New Library Books for Mathematical Sciences

Note: This list is xml-scanned from http://www.dur.ac.uk/reading.list/newitems.php?dept=MATH. It is probably incomplete and items may be missing (forever) if my script crashes. Yes, it would be nice to have the author's name, but this takes more work -- talk to me (DW) if you are interested to help.

2013-03
31 Invitation to discrete mathematics
31 Linear analysis
2013-04
15 Modern Fourier analysis
15 Many particle physics
22 Classical Fourier analysis
23 Concentration inequalities
23 Mathematics of evolution and phylogeny
23 Computational biology of the heart
30 Graphs, colourings, and the four-colour theorem
30 Stochastic integration theory/
2013-05
08 Green's functions and boundary value problems
08 Functional analysis, Sobolev spaces and partial differential equations
08 Geometric combinatorics
14 Principles and techniques of applied mathematics
14 Methods of applied mathematics
14 Mathematical handbook for scientists and engineers
14 An epsilon of room.
14 Approximation theory and approximation practice
14 Interpolation of operators
14 Real analysis
14 Higher order fourier analysis
14 Linear programming and network flows
14 Journey from the center of the sun
14 Equations of mathematical physics
14 A collection of problems in mathematical physics
14 Hydrodynamic fluctuations, broken symmetry, and correlation functions
14 Introduction to classical integrable systems
21 Combinatorics of train tracks
21 Numerical analysis
21 Classic problems of probability
21 The functions of mathematical physics
21 The practitioner's shell model
2013-06
04 Introduction to coding theory
04 Varieties of representations of finitely generated groups
04 Zeta functions in algebra and geometry
04 Introduction to quantum mechanics
18 The geometry of numbers
18 Einstein gravity in a nutshell
25 Synchronization
25 The mathematics of arbitrage
25 Real mathematical analysis
25 Gian-Carlo Rota on analysis and probability
25 An introduction to delay differential equations with applications to the life sciences
25 Applied delay differential equations
25 Basic concepts of string theory
2013-07
03 Modular invariant theory
09 Lectures on surfaces
16 Synchronization
16 Compactness and contradiction
16 Functional equations and inequalities
16 An introduction to Markov processes
16 Statistics for high-dimensional data
23 Random iterative models
23 Financial modeling under non-Gaussian distributions
23 Knowing the odds
23 Programming for mathematicians
2013-08
28 Relativity made relatively easy
28 Success probability estimation with applications to clinical trials
2013-09
03 Nonlinear differential equations of monotone types in Banach spaces
03 Advanced General Relativity
24 Geometric methods in the elastic theory of membranes in liquid crystal phases
2013-10
22 Combinatorics
22 A first course in probability and Markov chains
2013-11
05 Babylonian mathematical astronomy
12 Linear algebra
12 Stochastic geometry and its applications
19 Stochastic analysis on manifolds
19 The R student companion
26 Spatial tessellations
26 Non-life insurance pricing with generalized linear models
26 Markov chains and stochastic stability
2013-12
03 Statistical modeling
03 Electric power distribution reliability
10 Love and math
19 Elementary number theory
19 Theory of degrees, with applications to bifurcations and differential equations
19 Linear and quasi-linear evolution equations in Hilbert spaces
19 Assessment of power system reliability
2014-03
26 Inequalities in analysis and probability
26 A practical guide to pseudospectral methods
26 Discrete and combinatorial mathematics
26 Examples in Markov decision processes
26 A kinetic view of statistical physics
2014-04
02 Yangians and classical lie algebras
02 Modular forms
02 Elementary Dirichlet series and modular forms
02 Random walk in random and non-random environments
02 Mathematical statistics
02 Computer-assisted analysis of mixtures and applications
08 Complexity science
08 Fourier Integral Operators
08 Problems in probability
15 A primer on mathematical models in biology
23 Spectral methods
23 Navier-Stokes equations in planar domains
29 Degenerate diffusion operators arising in population biology
2014-05
07 Lectures on buildings
07 Lecture notes on cluster algebras
07 Change of time and change of measure
07 Random fields
13 Randomization, bootstrap, and Monte Carlo methods in biology
20 Stochastic networks
20 Matrix analysis
20 A basic course in measure and probability
20 Invitation to ergodic theory
20 Introduction to stochastic calculus with applications
20 The theory of probability
20 Classical mechanics with calculus of variations, and optimal control
20 Classical solutions in quantum field theory
28 Combinatorics of coxeter groups
28 Geometries
28 Introduction to imprecise probabilities
28 Lévy processes and infinitely divisible distributions
28 Fluctuations of Levy processes with applications
28 Upper and lower bounds for stochastic processes
28 Understanding Markov chains
2014-06
03 Computable functions
03 Computability theory
03 Lectures on fractal geometry and dynamical systems
03 Differential equations, mechanics, and computation
03 Mostly surfaces
03 Probability theory
03 Probability and statistical physics in two and more dimensions
03 Random perturbations of dynamical systems
03 Lower previsions
03 Stochastic tools in mathematics and science
03 Brownian dynamics at boundaries and interfaces
03 An introduction to heavy-tailed and subexponential distributions
10 Handbook of computer aided geometric design
10 How to teach mathematics
10 Lectures on polytopes
10 Convex polytopes
10 Analysis for diffusion processes on Riemannian manifolds
10 The Bayesian choice
17 Stochastic calculus for finance
17 Measure Theory
17 Quasi-stationary distributions
17 Uniform central limit theorems
17 Scattering amplitudes in gauge theories
25 Statistical analysis of financial data in R
25 Mathematics for finance
25 Markov Decision Processes with Applications to Finance
25 Problem-solving strategies
25 Discrete mathematics
25 The Erdös distance problem
25 Primality testing for beginners
25 The joy of factoring
25 A guide to the classification theorem for compact surfaces
25 Finite volume methods for hyperbolic problems
25 Measure Theory and Probability Theory
25 Convex and discrete geometry
25 Handbook of convex geometry
25 Boundary conformal field theory and the worldsheet approach to D-branes
25 Analytical mechanics
2014-07
13 Filtering and prediction
15 Mathematics of the 19th century
23 Normal approximation by Stein's method
2014-08
05 Ecole d'été de probabilités de Saint-Flour XIX - 1989
19 Portfolio theory and risk management
2014-09
23 Asymptopia
2014-11
11 An introduction to black holes, information and the string theory revolution
2014-12
03 Invariant theory
03 Linear functional analysis
03 Combinatorial optimization
09 Random graphs
09 Dynamics of cancer
16 Taming the forces between quarks and gluons
2015-01
06 Séminaire de probabilités XVIII, 1982/83
06 Elliptic genera and vertex operator super-algebras
06 The symmetries of things
06 Perplexing problems in probability
06 Excursions of Markov Processes
06 Computational ecology
06 Computational biology of cancer
13 Image processing using pulse-coupled neural networks
13 Problems and snapshots from the world of probability
20 Delaunay meshing of surfaces and volumes
20 Voronoi diagrams and Delaunay triangulations
20 Introduction to probability
20 Probability tales
20 Topics in percolative and disordered systems
27 Séminaire de probabilités XXI
27 Continuous strong Markov processes in dimension one
27 Degenerate diffusions
27 Plane Euclidean geometry
27 Surveys in stochastic processes
27 Chemical kinetics, stochastic processes, and irreversible thermodynamics
2015-02
03 Computational systems biology of cancer
03 My life and functions
03 Excessive measures
03 Controlled diffusion processes
03 The art of progressive censoring
10 Infinite dimensional analysis
10 Lectures on differential geometry
10 Diffusion processes and stochastic calculus
10 Topics in disordered systems
10 General relativity, cosmology and astrophysics
17 Some aspects of Brownian motion.
17 The Bethe wavefunction
24 Riemann Surfaces:
2015-03
03 Reflections on the teaching of programming
10 Complex analysis 2
10 Discrete stochastic processes
10 Relativity and gravitation
10 Algorithms in structural molecular biology
17 Networks
17 Numbers
17 Symmetry
17 Introduction to general relativity, black holes and cosmology
17 Introduction to modern dynamics
31 Complexity
31 50 visions of mathematics
31 The story of collapsing stars
2015-04
09 The surprising mathematics of longest increasing subsequences
09 Toric varieties
09 Noise sensitivity of boolean functions and percolation
09 Statistical thermodynamics
16 Lebesgue integration on Euclidean space
16 Algorithmic Probability
16 Drawing theories apart
28 Spectral Graph Theory
28 Einführung in die Geometrie und Topologie
28 Elements of applied probability
28 Topics in probability
28 Inevitable randomness in discrete mathematics
2015-05
06 Dynamics on and of complex networks
06 Higher arithmetic
06 Multiple time scale dynamics
06 Real analysis
06 Applied probability
06 Basic probability theory with applications
06 Elements of stochastic modelling
06 Stochastic processes
12 Discrete mathematics
12 Dynamics on and of complex networks.
12 Graph theory
12 A modern introduction to probability and statistics
12 The craft of probabilistic modelling
12 Applied stochastic processes
12 Quickest detection
19 Introduction to classical geometries
27 Simulation
2015-06
02 Problem-solving strategies in mathematics
02 The traveling salesman problem
02 Abstract algebra
02 Modern aspects of random matrix theory
02 Analysis I
02 Analysis II
02 Analysis and probability
02 Mathematics of probability
02 Stochastic analysis and diffusion processes
02 Analysis of stochastic partial differential equations
02 Markov decision processes
02 Physics of long-range interacting systems
02 Quantitative seismology
16 Tipping points
16 In pursuit of the traveling salesman
16 Combinatorics of permutations
16 Vertex algebras and algebraic curves
16 A history of analysis
16 Fourier analysis
16 Fourier Series
16 Fourier Series
16 Lebesgue's theory of integration
16 Probability
16 Probability
16 Probability theory
16 Probabilistic forecasting and Bayesian data assimilation
16 Foundations of probability
16 Problems in probability
16 Gaussian free field and conformal field theory
16 Basics of Applied Stochastic Processes
16 Limit theorems for stochastic processes
16 Sequential analysis
16 The traveling salesman problem and its variations
16 Voter model perturbations and reaction diffusion equations
16 Encyclopedia of analytical surfaces
26 Security and game theory
26 A wealth of numbers
26 Simplicity theory
26 Problems from the discrete to the continuous
26 Orthogonal families and semigroups in analysis and probability
26 Geometry.
26 Klassische Differentialgeometrie
26 Markov processes, Brownian motion, and time symmetry
26 Self-similar processes and their applications
26 The statistical mechanics of interacting walks, polygons, animals and vesicles
30 Singular phenomena and scaling in mathematical models
2015-07
07 Introduction to scientific programming and simulation with R
14 Using R for introductory statistics
28 A beginner's guide to discrete mathematics
28 A first course in discrete mathematics
28 Probability models
28 Python pocket reference
2015-08
04 Lectures on convex sets
04 Models of life
04 Expect the Unexpected
18 Partial differential equations
25 A student's guide to Maxwell's equations
2015-09
15 Theorie der Kongruenzen
15 Univariate discrete distributions
15 How capitalism was built
22 Monte Carlo simulation with applications to finance
22 Partial differential equations
22 Stochastic networks
22 Lagrangian and Hamiltonian mechanics
29 Continuous univariate distributions
29 Discrete multivariate distributions
2015-10
06 Single digits
06 Analysis on Fock spaces
06 Explorations in Monte Carlo methods
06 Stochastic processes with applications to finance
13 Continuous multivariate distributions.
20 Monte Carlo strategies in scientific computing
20 Stability problems for stochastic models
27 Multivariate generalized linear mixed models using R
27 Extremum problems for eigenvalues of elliptic operators
2015-11
03 Introduction to nonlinear dispersive equations
10 Geometrisation of 3-manifolds
10 Multiple comparisons using R
17 Lectures on algebraic categorification
17 Numerical methods in matrix computations
17 Lectures on empirical processes
17 Flexible imputation of missing data
24 3-manifold groups
24 Statistical inference
2015-12
08 Basic algebra
2016-01
05 Ruin probabilities
05 Building proofs
05 Accelerated testing
12 Handbook of the normal distribution
19 An introduction to statistical computing
26 The grant writer's handbook
2016-02
16 Numerical methods and optimization
23 Lipman Bers, a life in mathematics
23 The first six books of the Elements of Euclid
23 Applied stochastic processes
23 Importance measures in reliability, risk, and optimization
2016-03
01 Lattices and codes
01 An introduction to the theory of numbers
01 Elementary applied topology
01 Some aspects of Brownian motion.
15 The Cambridge dictionary of probability and its applications
15 Introduction to Bartlett correction and bias reduction
15 Lectures on stochastic programming
2016-04
07 Roots to research
12 Handbook of linear partial differential equations for engineers and scientists
12 Probability theory
19 An introduction to the theory of probability
2016-05
10 The geometry of the octonions
17 ADEX theory
2016-06
09 Sequential analysis
14 Lévy processes and stochastic calculus
14 Elements of phase transitions and critical phenomena
14 Geometric modeling and mesh generation from scanned images
2016-07
13 Introduction to information retrieval
13 Introduction to random graphs
13 Making transcendence transparent
13 Harmonic mappings in the plane
13 Semi-Lagrangian approximation schemes for linear and Hamilton-Jacobi equations
13 Fokker-Planck-Kolmogorov equations
13 An outline of ergodic theory
13 Concentration inequalities for sums and martingales
13 Normal approximation and asymptotic expansions
13 A basic course on probablity theory
13 Introduction to probability and stochastic processes with applications
13 Stochastic processes and orthogonal polynomials
13 Trends in stochastic analysis
13 Poisson point processes and their application to Markov processes
13 Handbook of Markov chain Monte Carlo
13 Elements of random walk and diffusion processes
13 Applied statistics
13 Nonequilibrium statistical physics
13 From Brownian motion to Schrödinger's Equation
13 Introduction to the AdS/CFT correspondence
13 Probability and statistical physics in St. Petersburg
13 Statistical models in epidemiology
13 Topological signal processing
21 A basic course in partial differential equations
21 An informal introduction to stochastic calculus with applications
21 Aspects of Brownian motion
2016-08
02 Mathematics in everyday life
02 Group theory in a nutshell for physicists
2016-09
01 Probability and statistics
20 Ordinary differential equations
20 Coupling, stationarity, and regeneration
2016-10
04 Visualizing mathematics with 3D printing
11 Surfaces in classical geometries
11 Fashion, faith and fantasy in the new physics of the universe
11 Spare parts inventory control under system availability constraints
18 Polynomial methods in combinatorics
18 A course in algebra
22 Neoclassical theory of electromagnetic interactions
2016-11
29 Probability through algebra
29 A course on large deviations with an introduction to Gibbs measures
2016-12
06 Topics in occupation times and Gaussian free fields
13 Geometry of continued fractions
13 Stochastic-process limits
21 Quantile regression
2017-01
05 Stable convergence and stable limit theorems
10 Introduction to linear algebra
25 Simulation and the Monte Carlo method.
2017-02
07 Lecture notes on mean curvature flow
14 An introduction to non-Abelian class field theory
14 Fermat's last theorem
14 The geometric and arithmetic volume of Shimura varieties of orthogonal type
14 Extending R
14 Advanced R
21 Lectures on the Riemann zeta function
21 Multiple zeta functions, multiple polylogarithms, and their special values
21 An introduction to the representation theory of groups
28 Emil Artin and beyond
28 Graphs, algorithms, and optimization
28 Gibbs measures on Cayley trees
2017-03
07 Measure and integration
07 A history of the central limit theorem
14 A brief history of mathematical thought
14 The life and times of the central limit theorem
22 An introduction to probability and stochastic processes
28 Probability theory
28 Probability for applications
2017-04
04 Inequalities in analysis and probability
04 Introduction to stochastic processes with R
04 Fundamentals of biostatistics
04 Designing clinical research
04 Multivariate characteristic and correlation functions
04 Selected topics in characteristic functions
11 The tools of mathematical reasoning
11 The probabilistic method
11 Combinatorics and random matrix theory
11 Riemann Surfaces and Algebraic Curves
11 A basic course in probability theory
11 Probability and stochastic processes
11 Stochastic modeling
20 Beyond infinity
25 Probability on algebraic and geometric structures
25 Linear algebra in action
25 Elements of distribution theory
25 An introduction to stochastic differential equations
2017-05
03 Dynamical systems on networks
10 Optimal control and viscosity solutions of Hamilton-Jacobi-Bellman equations
10 Lecture on probability theory and statistics
2017-06
06 Integral geometry from Buffon to geometers of today
16 Algebra I
16 Algebra II
20 Dynamic linear models with
27 The porous medium equation
2017-07
11 Basic discrete mathematics
18 Data assimilation
18 Optimal transport methods in economics
18 A primer on mapping class groups
2017-08
01 A concise introduction to numerical analysis
21 Introduction to the theory of random processes
23 Adversarial risk analysis
2017-09
05 Robustness and complex data structures
12 Analytic combinatorics in several variables
12 Bayesian data analysis
19 Large deviations
19 Shape theory
26 L functions for the orthogonal group
2017-11
14 A student's guide to Python for physical modeling
14 Modern theory of summation of random variables
28 One-dimensional stable distributions
28 Uniform limit theorems for sums of independent random variables
2017-12
05 Introduction to experimental mathematics
05 Convexity and its applications
13 Limit theorems of probability theory
2018-01
16 Introduction to computation and programming using Python
16 The complete guide to capital markets for quantitative professionals
16 Metric measure geometry
16 Hidden markov models for time series
16 The Poisson-Dirichlet distribution and related topics
23 An introduction to Catalan numbers
23 Catalan numbers
23 A concrete approach to classical analysis
23 Limit distributions for sums of independent random vectors
23 The methods of distances in the theory of probability and statistics
23 Lattice path counting and applications
23 The physics of foraging
23 Martingales and Markov chains
2018-02
06 Semilinear elliptic equations for beginners
06 Elliptic curves
06 The Borel-Cantelli Lemma
13 Randomized response and indirect questioning techniques in surveys
13 A course in the theory of stochastic processes
20 The practice of programming
20 The Go programming language
20 Elicitation
27 Stochastic approximation
2018-03
06 An introduction to analysis
06 Real and functional analysis
06 Measure and integration
06 Lectures in functional analysis and operator theory
06 Introduction to probability
06 Stochastic approximation and recursive algorithms and applications
06 Lectures on the Poisson process
13 Linear algebra, Markov chains, and queueing models
20 Introduction to uncertainty quantification
20 Introduction to Markov chains
20 Elements of queueing theory
27 Fractals in probability and analysis
27 Long-range dependence and self-similarity
27 An introduction to quiver representations
27 From groups to geometry and back
27 Exploring the Riemann Zeta function
2018-04
11 Algebraic groups
11 Uncertainty quantification
17 The three-dimensional Navier-Stokes equations
17 Stochastic systems
2018-05
09 Geophysical fluid dynamics
2018-06
05 Mathematical illustrations
12 Atmospheric and oceanic fluid dynamics
19 Lectures on the nearest neighbor method
19 Complex graphs and networks
19 The traveling salesman
19 Spanning trees and optimization problems
19 Stochastic processes in physics and chemistry
27 Galois theory through exercises
27 Convergence of stochastic processes
27 Semi-Markov chains and hidden semi-Markov models toward applications
27 Renewal processes
2018-07
03 Branching process models of cancer
03 Homogenisation
10 The mathematics of elections and voting
10 Quiver representations
10 Discrete harmonic analysis
17 Kernel methods and machine learning
17 Foundations of combinatorics with applications
31 Phase transitions in machine learning
31 The general theory of homogenization
31 The universe of conics
2018-08
07 LATIN 2002
23 Handbook of graphs and networks
23 Geometric group theory
2018-10
16 The geometry, topology, and physics of moduli spaces of Higgs bundles
16 Categorical data analysis
2018-11
20 Partial differential equations
20 Markov processes, Feller semigroups and evolution equations
20 Likelihood methods in statistics
20 Beyond weird
2018-12
12 Probability
18 Dilemmas of wonderland
18 50 years of first-passage percolation
2019-01
03 Random growth models
08 Celebrating the 50th anniversary of the Journal of differential geometry
15 Markov chains and mixing times
22 Séminaire de probabilités XVII, 1981/82
22 Theory of functions of a complex variable
22 Random discrete structures
22 Warranty cost analysis
29 Weak convergence of measures
29 Introduction to the practice of statistics
29 Magnetohydrodynamics in binary stars
29 An introduction to theoretical fluid mechanics
29 Fluid mechanics
2019-02
12 R Markdown
12 Neural smithing
19 An introduction to mathematical billiards
26 Advanced lectures on machine learning
26 Transformation of measure on wiener space
26 A course in convexity
2019-03
05 Random matrices and iterated random functions
05 Probability inequalities
05 Harmonic analysis on semigroups
05 Elements of functional analysis
05 Convexity and concentration
05 Fundamentals of probability
05 Stochastic processes
05 Essentials of Brownian motion and diffusion
05 Semigroups, boundary value problems and markov processes
05 Dynamic random walks
05 Progress in high-dimensional percolation and random graphs
12 Séminaire de probabilités XXXIV
12 Flavors of geometry
12 Stochastic analysis
12 Random series and stochastic integrals
12 Bonferroni-type inequalities with applications
12 Random walks in the quarter plane
12 Selected works of C.C. Heyde
12 The statistical analysis of categorical data
19 Topologies on closed and closed convex sets
19 Analysis meets geometry
19 Random measures, theory and applications
19 Theory of random sets
19 Elements of stochastic calculus and analysis
19 Discrete stochastic processes and applications
19 Stochastic processes
19 Wiener chaos
19 An introduction to stochastic processes and their applications
19 Accelerated life models
19 Geostatistical simulation
26 Westminster's world
26 An introduction to random sets
26 Modern general relativity
2019-04
02 The frailty model
02 A student's guide to general relativity
10 Markov decision processes in artificial intelligence
10 Secondary cohomology operations
10 Sequential stochastic optimization
10 Bordism, stable homotopy, and Adams spectral sequences
17 Non-local partial differential equations for engineering and biology
24 Degree 16 standard L-function of GSp(2) x GSp(2)
24 Monte Carlo statistical methods
30 Analysis of step-stress models
2019-05
08 Stability and oscillations in delay differential equations of population dynamics
22 Mathematical aspects of multi-porosity continua
2019-06
04 Fluent Python
04 From complex to simple
11 Geometric and topological aspects of coxeter groups and buildings
11 Stochastic integration by parts and functional itô calculus
18 Riccati differential equations
2019-07
02 Advanced topics in random matrices
02 Dimer models and random tilings
20 Topology and physics
30 Transport and mixing in geophysical flows
2019-09
24 The theory of cubature formulas
24 Missing data in longitudinal studies
24 Amplitude modulation atomic force microscopy