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200 10$aArt of darkness $ea poetics of Gothic /$fAnne Williams
205   $a1st ed.
210   $aChicago $cUniversity of Chicago Press$d1995
215   $a1 online resource (325 p.)
300   $aDescription based upon print version of record.
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320   $aIncludes bibliographical references (p. 285-300) and index.
327   $tFrontmatter -- $tCONTENTS -- $tACKNOWLEDGMENTS -- $tINTRODUCTION. Gothic Fiction's Family Romances -- $tPart One. Riding Nightmares; or, What's Novel about Gothic? -- $tPart Two. Reading Nightmeres; or, The Two Gothic Traditions -- $tEPILOGUE. The Mysteries of Enlightenment; or Dr. Freud's Gothic Novel -- $tAPPENDIX A. Inner and Outer Spaced The Alien Trilogy -- $tAPPENDIX B. Gothic Families -- $tAPPENDIX C. The Female Plot of Ghotic Fiction -- $tNotes -- $tBibliography -- $tIndex
330   $aArt of Darkness is an ambitious attempt to describe the principles governing Gothic literature. Ranging across five centuries of fiction, drama, and verse-including tales as diverse as Horace Walpole's The Castle of Otranto, Shelley's Frankenstein, Coleridge's The Rime of the Ancient Mariner, and Freud's The Mysteries of Enlightenment-Anne Williams proposes three new premises: that Gothic is "poetic," not novelistic, in nature; that there are two parallel Gothic traditions, Male and Female; and that the Gothic and the Romantic represent a single literary tradition. Building on the psychoanalytic and feminist theory of Julia Kristeva, Williams argues that Gothic conventions such as the haunted castle and the family curse signify the fall of the patriarchal family; Gothic is therefore "poetic" in Kristeva's sense because it reveals those "others" most often identified with the female. Williams identifies distinct Male and Female Gothic traditions: In the Male plot, the protagonist faces a cruel, violent, and supernatural world, without hope of salvation. The Female plot, by contrast, asserts the power of the mind to comprehend a world which, though mysterious, is ultimately sensible. By showing how Coleridge and Keats used both Male and Female Gothic, Williams challenges accepted notions about gender and authorship among the Romantics. Lucidly and gracefully written, Art of Darkness alters our understanding of the Gothic tradition, of Romanticism, and of the relations between gender and genre in literary history.
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200 10$aAnalysis in vector spaces $ea course in advanced calculus /$fMustafa A. Akcoglu, Paul F.A. Bartha, Dzung M. Ha
210   $aHoboken, N.J. $cWiley-Interscience$dc2009
215   $a1 online resource (480 p.)
300   $aIncludes index.
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327   $aAnalysis in Vector Spaces: A Course in Advanced Calculus; CONTENTS; Preface; PART I BACKGROUND MATERIAL; 1 Sets and Functions; 1.1 Sets in General; 1.2 Sets of Numbers; 1.3 Functions; 2 Real Numbers; 2.1 Review of the Order Relations; 2.2 Completeness of Real Numbers; 2.3 Sequences of Real Numbers; 2.4 Subsequences; 2.5 Series of Real Numbers; 2.6 Intervals and Connected Sets; 3 Vector Functions; 3.1 Vector Spaces: The Basics; 3.2 Bilinear Functions; 3.3 Multilinear Functions; 3.4 Inner Products; 3.5 Orthogonal Projections; 3.6 Spectral Theorem; PART II DIFFERENTIATION; 4 Normed Vector Spaces
327   $a4.1 Preliminaries4.2 Convergence in Normed Spaces; 4.3 Norms of Linear and Multilinear Transformations; 4.4 Continuity in Normed Spaces; 4.5 Topology of Normed Spaces; 5 Derivatives; 5.1 Functions of a Real Variable; 5.2 Differentiable Functions; 5.3 Existence of Derivatives; 5.4 Partial Derivatives; 5.5 Rules of Differentiation; 5.6 Differentiation of Products; 6 Diffeomorphisms and Manifolds; 6.1 The Inverse Function Theorem; 6.2 Graphs; 6.3 Manifolds in Parametric Representations; 6.4 Manifolds in Implicit Representations; 6.5 Differentiation on Manifolds; 7 Higher-Order Derivatives
327   $a7.1 Definitions7.2 Change of Order in Differentiation; 7.3 Sequences of Polynomials; 7.4 Local Extremal Values; PART III INTEGRATION; 8 Multiple Integrals; 8.1 Jordan Sets and Volume; 8.2 Integrals; 8.3 Images of Jordan Sets; 8.4 Change of Variables; 9 Integration on Manifolds; 9.1 Euclidean Volumes; 9.2 Integration on Manifolds; 9.3 Oriented Manifolds; 9.4 Integrals of Vector Fields; 9.5 Integrals of Tensor Fields; 9.6 Integration on Graphs; 10 Stokes' Theorem; 10.1 Basic Stokes' Theorem; 10.2 Flows; 10.3 Flux and Change of Volume in a Flow; 10.4 Exterior Derivatives
327   $a10.5 Regular and Almost Regular Sets10.6 Stokes' theorem on Manifolds; PART IV APPENDICES; Appendix A: Construction of the real numbers; A.1 Field and Order Axioms in Q; A.2 Equivalence Classes of Cauchy Sequences in Q; A.3 Completeness of R; Appendix B: Dimension of a vector space; B.1 Bases and linearly independent subsets; Appendix C: Determinants; C.1 Permutations; C.2 Determinants of Square Matrices; C.3 Determinant Functions; C.4 Determinant of a Linear Transformation; C.5 Determinants on Cartesian Products; C.6 Determinants in Euclidean Spaces; C.7 Trace of an Operator
327   $aAppendix D: Partitions of unityD.1 Partitions of Unity; Index
330   $aA rigorous introduction to calculus in vector spaces The concepts and theorems of advanced calculus combined with related computational methods are essential to understanding nearly all areas of quantitative science. Analysis in Vector Spaces presents the central results of this classic subject through rigorous arguments, discussions, and examples. The book aims to cultivate not only knowledge of the major theoretical results, but also the geometric intuition needed for both mathematical problem-solving and modeling in the formal sciences. The authors begin with an outline of
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