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Statistics – Optional (Main Examination)
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Paper-I
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| Probability :
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Sample space
and events, probability measure and probability space, random variable as
a measurable function, distribution function of a random variable,
discrete and continuous-type random variable probability mass function,
probability density function, vector-valued random variable, marginal and
conditional distributions, stochastic independence of events and of random
variables, expectation and moments of a random variable, conditional
expectation, convergence of a sequence of random variable in distribution,
in probability, in p-th mean and almost everywhere, their criteria and
inter-relations, Borel-Cantelli lemma, Chebyshev’s and Khinchine‘s
weak laws of large numbers, strong law of large numbers and kolmogorov’s
theorems, Glivenko-Cantelli theorem, probability generating function,
characteristic function, inversion theorem, Laplace transform, related
uniqueness and continuity theorems, determination of distribution by its
moments. Linderberg and Levy forms of central limit theorem, standard
discrete and continuous probability distributions, their inter-relations
and limiting cases, simple properties of finite Markov chains.
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Statistical
Inference
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Consistency,
unbiasedness, efficiency, sufficiency, minimal sufficiency, completeness,
ancillary statistic, factorization theorem, exponential family of
distribution and its properties, uniformly minimum variance unbiased (UMVU)
estimation, Rao-Blackwell and Lehmann-Scheffe theorems, Cramer-Rao
inequality for single and several-parameter family of distributions,
minimum variance bound estimator and its properties, modifications and
extensions of Cramer-Rao inequality, Chapman-Robbins inequality,
Bhattacharyya’s bounds, estimation by methods of moments, maximum
likelihood, least squares, minimum chi-square and modified minimum
chi-square, properties of maximum likelihood and other estimators, idea of
asymptotic efficiency, idea of prior and posterior distributions, Bayes
estimators.
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Non-randomised
and randomised tests, critical function, MP tests, Neyman-Pearson lemma,
UMP tests, monotone likelihood ratio, generalised Neyman-Pearson lemma,
similar and unbiased tests, UMPU tests for single and several-parameter
families of distributions, likelihood rotates and its large sample
properties, chi-square goodness of fit test and its asymptotic
distribution.
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Confidence
bounds and its relation with tests, uniformly most accurate (UMA) and UMA
unbiased confidence bounds.
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Kolmogorov’s
test for goodness of fit and its consistency, sign test and its
optimality. wilcoxon signed-ranks test and its consistency, Kolmogorov-Smirnov
two-sample test, run test, Wilcoxon-Mann-Whitney test and median test,
their consistency and asymptotic normality.
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Wald’s
SPRT and its properties, OC and ASN functions, Wald’s fundamental
identity, sequential estimation.
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Linear
Inference and Multivariate Analysis
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Linear
statistical models’, theory of least squares and analysis of variance,
Gauss-Markoff theory, normal equations, least squares estimates and their
precision, test of signficance and interval estimates based on least
squares theory in one-way, two-way and three-way classified data,
regression analysis, linear regression, curvilinear regression and
orthogonal polynomials, multiple regression, multiple and partial
correlations, regression diagnostics and sensitivity analysis, calibration
problems, estimation of variance and covariance components, MINQUE theory,
multivariate normal distribution, Mahalanobis;’ D2 and Hotelling’s T2
statistics and their applications and properties, discrimi nant analysis,
canonical correlatons, one-way MANOVA, principal component analysis,
elements of factor analysis.
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Sampling
Theory and Design of Experiments
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An outline
of fixed-population and super-population approaches, distinctive features
of finite population sampling, probability sampling designs, simple random
sampling with and without replacement, stratified random sampling,
systematic sampling and its efficacy for structural populations, cluster
sampling, two-stage and multi-stage sampling, ratio and regression,
methods of estimation involving one or more auxiliary variables, two-phase
sampling, probability proportional to size sampling with and without
replacement, the Hansen-Hurwitz and the Horvitz-Thompson estimators,
non-negative variance estimation with reference to the Horvitz-Thompson
estimator, non-sampling errors, Warner’s randomised response technique
for sensitive characteristics.
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Fixed
effects model (two-way classification) random and mixed effects models
(two-way classification per cell), CRD, RBD, LSD and their analyses,
incomplete block designs, concepts of orthogonality and balance, BIBD,
missing plot technique, factorial designs : 2n, 32 and 33, confounding in
factorial experiments, split-plot and simple lattice designs.
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Paper-II
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I.
Industrial Statistics
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Process and
product control, general theory of control charts, different types of
control charts for variables and attributes, X, R, s, p, np and c charts,
cumulative sum chart, V-mask, single, double, multiple and sequential
sampling plans for attributes, OC, ASN, AOQ and ATI curves, concepts of
producer’s and consumer’s risks, AQL, LTPD and AOQL, sampling plans
for variables, use of Dodge-Romig and Military Standard tables.
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Concepts of
reliability, maintainability and availability, reliability of series and
parallel systems and other simple configurations, renewal density and
renewal function, survival models (exponential), Weibull, lognormal,
Rayleigh, and bath-tub), different types of redundancy and use of
redundancy in reliability improvement,
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problems in
life-testing, censored and truncated experiments for exponential models.
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II.
Optimization Techniques
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Different,
types of models in Operational Research, their construction and general
methods of solution, simulation and Monte-Carlo methods, the structure and
formulation of linear programming (LP) problem, simple LP model and its
graphical solution, the simplex procedure, the two-phase method and the
M-technique with artificial variables, the duality theory of LP and its
economic interpretation, sensitivity analysis, transportation and
assignment problems, rectangular games, two-person zero-sum games, methods
of solution (graphical and algerbraic).
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Replacement
of failing or deteriorating items, group and individual replacement
policies, concept of scientific inventory management and analytical
structure of inventory problems, simple models with deterministic and
stochastic demand with and without lead time, storage models with
particular reference to dam type.
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Homogeneous
discrete-time Markov chains, transition probability matrix, classification
of states and ergodic theorems, homogeneous continous-time Markov chains,
Poisson process, elements of queueing theory, M/M/1, M/M/K, G/M/1 and
M/G/1 queues.
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Solution of
statistical problems on computers using well known statistical software
packages like SPSS.
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III.
Quantitative Economics and Official Statistics
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Determination
of trend, seasonal and cyclical components, Box-Jenkins method, tests for
stationery of series, ARIMA models and determination of orders of
autoregressive and moving average components, forecasting.
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Commonly
used index numbers-Laspeyre's, Paashe's and Fisher's ideal index numbers,
chain-base index number uses and limitations of index numbers, index
number of wholesale prices, consumer price index number, index numbers of
agricultural and industrial production, test for index numbers like
proportionality test, time-reversal test, factor-reversal test, circular
test and dimensional invariance test.
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General
linear model, ordinary least squares and generalised least squires methods
of estimation, problem of multicollinearlity, consequences and solutions
of multicollinearity, autocorrelation and its consequeces,
heteroscedasticity of disturbances and its testing, test for independe of
disturbances, Zellner's seemingly unrelated regression equation model and
its estimation, concept of structure and model for simulaneous equations,
problem of identification-rank and order conditions of identifiability,
two-stage least squares method of estimation.
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Present
official statistical system in India relating to population, agriculture,
industrial production, trade and prices, methods of collection of official
statistics, their reliability and limitation and the principal
publications containing such statistics, various official agencies
responsible for data collection and their main functions.
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IV.
Demography and Psychometry
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Demographic
data from census, registration, NSS and other surveys, and their
limitation and uses, definition, construction and uses of vital rates and
ratios, measures of fertility, reproduction rates, morbidity rate,
standardized death rate, complete and abridged life tables, construction
of life tables from vital statistics and census returns, uses of life
tables, logistic and other population growth curves, fifting a logistic
curve, population projection, stable population quasi-stable population
techniques in estimation of demographic parameters, morbidity and its
measurement, standard classification by cause of death, health surveys and
use of hospital statistics.
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Methods of
standardisation of scales and tests, Z-scores, standard scores, T-scores,
percentile scores, intelligence quotient and its measurement and uses,
validity of test scores and its determination, use of factor analysis and
path analysis in psychometry.
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