n-fold RING - Durge, Manohar
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This Covers Ring 01, Ring 1.1, Ring 02, Ring 2.1, Ring 03, Ring 3.1, Ring 04, Ring 4.1, Ring 05, Ring 06, Ring 6.1, Ring 07, Ring 7.1, Ring 08, Ring 8.1, Ring 09, Ring 9.1, Ring 10, Ring 10.1, Noetherian Ring, Modified Inner Product Space. The Main attraction of this book is a Existance of n-fold RING and its different types which are new for Mathematical Person s . Double Ring of Quaternion which is a special example of n-fold RING. Unity of n-fold Ring , n-fold integral domain , Zero element of n-fold Ring ,Zero divisor of n-fold Ring ,n-fold Ideal , n-fold Ring Homomorphism , n-fold…mehr

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Produktbeschreibung
This Covers Ring 01, Ring 1.1, Ring 02, Ring 2.1, Ring 03, Ring 3.1, Ring 04, Ring 4.1, Ring 05, Ring 06, Ring 6.1, Ring 07, Ring 7.1, Ring 08, Ring 8.1, Ring 09, Ring 9.1, Ring 10, Ring 10.1, Noetherian Ring, Modified Inner Product Space. The Main attraction of this book is a Existance of n-fold RING and its different types which are new for Mathematical Person s . Double Ring of Quaternion which is a special example of n-fold RING. Unity of n-fold Ring , n-fold integral domain , Zero element of n-fold Ring ,Zero divisor of n-fold Ring ,n-fold Ideal , n-fold Ring Homomorphism , n-fold Principal ideal Ring , n- fold Division Ring , n-fold field , n-fold Hemiring , n-fold nonassociative Ring , n- fold Near Ring are also defined.
Autorenporträt
Manohar Durge( Student In Mathematics ) has completed his Ph.D in July 2008,published 65 research papers in International Journals.Act as a research supervisor in RTM NU Nagpur(India) and GUG Gadchiroli(India) .Estalished Swabhimani,Manohar,Uttakarsh Mathematical group in India.Nandan Kumar (B.Sc.III Maths) student in ANC Anandwan Warora.