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 Garling, D. J. H., author.
 Cambridge, United Kingdom ; New York, NY : Cambridge University Press, 2018.
 Description
 Book — ix, 348 pages ; 23 cm.
 Summary

 Introduction Part I. Topological Properties:
 1. General topology
 2. Metric spaces
 3. Polish spaces and compactness
 4. Semicontinuous functions
 5. Uniform spaces and topological groups
 6. C...dl...g functions
 7. Banach spaces
 8. Hilbert space
 9. The HahnBanach theorem
 10. Convex functions
 11. Subdifferentials and the legendre transform
 12. Compact convex Polish spaces
 13. Some fixed point theorems Part II. Measures on Polish Spaces:
 14. Abstract measure theory
 15. Further measure theory
 16. Borel measures
 17. Measures on Euclidean space
 18. Convergence of measures
 19. Introduction to Choquet theory Part III. Introduction to Optimal Transportation:
 20. Optimal transportation
 21. Wasserstein metrics
 22. Some examples Further reading Index.
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QA611.28 .G36 2018  Unknown 
 Operator Theory, Analysis and the State Space Approach (Workshop) (2017 : Amsterdam, Netherlands), author.
 Cham : Birkhäuser, [2018]
 Description
 Book — xlviii, 464 pages : illustrations (chiefly color) ; 25 cm.
 Summary

 Curriculum Vitae of M.A. Kaashoek
 Publication List of M.A. Kaashoek
 List of Ph.D. students
 Personal reminiscenses / H. Bart, S. ter Horst, D.Pik, A. Ran, F. van Schagen and H.J. Woerdeman
 Carathéodory extremal functions on the symmetrized bidisc / J. Agler, Z.A. Lykova and N.J. Young
 Standard versus strict Bounded Real Lemma with infinitedimensional state space III : the dichotomous and bicausal cases / J.A. Ball, G.J. Groenewald and S. ter Horst
 Lfree directed bipartite graphs and echelontype canonical forms / H. Bart, T. Ehrhardt and B. Silbermann
 Extreme individual eigenvalues for a class of large Hessenberg Toeplitz matrices / J.M. Bogoya, S.M. Grudsky and I.S. Malysheva
 How to solve an equation with a Toeplitz operator? / A. Böttcher and E. Wegert
 On the maximal ideal space of even quasicontinuous functions on the unit circle / T. Ehrhardt and Z. Zhou
 Bisection eigenvalue method for Hermitian matrices with quasiseparable representation and a related inverse problem / Y. Eidelman and I. Haimovici
 A note on innerouter factorization of wide matrixvalued functions / A.E. Frazho and A.C.M. Ran
 An application of the Schur complement to truncated matricial power moment problems / B. Fritzsche, B. Kirstein and C. Mädler
 A Toeplitzlike operator with rational symbol having poles on the unit circle I : Fredholm properties / G.J. Groenewald, S. ter Horst, J. Jaftha and A.C.M. Ran
 Canonical form for Hsymplectic matrices / G.J. Groenewald, D.B. Janse van Rensburg and A.C.M. Ran
 A note on the Fredholm theory of singular integral operators with Cauchy and Mellin kernels / P. Junghanns and R. Kaiser
 Towards a system theory of rational systems / J. Němcová, M. Petreczky and J.H. van Schuppen
 Automorphisms of effect algebras / L. Plevnik and P. Šemrl
 GBDT of discrete skewselfadjoint Dirac systems and explicit solutions of the corresponding nonstationary problems / A.L. Sakhnovich
 On the reduction of general WienerHopf operators / F.O. Speck
 Maximum determinant positive definite Toeplitz completions / S. Sremac, H.J. Woerdeman and H. Wolkowicz
 On commutative C*algebras generated by Toeplitz operators with Tminvariant symbols / N. Vasilevski.
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QA329 .O64 2017  Unknown 
 Providence, Rhode Island : American Mathematical Society, [2017]
 Description
 Book — x, 361 pages : illustrations ; 26 cm.
 Summary

 * I. Losev, Rational Cherednik algebras and categorification* O. Dudas, M. Varagnolo, and E. Vasserot, Categorical actions on unipotent representations of finite classical groups* J. Brundan and N. Davidson, Categorical actions and crystals* A. M. Licata, On the 2linearity of the free group* M. Ehrig, C. Stroppel, and D. Tubbenhauer, The BlanchetKhovanov algebras* G. Lusztig, Generic character sheaves on groups over $k[\epsilon]/(\epsilon^r)$* D. Berdeja Suarez, Integral presentations of quantum lattice Heisenberg algebras* Y. Qi and J. Sussan, Categorification at prime roots of unity and hopfological finiteness* B. Elias, Folding with Soergel bimodules* L. T. Jensen and G. Williamson, The $p$canonical basis for Hecke algebras.
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QA169 .C3744 2017  Unknown 
 Providence, Rhode Island : American Mathematical Society, [2017]
 Description
 Book — x, 267 pages : illustrations ; 26 cm.
 Summary

 * B. Webster, Geometry and categorification* Y. Li, A geometric realization of modified quantum algebras* T. Lawson, R. Lipshitz, and S. Sarkar, The cube and the Burnside category* S. Chun, S. Gukov, and D. Roggenkamp, Junctions of surface operators and categorification of quantum groups* R. Rouquier, KhovanovRozansky homology and 2braid groups* I. Cherednik and I. Danilenko, DAHA approach to iterated torus links.
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QA169 .C3746 2017  Unknown 
 Cham, Switzerland : Springer, [2017]
 Description
 Book — xiv, 171 pages ; 24 cm.
 Summary

 1. Invariant distances / Marco Abate
 2. Dynamics in several complex variables / Marco Abate
 3. Gromov hyperbolic spaces and applications to complex analysis / Hervé Pajot
 4. Gromov hyperbolicity of bounded convex domains / Andrew Zimmer
 5. Quasiconformal mappings / Hervé Pajot
 6. Carleson measures and Toeplitz operators / Marco Abate
 Appendix A. Geometric analysis in one complex variable / Hervé Pajot.
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Shelved by Series title V.2195  Unknown 
 Cameron, Peter J. (Peter Jephson), 1947 author.
 Cambridge, UK ; New York : Cambridge University Press, 2017.
 Description
 Book — xii, 222 pages : illustrations ; 24 cm.
 Summary

 1. Introduction
 2. Formal power series
 3. Subsets, partitions and permutations
 4. Recurrence relations
 5. The permanent
 6. qanalogues
 7. Group actions and cycle index
 8. Mobius inversion
 9. The Tutte polynomial
 10. Species
 11. Analytic methods: a first look
 12. Further topics
 13. Bibliography and further directions Index.
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QA164 .C349 2017  Unknown 
 Bruce, Peter C., 1953 author.
 First edition.  Sebastopol, CA : O'Reilly Media, Inc., 2017.
 Description
 Book — xvi, 298 pages : illustrations ; 24 cm
 Summary

 Exploratory data analysis
 Data and sampling distributions
 Statistical experiments and significance testing
 Regression and prediction
 Classification
 Statistical machine learning
 Unsupervised learning.
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QA276.4 .B78 2017  Unknown 
8. Bayesian methods for repeated measures [2016]
 Broemeling, Lyle D., 1939 author.
 Boca Raton, FL : CRC Press, Taylor & Francis, [2016]
 Description
 Book — xv, 552 pages : illustrations ; 25 cm.
 Summary

 Introduction to the Analysis of Repeated Measures Introduction Bayesian Inference Bayes's Theorem Prior Information Posterior Information Posterior Inference Estimation Testing Hypotheses Predictive Inference The Binomial Forecasting from a Normal Population Checking Model Assumptions Sampling from an Exponential, but Assuming a Normal Population Poisson Population Measuring Tumor Size Testing the Multinomial Assumption Computing Example of a CrossSectional Study Markov Chain Monte Carlo Metropolis Algorithm Gibbs Sampling Common Mean of Normal Populations An Example Additional Comments about Bayesian Inference WinBUGS Preview Exercises Review of Bayesian Regression Methods Introduction Logistic Regression Linear Regression Models Weighted Regression Nonlinear Regression Repeated Measures Model Remarks about Review of Regression Exercises Foundation and Preliminary Concepts Introduction An Example Notation Descriptive Statistics Graphics Sources of Variation Bayesian Inference Summary Statistics Another Example Basic Ideas for Categorical Variables Summary Exercises Linear Models for Repeated Measures and Bayesian Inference Introduction Notation for Linear Models Modeling the Mean Modeling the Covariance Matrix Historical Approaches Bayesian Inference Another Example Summary and Conclusions Exercises Estimating the Mean Profile of Repeated Measures Introduction Polynomials for Fitting the Mean Profile Modeling the Mean Profile for Discrete Observations Examples Conclusions and Summary Exercises Correlation Patterns for Repeated Measures Introduction Patterns for Correlation Matrices Choosing a Pattern for the Covariance Matrix More Examples Comments and Conclusions Exercises General Mixed Linear Model Introduction and Definition of the Model Interpretation of the Model General Linear Mixed Model Notation Pattern of the Covariance Matrix Bayesian Approach Examples Diagnostic Procedures for Repeated Measures Comments and Conclusions Exercises Repeated Measures for Categorical Data Introduction to the Bayesian Analysis with a Dirichlet Posterior Distribution Bayesian GEE Generalized Mixed Linear Models for Categorical Data Comments and Conclusions Exercises Nonlinear Models and Repeated Measures Nonlinear Models and a Continuous Response Nonlinear Repeated Measures with Categorical Data Comments and Conclusion Exercises Bayesian Techniques for Missing Data Introduction Missing Data and Linear Models of Repeated Measures Missing Data and Categorical Repeated Measures Comments and Conclusions Exercises References.
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QA279.5 .B77 2016  Unknown 
9. Fourier analysis [2016  ]
 Constantin, Adrian.
 Cambridge : Cambridge University Press, 2016
 Description
 Book — volumes : illustrations ; 23 cm.
 Summary

 1. Introduction
 2. The Lebesgue measure and integral
 3. Elements of functional analysis
 4. Convergence results for Fourier series
 5. Fourier transforms
 6. Multidimensional Fourier analysis
 7. A glance at some advanced topics Appendix: historical notes References Index.
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QA403.5 .C66 2016 PT.1  Unknown 
 Aron, Richard M. author.
 Boca Raton, FL : CRC Press, Taylor & Francis Group, [2016]
 Description
 Book — xix, 308 pages : illustrations ; 24 cm.
 Summary

 Preliminary Notions and Tools Cardinal numbers Cardinal arithmetic Basic concepts and results of abstract and linear algebra Residual subsets Lineability, spaceability, algebrability, and their variants
 Real Analysis What one needs to know Weierstrass' monsters Differentiable nowhere monotone functions Nowhere analytic functions and annulling functions Surjections, Darboux functions, and related properties Other properties related to the lack of continuity Continuous functions that attain their maximum at only one point Peano maps and spacefilling curves
 Complex Analysis What one needs to know Nonextendable holomorphic functions: genericity Vector spaces of nonextendable functions Nonextendability in the unit disc Tamed entire functions Wild behavior near the boundary Nowhere Gevrey differentiability
 Sequence Spaces, Measure Theory, and Integration What one needs to know Lineability and spaceability in sequence spaces Noncontractive maps and spaceability in sequence spaces Lineability and spaceability in Lp[0, 1] Spaceability in Lebesgue spaces Lineability in sets of norm attaining operators in sequence spaces Riemann and Lebesgue integrable functions and spaceability
 Universality, Hypercyclicity, and Chaos What one needs to know Universal elements and hypercyclic vectors Lineability and denselineability of families of hypercyclic vectors Wild behavior near the boundary, universal series, and lineability Hypercyclicity and spaceability Algebras of hypercyclic vectors Supercyclicity and lineability Frequent hypercyclicity and lineability Distributional chaos and lineability
 Zeros of Polynomials in Banach Spaces What one needs to know Zeros of polynomials: the results
 Miscellaneous Series in classical Banach spaces Dirichlet series Nonconvergent Fourier series Normattaining functionals Annulling functions and sequences with finitely many zeros SierpinskiZygmund functions NonLipschitz functions with bounded gradient The DenjoyClarkson property
 General Techniques What one needs to know The negative side When lineability implies denselineability General results about spaceability An algebrability criterion Additivity and cardinal invariants: a brief account
 Bibliography Index
 Exercises, Notes, and Remarks appear at the end of each chapter.
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QA184.2 .A76 2016  Unknown 
 Providence, Rhode Island : American Mathematical Society, [2016]
 Description
 Book — ix, 297 pages : illustrations ; 26 cm.
 Summary

 * Ed Saff at three score and ten by D. S. Lubinsky* The tale of a formula by V. Totik* Logoptimal configurations on the sphere by P. D. Dragnev* Convergene of random continued fractions and random iterations of Mobius transformations by L. Lorentzen* Ratio asymptotics for multiple orthogonal polynomials by W. Van Assche* Study of a parametrization of the bivariate trigonometric moment problem by J. S. Geronimo and A. Pangia* Explicit formulas for the Riesz energy of the $N$th roots of unity by J. S. Brauchart* Asymptotic zero distribution of random polynomials spanned by general bases by I. E. Pritsker* On row sequences of Pade and HermitePade approximation by G. Lopez Lagomasino* Orthogonal expansions for generalized Gegenbauer weight function on the unit ball by Y. Xu* The MhaskarSaff variational principle and location of the shocks of certain hyperbolic equations by A. I. Aptekarev* Boundary estimates for Bergman polynomials in domains with corners by N. Stylianopoulos* Asymptotics of type I HermitePade polynomials for semiclassical functions by A. MartinezFinkelshtein, E. A. Rakhmanov, and S. P. Suetin* Sparse interpolation and rational approximation by A. Cuyt and W.S. Lee* Asymptotics of the Meijer $G$functions by Y. Lin and R. Wong* Transformations of polynomial ensembles by A. B. J. Kuijlaars* Local statistics of lattice points on the sphere by J. Bourgain, P. Sarnak, and Z. Rudnick* Conditioning moments of singular measures for entropy maximization II: Numerical examples by M. Budisic and M. Putinar.
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QA331 .M677 2016  Unknown 
 Cham : Birkhäuser, [2016]
 Description
 Book — viii, 314 pages : illustrations (some color) ; 25 cm.
 Summary

 Introduction. Todor Gramchev: GelfandShilov Spaces: Structural Properties and Applications to Pseudodifferential Operators in \R^n. Miroslav Englis: An Excursion into BerezinToeplitz Quantization and Related Topics. Andrew Comech: Global Attraction to Solitary Waves. Irina Markina: Geodesics in Geometry with Constraints and Applications.
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QC20.7 .A5 Q36 2016  Unknown 
13. Slice hyperholomorphic Schur analysis [2016]
 Alpay, Daniel, author.
 Cham : Birkhäuser, Springer International Publishing, [2016]
 Description
 Book — xii, 362 pages ; 25 cm.
 Summary

 Prologue
 Classical Schur analysis
 Preliminaries
 Some history
 Krein spaces, Pontryagin spaces, and negative squares
 The Wiener algebra
 The Nehari extension problem
 The CarathéodoryToeplitz extension problem
 Various classes of functions and realization theorems
 Rational functions
 Rational functions and minimal realizations
 Minimal factorization
 Rational functions Junitary on the imaginary line
 Rational functions Junitary on the unit circle
 Schur analysis
 The Schur algorithm
 Interpolation problems
 Firstorder discrete systems
 The Schur algorithm and reproducing kernel spaces
 Quaternionic analysis
 Finitedimensional Preliminaries
 Some preliminaries on quaternions
 Polynomials with quaternionic coefficients
 Matrices with quaternionic entries
 Matrix equations
 Quaternionic functional analysis
 Quaternionic locally convex linear spaces
 Quaternionic inner product spaces
 Quaternionic Hilbert spaces : main properties
 Partial majorants
 Majorant topologies and inner product spaces
 Quaternionic Hilbert spaces : weak topology
 Quaternionic Pontryagin spaces
 Quaternionic Krein spaces
 Positive definite functions and reproducing kernel quaternionic Hilbert spaces
 Negative squares and reproducing kernel quaternionic Pontryagin spaces
 Slice hyperholomorphic functions
 The scalar case
 The Hardy space of the unit ball
 Blaschke products (unit ball case)
 The Wiener algebra
 The Hardy space of the open halfspace
 Blaschke products (halfspace case)
 Operatorvalued slice hyperholomorphic functions
 Definition and main properties
 Sspectrum and Sresolvent operator
 Functional calculus
 Two results on slice hyperholomorphic extension
 Slice hyperholomorphic kernels
 The space H²H ̣(B) and slice backwardshift invariant subspaces
 Quaternionic schur analysis
 Reproducing kernel spaces and realizations
 Classes of functions
 The PotapovGinzburg transform
 Schur and generalized Schur functions of the ball
 Contractive multipliers, inner multipliers and BeurlingLax theorem
 A theorem on convergence of Schur multipliers
 The structure theorem
 Carathéodory and generalized Carathéodory functions
 Schur and generalized Schur functions of the halfspace
 Herglotz and generalized Herglotz functions
 Rational slice hyperholomorphic functions
 Definition and first properties
 Minimal realizations
 Realizations of unitary rational functions
 Rational slice hyperholomorphic functions
 Linear fractional transformation
 Backwardshift operators
 First applications : scalar interpolation and firstorder discrete systems
 The Schur algorithm
 A particular case
 The reproducing kernel method
 CarathéodoryFejér interpolation
 Boundary interpolation
 Firstorder discrete linear systems
 Discrete systems : the rational case
 Interpolation : operatorvalued Case
 Formulation of the interpolation problems
 The problem IP(H²H(B)) : the nondegenerate case
 Lefttangential interpolation in ... S(H₁, H₂, B)
 Interpolation in S(H₁, H₂, B) : the nondegenerate case
 Interpolation : the case of a finite number of interpolating conditions
 Leech's theorem
 Interpolation in S(H₁, H₂, B) : Nondegenerate case : Sufficiency
 Epilogue
 Bibliography
 Index
 Notation index.
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QA331.7 .A47 2016  Unknown 
14. Special functions and orthogonal polynomials [2016]
 Beals, Richard, 1938 author.
 Cambridge, United Kingdom : Cambridge University Press, 2016.
 Description
 Book — xiii, 473 pages : illustrations ; 24 cm.
 Summary

 1. Orientation
 2. Gamma, beta, zeta
 3. Secondorder differential equations
 4. Orthogonal polynomials on an interval
 5. The classical orthogonal polynomials
 6. Semiclassical orthogonal polynomials
 7. Asymptotics of orthogonal polynomials: two methods
 8. Confluent hypergeometric functions
 9. Cylinder functions
 10. Hypergeometric functions
 11. Spherical functions
 12. Generalized hypergeometric functions Gfunctions
 13. Asymptotics
 14. Elliptic functions
 15. Painleve transcendents Appendix A. Complex analysis Appendix B. Fourier analysis References Index.
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QA404.5 .B3227 2016  Unknown 
 Louck, James D., author.
 New Jersey : World Scientific, [2015]
 Description
 Book — xii, 179 pages : illustrations ; 26 cm
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QA427 .L68 2015  Unknown 
16. Bicomplex holomorphic functions : the algebra, geometry and analysis of bicomplex numbers [2015]
 LunaElizarrarás, Maria Elena author.
 Cham [Switzerland] : Birkhauser, [2015]
 Description
 Book — viii, 231 pages : color illustrations ; 25 cm.
 Summary

 Introduction. 1.The Bicomplex Numbers. 2.Algebraic Structures of the Set of Bicomplex Numbers. 3.Geometry and Trigonometric Representations of Bicomplex. 4.Lines and curves in BC. 5.Limits and Continuity. 6.Elementary Bicomplex Functions. 7.Bicomplex Derivability and Differentiability. 8.Some properties of bicomplex holomorphic functions. 9.Second order complex and hyperbolic differential operators. 10.Sequences and series of bicomplex functions. 11.Integral formulas and theorems. Bibliography.
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QA331.7 .B85 2015  Unknown 
17. Fourier analysis and Hausdorff dimension [2015]
 Mattila, Pertti.
 Cambridge, UK : Cambridge University Press, 2015.
 Description
 Book — xiv, 440 p. : ill. ; 24 cm.
 Summary

 Preface Acknowledgements
 1. Introduction
 2. Measure theoretic preliminaries
 3. Fourier transforms
 4. Hausdorff dimension of projections and distance sets
 5. Exceptional projections and Sobolev dimension
 6. Slices of measures and intersections with planes
 7. Intersections of general sets and measures
 8. Cantor measures
 9. Bernoulli convolutions
 10. Projections of the fourcorner Cantor set
 11. Besicovitch sets
 12. Brownian motion
 13. Riesz products
 14. Oscillatory integrals (stationary phase) and surface measures
 15. Spherical averages and distance sets
 16. Proof of the WolffErdogan Theorem
 17. Sobolev spaces, Schrodinger equation and spherical averages
 18. Generalized projections of Peres and Schlag
 19. Restriction problems
 20. Stationary phase and restriction
 21. Fourier multipliers
 22. Kakeya problems
 23. Dimension of Besicovitch sets and Kakeya maximal inequalities
 24. (n, k) Besicovitch sets
 25. Bilinear restriction References List of basic notation Author index Subject index.
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QA403.5 .M385 2015  Unknown 
 Taheri, Ali, author.
 First edition.  Oxford : Oxford University Press, 2015.
 Description
 Book — 2 volumes (xv, 963 pages) : illustrations ; 25 cm.
 Summary

 1. Harmonic Functions and the MeanValue Property
 2. Poisson Kernels and Green's Representation Formula
 3. AbelPoisson and Fejer Means of Fourier Series
 4. Convergence of Fourier Series: Dini vs. DirichletJordon
 5. HarmonicHardy Spaces hp(D)
 6. Interpolation Theorems of Marcinkiewicz and RieszThorin
 7. The Hilbert Transform on Lp(T) and Riesz's Theorem
 8. HarmonicHardy Spaces hp(Bn)
 9. Convolution Semigroups The Poisson and Heat Kernels on Rn
 10. Perron's Method of SubHarmonic Functions
 11. From AbelPoisson to BochnerRiesz Summability
 12. Fourier Transform on S0(Rn) The HilbertSobolev spaces Hs(Rn).
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 13. Maximal Function Bounding Averages and Pointwise Convergence
 14. HarmonicHardy Spaces hp(H)
 15. Sobolev Spaces A Resolution of the Dirichlet Principle
 16. Singular Integral Operators and VectorValued Inequalities
 17. LittlewoodPaley Theory, LpMultipliers and Function Spaces
 18. Morrey and Campanato vs. Hardy and JohnNirenberg Spaces
 19. Layered Potentials, Jump Relations and Existence Theorems
 20. Second Order Equations in Divergence Form: Continuous Coefficients
 21. Second Order Equations in Divergence Form: Measurable Coefficients
 A. Partition of Unity
 B. Total Boundedness and Compact Subsets of Lp
 C. Gamma and Beta Functions
 D. Volume of the Unit nBall
 E. Integrals Related to Abel and Gauss Kernels
 F. Hausdorff Measures Hs
 G. Evaluation of Some Integrals Over
 H. Sobolev Spaces.
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QA377 .T25 2015 V.1  Unknown 
QA377 .T25 2015 V.2  Unknown 
 Conference on Function Spaces (7th : 2014 : Southern Illinois University at Edwardsville)
 Providence, Rhode Island : American Mathematical Society, [2015]
 Description
 Book — vii, 301 pages ; 26 cm.
 Summary

 On algebraic properties of the spectrum and spectral radius of elements in a unital algebra by M. Abel Automatic continuity of surjective homomorphisms between topological algebras by M. Abel Characterization of holomorphic and meromorphic functions via maximum principles by J. T. Anderson Hermitian operators on $\mathbf{H}^p_\mathcal{H}(\triangle^n)$ by F. Botelho and J. Jamison Some notions of transitivity for operator spaces by J. A. ChavezDominguez and T. Oikhberg Removability of exceptional sets for differentiable and Lipschitz functions by J. Craig, J. F. Feinstein, and P. Patrick Generalizing trigonometric functions from different points of view by D. E. Edmunds and J. Lang Partial $W^*$dynamical systems and their dilations by G. O. S. Ekhaguere Swiss cheeses and their applications by J. F. Feinstein, S. Morley, and H. Yang Isometries on the special unitary group by O. Hatori Amenability as a hereditary property in some algebras of vectorvalued functions by T. Hoim and D. A. Robbins Weighted norm inequalities for Hardy type operators on monotone functions by P. Jain, M. Singh, and A. P. Singh Norms on normal function algebras by K. Jarosz Maximally modulated singular integral operators and their applications to pseudodifferential operators on Banach function spaces by A. Yu. Karlovich Smoothness to the boundary of biholomorphic mappings: An overview by S. G. Krantz A multiplicative BanachStone theorem by K. Lee Weighted composition operators on weighted sequence spaces by D. M. Luan and L. H. Khoi Spectral isometries into commutative Banach algebras by M. Mathieu and M. Young Eigenvalues and eigenfunctions of the $p(\cdot)$Laplacian. A convergence analysis by O. Mendez Surjective isometries between function spaces by T. Miura Endomorphisms and the Silov representation by D. C. Moore The essential norm of operators on the Bergman space of vectorvalued functions on the unit ball by R. Rahm and B. D. Wick Trigonometric approximation of periodic functions belonging to weighted Lipschitz class $W(L^p, \Psi(t), \beta)$ by S. K. Srivastava and U. Singh Analytic structure of polynomial hulls by J. Wermer.
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QA323 .C66 2014  Unknown 
20. Handbook of enumerative combinatorics [2015]
 Boca Raton, FL : CRC Press, [2015]
 Description
 Book — xxiii, 1061 pages : illustrations ; 25 cm.
 Summary

 METHODS Algebraic and Geometric Methods in Enumerative Combinatorics Introduction What is a Good Answer? Generating Functions Linear Algebra Methods Posets Polytopes Hyperplane Arrangements Matroids Acknowledgments Analytic Methods Helmut Prodinger Introduction Combinatorial Constructions and Associated Ordinary Generating Functions Combinatorial Constructions and Associated Exponential Generating Functions Partitions and QSeries Some Applications of the Adding a Slice Technique Lagrange Inversion Formula Lattice Path Enumeration: The Continued Fraction Theorem Lattice Path Enumeration: The Kernel Method Gamma and Zeta Function Harmonic Numbers and Their Generating Functions Approximation of Binomial Coefficients Mellin Transform and Asymptotics of Harmonic Sums The MellinPerron Formula MellinPerron Formula: DivideandConquer Recursions Rice's Method Approximate Counting Singularity Analysis of Generating Functions Longest Runs in Words Inversions in Permutations and Pumping Moments Tree Function The Saddle Point Method Hwang's QuasiPower Theorem TOPICS Asymptotic Normality in Enumeration E. Rodney Canfield The Normal Distribution Method
 1: Direct Approach Method
 2: Negative Roots Method
 3: Moments Method
 4: Singularity Analysis Local Limit Theorems Multivariate Asymptotic Normality Normality in Service to Approximate Enumeration Trees Michael Drmota Introduction Basic Notions Generating Functions Unlabeled Trees Labeled Trees Selected Topics on Trees Planar maps Gilles Schaeffer What is a Map? Counting TreeRooted Maps Counting Planar Maps Beyond Planar Maps, an Even Shorter Account Graph Enumeration Marc Noy Introduction Graph Decompositions Connected Graphs with Given Excess Regular Graphs Monotone and Hereditary Classes Planar Graphs Graphs on Surfaces and Graph Minors Digraphs Unlabelled Graphs Unimodality, LogConcavity, RealRootedness and Beyond Petter Branden Introduction Probabilistic Consequences of RealRootedness Unimodality and GNonnegativity LogConcavity and Matroids Infinite LogConcavity The NeggersStanley Conjecture Preserving RealRootedness Common Interleavers Multivariate Techniques Historical Notes Words Dominique Perrin and Antonio Restivo Introduction Preliminaries Conjugacy Lyndon words Eulerian Graphs and De Bruijn Cycles Unavoidable Sets The BurrowsWheeler Transform The GesselReutenauer Bijection Suffix Arrays Tilings James Propp Introduction and Overview The Transfer Matrix Method Other Determinant Methods RepresentationTheoretic Methods Other Combinatorial Methods Related Topics, and an Attempt at History Some Emergent Themes Software Frontiers Lattice Path Enumeration Christian Krattenthaler Introduction Lattice Paths Without Restrictions Linear Boundaries of Slope
 1 Simple Paths with Linear Boundaries of Rational Slope, I Simple Paths with Linear Boundaries with Rational Slope, II Simple Paths with a Piecewise Linear Boundary Simple Paths with General Boundaries Elementary Results on Motzkin and Schroder Paths A continued Fraction for the Weighted Counting of Motzkin Paths Lattice Paths and Orthogonal Polynomials Motzkin Paths in a Strip Further Results for Lattice Paths in the Plane NonIntersecting Lattice Paths Lattice Paths and Their Turns Multidimensional Lattice Paths Multidimensional Lattice Paths Bounded by a Hyperplane Multidimensional Paths With a General Boundary The Reflection Principle in Full Generality QCounting Of Lattice Paths and RogersRamanujan Identities SelfAvoiding Walks Catalan Paths and q tenumeration James Haglund Introduction to qAnalogues and Catalan Numbers The q tCatalan Numbers Parking Functions and the Hilbert Series The q tSchroder Polynomial Rational Catalan Combinatorics Permutation Classes Vincent Vatter Introduction Growth Rates of Principal Classes Notions of Structure The Set of All Growth Rates Parking Functions Catherine H. Yan Introduction Parking Functions and Labeled Trees Many Faces of Parking Functions Generalized Parking Functions Parking Functions Associated with Graphs Final Remarks Standard Young Tableaux Ron Adin and Yuval Roichman Introduction Preliminaries Formulas for Thin Shapes Jeu de taquin and the RS Correspondence Formulas for Classical Shapes More Proofs of the Hook Length Formula Formulas for Skew Strips Truncated and Other NonClassical Shapes Rim Hook and Domino Tableaux qEnumeration Counting Reduced Words
 Appendix 1: Representation Theoretic Aspects
 Appendix 2: Asymptotics and Probabilistic Aspects Computer Algebra Manuel Kauers Introduction Computer Algebra Essentials Counting Algorithms Symbolic Summation The GuessandProve Paradigm Index.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Reference  
QA164 .H36 2015  Inlibrary use 
Stacks  
QA164 .H36 2015  Unknown 