Complete CSIR-UGC NET Mathematical Sciences preparation, split across the four official units. Each unit is a separate course with chapter-wise notes, quizzes (each unlocks after 100% on the previous), and a full-length section-style mock.

CSIR-MATH-U4 — Probability, Statistics, Linear Models, and Operations Research

CSIR-MATH-U4 — Probability, Statistics, Linear Models, and Operations Research

CSIR-NET Unit 4: Probability theory, statistical inference, regression and linear models, multivariate methods, sampling theory, design of experiments, and operations research (LPP, queues, reliability).

📋 Course Learning Outcomes

On successful completion of this course, the learner will be able to:

  1. Apply axiomatic probability and Bayes' theorem to compute event probabilities [Apply]
  2. Analyze standard discrete and continuous distributions; compute moments and MGFs [Analyze]
  3. Apply CLT and laws of large numbers to derive asymptotic distributions [Apply]
  4. Construct MLE / MoM estimators and verify properties (unbiased, consistent, efficient) [Create]
  5. Evaluate hypotheses using NP lemma, likelihood-ratio, and chi-square tests [Evaluate]
  6. Solve LP problems via simplex/duality; analyze queues and reliability systems [Apply]

📚 Chapters

  1. Probability Fundamentals & Bayes
  2. Random Variables & Distributions
  3. Expectation, Moments & Generating Functions
  4. Inequalities, LLN, CLT & Convergence
  5. Markov Chains
  6. Sampling Distributions & Order Statistics
  7. Estimation Theory — Properties & Methods
  8. Hypothesis Testing — MP, UMP, LRT
  9. Nonparametric Tests, Chi-square & Bayesian Methods
  10. Linear Models, Gauss–Markov & ANOVA
  11. Regression — Linear, Logistic, Diagnostics
  12. Multivariate Methods — MVN, PCA, Discriminant
  13. Sampling Theory & Design of Experiments
  14. Operations Research — LPP, Queues, Reliability

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CSIR-MATH-U3 — ODE, PDE, Numerical Analysis, Calculus of Variations

CSIR-MATH-U3 — ODE, PDE, Numerical Analysis, Calculus of Variations

CSIR-NET Unit 3: Ordinary and Partial Differential Equations, Numerical Analysis, Calculus of Variations, Linear Integral Equations, and Classical Mechanics (Lagrangian and Hamiltonian formulations).

📋 Course Learning Outcomes

On successful completion of this course, the learner will be able to:

  1. Apply Picard's existence-uniqueness theorem to verify well-posedness of IVPs [Apply]
  2. Solve linear ODEs of higher order using variation of parameters and Green's functions [Apply]
  3. Classify second-order PDEs and solve via separation of variables [Analyze]
  4. Apply iterative methods (Newton, Gauss-Seidel, RK) with error analysis [Apply]
  5. Solve Euler-Lagrange equations and standard variational problems [Apply]
  6. Evaluate Fredholm and Volterra integral equations using resolvent kernels [Evaluate]

📚 Chapters

  1. First-order ODEs — Existence, Uniqueness
  2. Linear ODEs & Variation of Parameters
  3. Sturm–Liouville Problems & Green's Function
  4. First-order PDEs — Lagrange & Charpit
  5. Classification of Second-order PDEs
  6. Separation of Variables — Heat, Wave, Laplace
  7. Roots of Equations — Iteration & Newton
  8. Linear Systems — Gauss & Gauss–Seidel
  9. Interpolation — Lagrange, Hermite, Splines
  10. Numerical Differentiation & Integration
  11. Numerical ODEs — Picard, Euler, RK
  12. Calculus of Variations — Euler–Lagrange
  13. Linear Integral Equations — Fredholm & Volterra
  14. Classical Mechanics — Lagrangian & Hamiltonian

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CSIR-MATH-U2 — Complex Analysis, Algebra, and Topology

CSIR-MATH-U2 — Complex Analysis, Algebra, and Topology

CSIR-NET Unit 2: Complex Analysis (analytic functions, contour integration, residues, conformal maps), Abstract Algebra (groups, Sylow, rings, fields, Galois theory), Combinatorics & Number Theory, and General Topology.

📋 Course Learning Outcomes

On successful completion of this course, the learner will be able to:

  1. Apply Cauchy-Riemann equations to identify analytic functions and harmonic conjugates [Apply]
  2. Evaluate contour integrals using Cauchy's theorem, integral formula, and residues [Evaluate]
  3. Analyze ring structure (PID/UFD/ED) and field extensions including Galois groups [Analyze]
  4. Apply Sylow's theorems to classify finite groups of small order [Apply]
  5. Analyze topological properties (compactness, connectedness, separation) of standard spaces [Analyze]
  6. Apply combinatorial and number-theoretic identities to CSIR-NET style problems [Apply]

📚 Chapters

  1. Complex Numbers & the Complex Plane
  2. Analytic Functions & Cauchy–Riemann
  3. Power Series & Elementary Functions
  4. Contour Integrals & Cauchy's Theorem
  5. Cauchy Integral Formula & Consequences
  6. Taylor & Laurent Series
  7. Residue Calculus
  8. Conformal Mappings & Möbius Transformations
  9. Combinatorics & Number Theory
  10. Groups: Basics & Homomorphisms
  11. Sylow Theory & Permutation Groups
  12. Rings, Ideals, UFD / PID / Euclidean
  13. Polynomial Rings, Fields & Galois Theory
  14. Topology — Basis, Compactness, Connectedness

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CSIR-MATH-U1 — Analysis and Linear Algebra

CSIR-MATH-U1 — Analysis and Linear Algebra

CSIR-NET Unit 1: Real Analysis (sets, countability, sequences, series, continuity, differentiability, integration, multivariable calculus, metric spaces, bounded variation, Lebesgue) and Linear Algebra (vector spaces, matrices, rank, eigenvalues, canonical forms, inner products, quadratic forms).

📋 Course Learning Outcomes

On successful completion of this course, the learner will be able to:

  1. Apply the order-completeness of R and countability arguments to set-theoretic problems [Apply]
  2. Analyze convergence of sequences and series using standard tests [Analyze]
  3. Evaluate continuity, differentiability, and Riemann integrability of real functions [Evaluate]
  4. Apply uniform convergence to justify term-by-term differentiation and integration [Apply]
  5. Analyze metric-space properties of subsets of R and R^n [Analyze]
  6. Compute eigenvalues, canonical forms, and quadratic-form classifications [Apply]

📚 Chapters

  1. Real Numbers, Sets & Countability
  2. Sequences, Series & Convergence
  3. Continuity, Differentiation, MVT
  4. Sequences & Series of Functions
  5. Riemann Integration
  6. Bounded Variation & Lebesgue
  7. Functions of Several Variables
  8. Metric Spaces, Compactness, Connectedness
  9. Vector Spaces, Basis & Dimension
  10. Matrices, Rank & Linear Equations
  11. Eigenvalues & Cayley–Hamilton
  12. Canonical Forms — Diagonal, Triangular, Jordan
  13. Inner Product Spaces & Orthonormality
  14. Quadratic Forms — Reduction & Classification

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