Representation Theory

Representation theory is a branch of mathematics that deals with abstract algebraic structures by representing their elements as linear transformations of vector spaces, and studies modules over these abstract algebraic structures. The open access journals are peer reviewed scholarly journals of The Journal of Generalized Lie Theory and Applications. The top open access journals are freely available on the public internet domain, allowing any end users to read, download, copy, distribute, prink, search or link to the full texts of the articles. These provide high quality, meticulously reviewed and rapid publication, to cater the insistent need of scientific community. These journals are indexed with all their citations noted. The top open access journals are indexed in SCOPUS, COPERNICUS, CAS, EBSCO and ISI. The Journal of Generalized Lie Theory and Applications has been established with the purpose to encourage the creation of outstanding research papers in the field of representation theory and related research work. It is to encourage established and budding specialists to delve into the field and push forward their research in the field of representation theory. The significance of the journals articles is based on further speculation and exploratory investigation related to all fields of geometry and other fields like representation theory, topology. OMICS International is one of the leading open access publishers for peer reviewed scientific journals. OMICS Group handles 500 Open Access journals and organizes around 80 scientific conferences annually. OMICS Group is not only confined to journal articles but also handles and publishes reviews, monographs and book sections, among others. The advancement of Open Access is essential for the empowerment and the development of global learning and future scientific development. With the newly launched OMICS Translation Services authors from any part of the world now have the opportunity to share their valuable research on representation theory across linguistic borders in different languages such as French, German, Spanish, Chinese, Japanese, and English. By translating your scientific paper into the mentioned languages we ensure an efficient exchange of knowledge and scientific experience. The translation process is always followed by strict review procedures to ensure absolute correctness. We believe that translation services perform a key role in the emergence of a connected scholarly community.
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Last date updated on June, 2014

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