Recent developments in nonregular fractional factorial designs

Matrix image method for ranking nonregular fractional factorial designs ⋮ Construction of symmetric orthogonal designs with deep Q-network and orthogonal complementary design ⋮ Approximate theory-aided robust efficient factorial fractions under baseline parametrization ⋮ Some optimal criteria of model-robustness for two-level non-regular fractional factorial designs ⋮ A new and flexible design construction for orthogonal arrays for modern applications ⋮ A CLASS OF MULTILEVEL NONREGULAR DESIGNS FOR STUDYING QUANTITATIVE FACTORS ⋮ Wordlength enumerator for fractional factorial designs ⋮ A Position-Based Approach for Design and Analysis of Order-of-Addition Experiments ⋮ J.N. Srivastava and experimental design ⋮ Two-level minimum aberration designs in \(N=2 \pmod 4\) runs ⋮ On Construction of Nonregular Two-Level Factorial Designs With Maximum Generalized Resolutions ⋮ A novel technique for constructing nonregular nine-level designs: adjusted multiple tripling technique ⋮ One-eighth- and one-sixteenth-fraction quaternary code designs with high resolution ⋮ Construction of minimum generalized aberration two-level orthogonal arrays ⋮ Unnamed Item ⋮ Nonregular designs from Paley's Hadamard matrices: generalized resolution, projectivity and hidden projection property ⋮ Fractional factorial designs for Fourier-cosine models ⋮ Creating catalogues of two-level nonregular fractional factorial designs based on the criteria of generalized aberration ⋮ A complementary set theory for quaternary code designs ⋮ Algorithmic search for baseline minimum aberration designs ⋮ New results on quaternary codes and their Gray map images for constructing uniform designs ⋮ Strong orthogonal arrays of strength two plus ⋮ Orthogonal subsampling for big data linear regression ⋮ Alternative Foldover Plans for Two-Level Nonregular Designs ⋮ A trigonometric approach to quaternary code designs with application to one-eighth and one-sixteenth fractions ⋮ A code arithmetic approach for quaternary code designs and its application to \((1/64)\)th-fractions ⋮ De-aliasing in two-level factorial designs: a Bayesian approach ⋮ Construction of search designs from orthogonal arrays ⋮ Minimum aberration designs for discrete choice experiments ⋮ New lower bounds of four-level and two-level designs via two transformations ⋮ A systematic construction approach for nonregular fractional factorial four-level designs via quaternary linear codes ⋮ A New Analysis Strategy for Designs With Complex Aliasing ⋮ Construction of multi-level space-filling designs via code mappings ⋮ Minimax design criterion for fractional factorial designs

• Connection between uniformity and minimum moment aberration
• A catalogue of three-level regular fractional factorial designs
• Projection properties of certain three level orthogonal arrays
• Optimal criteria and equivalence for nonregular fractional factorial designs
• Construction of optimal multi-level supersaturated designs
• Majorization framework for balanced lattice designs
• Quarter-fraction factorial designs constructed via quaternary codes
• Blocked regular fractional factorial designs with minimum aberration
• Nonregular two-level designs of resolution IV or more containing clear two-factor interactions
• Complete enumeration of two-level orthogonal arrays of strength \(d\) with \(d+2\) constraints
• Analysis of supersaturated designs via the Dantzig selector
• Orthogonal arrays with variable numbers of symbols
• Orthogonal arrays. Theory and applications
• \(2^{n-l}\) designs with weak minimum aberration
• Characterization of minimum aberration \(2^{n-k}\) designs in terms of their complementary designs
• Classification of affine resolvable \(2\)-\((27,9,4)\) designs
• Some identities on \(q^{n-m}\) designs with application to minimum aberration designs
• The design and analysis of computer experiments.
• Indicator function and its application in two-level factorial designs
• Hidden projection properties of some nonregular fractional factorial designs and their applications
• Minimum \(G_2\)-aberration for nonregular fractional factorial designs
• Theory of optimal blocking of \(2^{n-m}\) designs
• Design and analysis of computer experiments. With comments and a rejoinder by the authors
• Projection justification of generalized minimum aberration for asymmetrical fractional factorial designs
• Geometric isomorphism and minimum aberration for factorial designs with quantitative factors
• Minimum \(G_{2}\)-aberration properties of two-level foldover designs
• Generalized minimum aberration for asymmetrical fractional factorial designs.
• Construction of generalized minimum aberration designs of 3, 4 and 5 factors
• Design catalog based on minimum \(G\)-aberration
• Least angle regression. (With discussion)
• Discrete discrepancy in factorial designs
• Some projection properties of orthogonal arrays
• Further contributions to nonisomorphic two level orthogonal arrays
• Generalized wordtype pattern for nonregular factorial designs with multiple groups of factors
• Results for two-level fractional factorial designs of resolution IV or more
• A note on the connection between uniformity and generalized minimum aberration
• Uniformity pattern and related criteria for two-level factorials
• An effective algorithm for generation of factorial designs with generalized minimum aberration
• A survey and evaluation of methods for determination of combinatorial equivalence of factorial designs
• Classification of orthogonal arrays by integer programming
• A complementary design theory for doubling
• Projection properties of some orthogonal arrays
• A modern theory of factorial designs.
• Constructing non-regular robust parameter designs
• Minimum aberration blocking schemes for two- and three-level fractional factorial designs
• Theory of J-characteristics for fractional factorial designs and projection justification of minimum G2-aberration
• Minimum aberration construction results for nonregular two-level fractional factorial designs
• An Analysis for Unreplicated Fractional Factorials
• Minimum Aberration 2 k-p Designs
• Miscellanea. Some hidden projection properties of orthogonal arrays with strength three
• Design and Analysis of Experiments
• Minimum Aberration and Model Robustness for Two-Level Fractional Factorial Designs
• Construction of supersaturated designs through partially aliased interactions
• Orthogonal Array-Based Latin Hypercubes
• The Z/sub 4/-linearity of Kerdock, Preparata, Goethals, and related codes
• Controlling Correlations in Latin Hypercube Samples
• Projective properties of certain orthogonal arrays
• Follow-Up Designs to Resolve Confounding in Multifactor Experiments
• A Bayesian Variable-Selection Approach for Analyzing Designed Experiments with Complex Aliasing
• A generalized discrepancy and quadrature error bound
• Uniform designs limit aliasing
• Projective three-level main effects designs robust to model uncertainty
• Uniform Design: Theory and Application
• On Orthogonal Matrices
• Theory of optimal blocking of nonregular factorial designs
• Miscellanea. A connection between uniformity and aberration in regular fractions of two-level factorials
• A Catalogue of Two-Level and Three-Level Fractional Factorial Designs with Small Runs
• Some nonregular designs from the Nordstrom–Robinson code and their statistical properties
• Generalised minimum aberration construction results for symmetrical orthogonal arrays
• Orthogonal arrays robust to nonnegligible two-factor interactions
• Some Generalizations in the Multifactorial Design
• Hadamard matrices and their applications
• A note on generalized aberration in factorial designs
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