Lectures Of Pure Mathematics On Algebra Analysis and Geometry Kolektif 20 İndirim
Kolektif
Artikel Yayıncılık
Kolektif tarafından kaleme alınan Lectures Of Pure Mathematics On Algebra Analysis and Geometry Artikel Yayıncılık eseri olarak okurlarla buluşuyor Lectures Of Pure Mathematics On Algebra Analysis and Geometry Kolektif Kitap Özeti The algebraic theories most relevant to analysis are those which are extensions of the theory of rings It is widely believed that it is the finiteness of combining power of algebraic operations which distinguishes algebra from analysis For analysis always appears to involve infinite processes Application of algebra to geometry essentially involves the use of variables functions and equations to represent various known or unknown aspects of for example geometric figures To apply algebra in this context you dont need any new algebra skills but you do need to have some understanding of geometry and an ability to translate the somewhat abstract ideas of algebra to a more concrete use in geometry This book has been prepared by adapting the departments of analysis algebra and geometry on different and current mathematical problems from a mathematical perspective The book includes 6 book chapters blended with theoretical knowledge Each chapter consists of abstract lemmas propositions and theorems in the field of pure mathematics At the end of each book chapter conclusions about the subject are presented In the first chapter Semisimple Normal Injective Krasner Hypermodules are studied in hyperstructure theory In the second chapter On Quasi Normal Subgroups of Finite Groups are studied in group theory In the third chapter the concept of ss supplement which was brought to the literature in module theory was extended to hypermodules and the concept of Hyperstructural Approach to SS Supplements and its basic algebraic properties were introduced In the fourth book chapter titled Compact Embedding and Inclusion Theorems for Weighted Function Spaces with Wavelet Transform important findings were reached in Weighted Fuction Spaces by using the Wavelet transform In the study titled Bilinear Multipliers of Function Spaces with Wigner Transform which is the fifth chapter bilinear multipliers in function spaces with wigner transforms were studied and important analysis methods were developed on this subject The sixth book chapter is the work entitled On Almost Kenmotsu Manifolds Accepting Nullity Restrictions In this section appropriate methods have been developed and classes that will enrich manifold theory have been defined Yayınevi Artikel Yayıncılık Yazar Kolektif Sayfa 100 Sayfa Kağıt 2 Hamur Boyut 16 00x24 00 cm Basım Yılı 2021 Barkod 9786057406767 Kategori Yabancı Dilde Kitaplar