Theory of Stochastic Canonical Equations

Abstract

List of basic notations and assumptions. How the stochastic canonical equation was found. 1. Canonical equation K1. 2. Canonical equation K2* Necessary and sufficient modified Lindeberg's condition. The Wigner and Cubic laws. 3. Regularized stochastic canonical equation K3 for symmetric random matrices with infinitely small entries. 4. Stochastic canonical equation K4 for symmetric random matrices with infinitely small entries. Necessary and sufficient conditions for the convergence of normalized spectral functions. 5. Canonical equation K5 for symmetric random matrices with infinitely small entries. 6. Canonical equation K6 for symmetric random matrices with identically distributed entries. 7. Canonical equation K7 for Gram random matrices. 8. Canonical equation K8. 9. Canonical equation K9 for random matrices whose entries have identical variances. 10. Canonical equation K10* Necessary and sufficient modified Lindeberg condition. 11. Canonical equation K11* Limit theorem for normalized spectral functions of empirical covariance matrices under the modified Lindeberg condition. 12. Canonical Equation K12 for random Gram matrices with infinitely small entries. 13. Canonical Equation K13 for random Gram matrices with infinitely small entries. 14. The method of random determinants for estimating the permanents of matrices and the canonical equation K14 for random Gram matrices. 15. Canonical EquationK15 for random Gram matrices with identically distributed entries. 16. Canonical Equation K16 for sample covariance matrices. 17. Canonical Equation K17 for identically distributed independent vector observations and the G2-estimators of the real Stieltjes transforms of the normalized spectral functions of the covariance matrices. 18. Canonical equation K18 for the special structure of vector observations. 19. Canonical equation K19. 20. Canonical equation K20* Strong law for normalized spectral functions of nonselfadjoint random matrices with independent row vectors. Simple rigorous proof of the strong Circular law. 21. Canonical equation K21 for random matrices with independent pairs of entries with zero expectations. Circular and Elliptic laws. 22. Canonical equation K22 for random matrices with independent pairs of entries. 23. Canonical equation K23 for random matrices with independent pairs of entries with different variances and equal covariances. 24. Canonical equation K24 for random G-matrices with infinitesimally small random entries. 25. Canonical equation K25 for random G-matrices. Strong V-law. 26. Class of canonical V-equation K26 for a single matrix and a product of two matrices. The V-density of eigenvalues of random matrices such that the variances of their entries form a doubly stochastic matrix. 27. Canonical equation K27 for normalized spectral functions of random symmetric block matrices.