-010/00 ; H04B-010/70
国家	印度
专业领域	信息技术
语种	英语
成果类型	专利
文献类型	科技成果
条目标识符	http://119.78.100.226:8889/handle/3KE4DYBR/19627
专题	中国科学院新疆生态与地理研究所
作者单位	BHARATH HIGHER EDUCATION & RES INST (BHAR-Non-standard)
推荐引用方式 GB/T 7714	RAMACHANDRAN V,CHIDAMBARAM K,NAVEENCHANDRAN P,et al. Method for treating functions as vectors in e,g, Hilbert space theory using integral equations, involves describing some applications of theory of Hilbert spaces to integral equations based on topological methods of functional analysis. IN202341069853-A[P]. 2023.

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