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200 10$aEgyptian society under Ottoman rule, 1517-1798 /$fMichael Winter
210  1$aLondon ;$aNew York :$cRoutledge,$d1992.
215   $a1 online resource (340 p.)
300   $aDescription based upon print version of record.
311   $a0-203-28566-2 
311   $a0-415-02403-X 
320   $aIncludes bibliographical references and index.
327   $aBook Cover; Title; Contents; Preface; List of Abbreviations; Introduction; Historical Background; The Vicissitudes of the Ruling Class; The Bedouin Arabs and the State; The Ulama; The Sufis; Popular Religion; The Ashraf and Naqib al-Ashraf: The Prophet's  Descendants and their Chief; The Dhimmis: Jews and Christians; Life in Ottoman Cairo; Conclusion; Notes; Bibliography; Index
330   $aMichael Winter's book presents a panoramic view of Ottoman Egypt from the overthrow of the Mamluk Sultanate in 1517 to Bonaparte's invasion of 1798 and the beginning of Egypt's modern period.Drawing on archive material, chronicle and travel accounts from Turkish, Arabic, Hebrew and European sources as well as up-to-date research, this comprehensive social history looks at the dynamics of the Egyptian-Ottoman relationship and the ethnic and cultural clashes which characterised the period. The conflicts between Ottoman pashas and their Egyptian subjects and between Bedouin Arabs and th
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300   $a394 p. ;$c24 cm.
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200 10$aLinear Algebra /$fby Jörg Liesen, Volker Mehrmann
205   $a2nd ed. 2025.
210  1$aCham :$cSpringer Nature Switzerland :$cImprint: Springer,$d2025.
215   $a1 online resource (XV, 389 p. 25 illus.)
225 1 $aSpringer Undergraduate Mathematics Series,$x2197-4144
311 08$a3-031-93259-5 
327   $aChapter 1. Linear Algebra in every day life -- Chapter 2. Basic mathematical concepts -- Chapter 3. Algebraic structures -- Chapter 4. Matrices -- Chapter 5. The echelon form and the rank of matrices -- Chapter 6. Linear systems of equations -- Chapter 7. Determinants of matrices -- Chapter 8. The characteristic polynomial and eigenvalues of matrices -- Chapter 9. Vector spaces -- Chapter 10. Linear maps -- Chapter 11. Linear forms and bilinear forms -- Chapter 12. Euclidean and unitary vector spaces -- Chapter 13. Adjoints of linear maps -- Chapter 14. Eigenvalues of endomorphisms -- Chapter 15. Polynomials and the Fundamental Theorem of Algebra -- Chapter 16. Cyclic subspaces, duality and the Jordan canonical form -- Chapter 17. Matrix functions and systems of differential equations -- Chapter 18. Special classes of endomorphisms -- Chapter 19. The singular value decomposition -- Chapter 20. The Kronecker product and linear matrix equations.
330   $aThis self-contained textbook, now in a thoroughly revised and expanded second edition, takes a matrix-oriented approach to Linear Algebra. It presents a complete theory, including all details and proofs, culminating in the Jordan canonical form and its derivation. Throughout, the book emphasizes the practical applicability of results. It therefore also covers special topics in Applied Linear Algebra, such as matrix functions, the singular value decomposition, the Kronecker product, and linear matrix equations. New to this edition are topics such as the Frobenius canonical form and a more detailed treatment of infinite-dimensional vector spaces, along with many additional exercises. The book?s matrix-oriented approach enhances intuition and simplifies abstract concepts, making them easier to understand and to apply in real-world scenarios. Key applications are illustrated through detailed examples. Additionally, several "MATLAB Minutes" allow students to explore concepts and results through computational experiments, supported by a brief introduction to MATLAB fundamentals. Together with over 380 exercises, this encourages active engagement with the material.
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