PG-Mathematics
M-25. AN INTRODUCTION TO LAPLACE TRANSFORM
M-26. OPERATIONAL PROPERTIES OF LAPLACE TRANSFORM
M-27. CONVOLUTION OF LAPLACE TRANSFORM
M-28. METHOD OF EVALUATION OF INVERSE LAPLACE TRANSFORM
M-29. APPLICATION OF LAPLACE TRANSFORM TO DIFFERENTIAL EQUATIONS
M-32. EVALUATION OF MELLIN TRANSFORM OF SOME FUNCTIONS
M-31. OPERATIONAL PROPERTIES OF MELLIN TRANSFORM
M-33. HANKEL TRANSFORM AND ITS PROPERTIES
M-34. HANKEL TRANSFORM OF SOME KNOWNFUNCTIONS AND APPLICATIONS
M-23. APPLICATION OF FOURIER TRANSFORM IN SOLVING PARTIAL DIFFERENTIAL EQUATIONS
M-35. INTRODUCTION TO Z TRANSFORM
M-24. APPLICATION OF FOURIER SINE AND COSINE TRANSFORMTO THE SOLUTION OF PARTIAL DIFFERENTIAL
M-36. INVERSION OF Z TRANSFORM
M-09. METHOD OF SUCCESSIVE APPROXIMATIONS APPLIED TO VOLTERRA INTEGRAL EQUATION OF SECOND KIND
M-30. AN INTRODUCTION TO MELLIN TRANSFORM
M-10. FREDHOLM INTEGRAL EQUATIONS OF SECOND KIND WITH CONTINUOUS KERNEL: ITERATED KERNEL
M-22. APPLICATION OF FOURIER SINE AND COSINE TRANSFORMS IN SOLVING LINEAR ORDINARY DIFFERENTIAL
M-21. APPLICATION OF FOURIER TRANSFORMS IN SOLVING LINEAR ORDINARY DIFFERENTIAL EQUATIONS
Self Learning MATH C10 M11 Ch3 Mod5
M-04. THE THEORY OF FREDHOLM ALTERNATIVE
M-12. FREDHOLM INTEGRAL EQUATION OF SECOND KIND WITH SQUARE INTEGRABLE KERNEL AND FORCING TERM
M-05. HOMOGENEOUS FREDHOLM INTEGRAL EQUATIONS OF SECOND KIND WITH DEGENERATE KERNEL
M-13. PROPERTIES OF INTEGRAL EQUATIONS WITH SYMMETRIC KERNEL
M-06. SOLUTION OF FREDHOLM INTEGRAL EQUATION WITH DEGENERATE KERNEL: EXAMPLES
M-14. HILBERT SCHMIDT THEOREM
M-01. Classifications of Integral Equations
M-07. FREDHOLM INTEGRAL EQUATIONS OF SECOND KIND WITH CONTINUOUS KERNEL: SOLUTION BY THE METHOD
M-02. Occurrence of Volterra Integral Equations
M-03. Occurrence of Fredholm Integral Equations
M-17. INTRODUCTION TO FOURIER TRANSFORM
M-18. FOURIER TRANSFORMS OF SOME SIMPLE FUNCTIONS
M-15. Solution of Abel integral equation : Method based on Elementary integration.
M-19. PROPERTIES OF FOURIER TRANSFORM
M-16. Solution of Abel integral equation : Method based on Laplace Transform
M-08. FREDHOLM INTEGRAL EQUATIONS OF SECOND KIND WITH CONTINUOUS KERNEL: SOLUTION BY THE METHOD
M-20. CONVOLUTION THEOREM AND PARSEVAL RELATION
