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