Books 

These are some of the books that enjoyed reading (some pages) at some point of time.

 In near future, I will write a review of what I liked in each of these books.

1. Handbook of categorical algebra 3 volumes by Francis Borceux 

2. Lie Groupoids and Lie Algebroids in Differential Geometry by K C H Mackenzie

3. General theory of Lie groupoids and Lie algebroids by K C H Mackenzie

4. An introduction to Lie groups and Lie algebras by Alexander Kirillov Jr.

5. Introduction to Foliations and Lie groupoids by Moerdijk

6. A first course in Homological algebra by D. G. Northcott

7. A course in group theory by John F. Humphreys

8. Simplicial homotopy theory by Paul G. Goerss and John F. Jardine

9. Complex analysis by Theodore W. Gamelin

10. Complex analysis by Kunihiko Kodaiara 

11. Lie groups : beyond an introduction by Anthony W. Knapp

12. Lie groups : an introduction through linear groups by Wulf Rossmann

13. Linear algebra by Jin Ho Kwak and Sungpyo Hong

14. Lie groups : a problem oriented approach via Matrix groups by Harriet Pollastek 

15. Introduction to representation theory by Etingof, Golberg, Hensel, Liu, Schwendner, Vaintrob, Yudovina

16. Commutative ring theory by Hideyuki Matsumura

17. Commutative algebra by Hideyuki Matsumura 

18. Modules and rings John Dauns

19. Matrix groups for undergraduates by Kristopher Tapp 

20. Representation theory by Fulton and Harris

21. A survey of Modern algebra by Birkhoff and Maclane

22. A first course in Graph theory and combinatorics by Sebastian cioba and Ram Murty

23. A course in Homological algebra by Hilton and Stammbach

24. Algebra : an approach via module theory by William Adkins and Steven Weintraub

25. Algebra : a graduate course by Martin Issacs

26. Algebra by Hungerford

27. Algebra by Serge Lang

28. Topics in algebra by Herstein

29. A first course in abstract algebra by John B. Fraleigh 

30. Abstract algebra by Paul B. Garrett

31. Contemporary abstract algebra by Joseph A. Gallian

32. Cohomology of groups by Kenneth S. Brown

33. Galois theory by Ian Stewart

34. Groups, rings, Modules by Auslander and Buchsbaum 

35. An introduction to rings and modules (with K-theory in view) by Berrick and Keating

36. Galois theory by Joseph Rotman

37. Triangulated categories by Amnon Neeman

38. Categories for the working mathematician by Mac Lane

39. Linear algebraic groups by Springer

40. An introduction to Invariants and Moduli by Mukai

41. Multilinear algebra by Northcott

42. Multilinear algebra by Greub

43. Lie groups, Lie algebras and their representations by Varadarajan

44.  Naive Lie theory by John Stillwell

45. Notes on Lie algebras by Hans Samelson

46. Lie algebras by Nathan Jacobson

47. Introduction to Lie algebras and representation theory by James E. Humphreys

48. Lectures on Lie groups by W. Y. Hsiang

49. Lie groups, Lie algebras, and representations by Brian C. Hall

50. Lie groups by Duistermaat and Kolk

51. Linear algebraic groups by Armand Borel

52. Lie groups by Daniel Bump

53. Semi simple Lie algebras and their representations by Robert N. Cahn 

54. Theory of Lie groups by Chevalley

55. Lectures on Lie groups and Lie algebras by Carter, Segal and MacDonald

56. Basic Lie theory by Abbaspour and Moskowitz

57. Basic commutative algebra by Balwant singh

58. Undergraduate commutative algebra by Miles Reid 

59. Commutative algebra by Gopalakrishnan

60. Commutative algebra by Atiyah and Macdonald

61. Introduction to rings and modules by C. Musili 

62. Representations and characters of groups by gordon James and Martin Liebeck 

63. Representation theory and Complex geometry by Neil Chris and Victor Ginzburg

64. Representations and cohomology 2 volumes by D. J. Benson

65. Linear representations of finite groups by Jean-Pierre Serre

66. Linear representations of groups by Vinberg

67. Characteristic classes and the cohomology of finite groups by C. B. Thomas

68. Representation theory of finite groups : an introductory approach by Benjamin Steinberg

69. Galois theory by Joseph Rotman

70. Introduction to categories, homological algebra and sheaf cohomology by Jan R. Strooker

71. Loop spaces, characteristic classes and geometric quantization by Brylinski 

72. An introduction to Homological algebra by Weibel 

73. Basic topology by M. A. Armstrong

74. Elementary topology : Problem textbook by Viro, Ivanov, Netsvetaev and Kharlamov

75. An introduction to category theory by Harold Simmons

76. A first course in topology : continuity and dimension by John McCleary 

77. Foundations of Differntial geometry by Kobayashi and Nomizu

78. Complex function theory by Donald Sarason

79. A course on topological groups by Chandrasekharan

80. A course on Integration theory by Chandrasekharan

81. Lie groups and Lie algebras by M. S. Raghunathan 

82. Topology from differentiable view point by Milnor

83. Homotopical algebra by Daniel Quillen 

I am willing to take daanam in the form of hard copies of these books. 

daatavyam iti yat daanam deeyatE anupakaariNE

dESE kaalE cha paatrE cha tat daanam saatvikam smRtam 

దాతవ్యం ఇతి యత్ దానం దీయతే అనుపకారిణే

దేశే కాలే చ పాత్రే చ తత్ దానం సాత్వికం స్మృతం 

If you want to give danam, please feel free to reach me  in my email id praphullakoushik@nitc.ac.in 

Undergraduate-level books are required in multiple copies.