The Annual Foundation School (AFS)-I


Venue: Bhaskaracharya Pratishthana, Pune
Dates:  5 Dec - 31 Dec, 2005


Convener(s) Speakers, Syllabus and Time table Applicants/Participants


School Convener(s)

Name  S. A. Katre
Mailing Address University of Pune

AFS being organised in Pune in December 2005 is the first of the 2nd Annual Foundation Schools being organised on behalf of NBHM.

National Coordinating Committee

Director: R. S. Kulkarni
Secretary: J. K. Verma
Members : S. D. Adhikari, Satya Deo, Shobha Madan, I. B. S. Passi, R. A. Rao

Members of the Local Organising Committee

Bhaskaracharya Pratishthana: C. S. Inamdar (Custodian), R. V. Gurjar (Res. Director, Hon.)
University of Pune: N. S. Bhave (HOD, Maths.), S. A. Katre, H. Bhate


Speakers and Syllabus 


  • Ravi Rao,(co-ordinator) email: ravi at math dot tifr dot res dot in
  • J. K. Verma , email: jkv at math dot iitb dot ac dot in
  • S. A. Katre, email: sakatre at math dot unipune dot ernet dot in


  • R. R. Simha (co-ordinator), email: simhahome at yahoo dot com
  • A. S. Athavale , email: athavale at math dot iitb dot ac dot in
  • H. Bhate , email: hbhate at math dot unipune dot ernet dot in

Differential Geometry and Topology

  • Ravi Kulkarni (co-ordinator) ,
    email: kulkarni at mri dot ernet dot in
  • R. V. Gurjar, email: gurjar at math dot tifr dot res dot in
  • G. Santhanam, email: santhana at iitk dot ac dot in

Special Lecture Series:

  • Nitin Nitsure
  • Dinesh Thakur

For Algebra:

  1. Shripad Garge
  2. Anuradha Garge
  3. Himanee Apte
  4. Selby Jose
For Analysis:
  1. Sameer Chavan
  2. Anandateerth Mangasuli
  3. Pratul Gadagkar
For Differential Geometry:
  1. Anandateerth Mangasuli
  2. Vikram Aithal
  3. Pratul Gadagkar

Tentative schedule of Speakers.

Ravi Rao (5th-18th), J. K. Verma (8th-25th), S. A. Katre (5th-31st),
R. R.
Simha (5th-31st), A. S. Athavale (7th-18th Dec.), H. Bhate (16th-25th),

Ravi Kulkarni (5th-23rd Dec.), R. V. Gurjar (5th-18th), S. Santhanam
(22nd-31st Dec.)

Objectives of AFS

Basic knowledge in algebra, analysis, discrete mathematics and topology forms the core of all advanced instructional schools the schools to be organized in this programme.
The objective of the Annual Foundation Schools, to be offered in Winter and Summer every year, is two fold:

  1. To bring up students with diverse backgrounds to a common level.
  2. To identify those who are fit for further training.

Any student who wishes to attend the advanced instructional schools is strongly encouraged to enroll in the Annual Foundation Schools.

Format of AFS

The topics listed in the syllabi will be quickly covered in the lectures. There will be intensive problem sessions in the afternoons. The objective will not be to cover the syllabus prescribed, but to inculcate the habit of problem solving. However, the participants will be asked to study all the topics in the syllabus at home since the syllabi of these schools will be assumed in all the advanced instructional schools devoted to individual subjects.

Participants in AFS

These schools will admit 40 students in their first and second years of Ph. D. programme, students of M. Sc. (II Year), university lecturers and college teachers who lack the knowledge of basic topics covered in these schools.

A participant who has attended AFS-I and II will never be allowed to attend these again.


Syllabus for the Annual Foundation School (AFS)-I (Dec., 2005)



Modules over PIDs:
Basic theory, applications to abelian groups and canonical forms.(6 lectures)
Introduction to Field Theory: Splitting fields, Separable and normal extensions (2 lectures)


Algebraically closed fields. (1)
Fundamental theorem of Galois theory with applications to fundamental theorem of algebra and constructibility of regular polygons. (2)
Galois groups of cubics and quartics Cyclotomic extensions with some number theory applications (3)
Galois's solvability criterion, existence of Galois extensions of Q with given abelian group (2)


Finite fields with applications to quadratic reciprocity.(2 lectures)
Norms and traces, Hilbert's theorem 90, Artin-Schreier theorem with number theory applications (3 lectures)
Luroth's theorem with applications to algebraic curves. Galois group of K(T)/K (3 lectures)

M. Artin, Algebra, Prentice-Hall of India, New Delhi, 1994. D. S. Dummit and R. M. Foote, Abstract Algebra, 2nd Edn., John Wiley & Sons, Inc., New York (Asian Edn., Singapore), 2003. N. Jacobson, Basic Algebra, Vol. 1, Freeman & Co., USA, Hindustan Publishing Corporation (India), Delhi, Reprint, 1991. S. Lang, Algebra, 3rd edn., Addison Wesley Pub. Co., Inc., USA, 1993. I.S. Luthar, I.B.S. Passi, Algebra-IV, Field Theory, Narosa, 2004.



Review of the Riemann integral (1 lecture)
Construction of the Lebesgue measure on R n

(2 lectures) Abstract Integration Theory and the main convergence theorems (2 lectures)
The L p

spaces and Applications (3 lectures)
Pre-requisites for Measure and Integration:
Standard properties of real numbers including lim sup and lim inf of sequences. Topology of metric spaces. Compact metric spaces. Complete metric spaces. Baire's Theorem. Uniform convergence. Elementary properties of Riemann integral.
References :
W. Rudin: Real and Complex Analysis. (This book contains all the basic material and many applications; the exercises are a very valuable part of the book.)
Saks: Theory of the Integral. (This book contains a complete and brief exposition of the abstract theory of Lebesgue integration.)
F. Riesz and B. S. Nagy: Functional Analysis. (This book is written in a leisurely style, and contains a wealth of information. Very good for browsing.)
E. H. Lieb and M. Loss - Analysis. (This book is written for analysts and physicists, and contains much non-standard material.)

A. S. Athavale

Fourier Series and Functional Analysis
1. Conditional, unconditional and absolute convergence of a series in a normed linear space; notion of an orthonormal basis for a Hilbert space (1 lecture)
2. Trigonometric series, Fourier series, Fourier sine and cosine series (1 lecture)
3. Piecewise continuous/smooth functions, absolutely continuous functions, functions of bounded variation (and their significance in the theory of Fourier series) (1 lecture)
4. Generalised Riemann-Lebesgue lemma (1 lecture)
5. Dirichlet and Fourier kernels (2 lectures)
6. Convergence of Fourier series (1 lecture)
7. Discussion (without proofs) of some of the following topics: The Gibbs phenomenon, divergent Fourier series, term-by-term operations on Fourier series, various kinds of summability, Fejer theory, multivariable Fourier series (1 lecture).

Depending upon the feedback from students, the above syllabus is subject to minor (but not major) modifications. A prerequisite for the course is a sound knowledge of Calculus and Riemann Integration Theory. Some familiarity with Lebesgue Integration Theory and elementary Hilbert Space Theory is desirable, but (hopefully) not absolutely essential; in any case, the results used from those theories will be stated explicitly.
References :
1) George Bachman, Lawrence Narici and Edward Beckenstein, Fourier and Wavelet Analysis, Springer-Verlag, New York, 2000.
2) Richard L. Wheeden and Antoni Zygmund, Measure and Integral, Marcel Dekker Inc., New York, 1977.
3) Balmohan V. Limaye, Functional Analysis, New Age International (P) Ltd., New Delhi, 2004.

H. Bhate

Basic theory of ordinary differential equations:
Existence of local solutions for first order systems, maximal time of existence, finite time blow-up, global solutions.
Gronwall inequality, Continuous dependence on initial data and on the vector field on bounded intervals.
Examples of linear systems, Fundamental solutions. (8 lectures)

1)  Differential Equations, Dynamical Systems and an Introduction to Chaos,
     2nd Edn., by M. W. Hirsch, S. Smale, R. L. Devaney, Elsevier, 2004.
2)  Real Analysis by G. B. Folland, John Wiley, 1999.
3)  Real And Complex Analysis by W. Rudin, McGraw Hill, 1987.

Differential Geometry and Topology

R. V. Gurjar

(1) Smooth maps, bump functions, smooth partitions of unity. Inverse and implicit function theorem.
Examples. (3 lectures)
(2) Manifolds, tangent space, immersion and submersion, regular and critical values, Sard's theorem.
Applications. (4 lectures)

Ravi Kulkarni

(3) Integration of forms, Stokes' theorem  (3 lectures)
(4) Classification of 2-manifolds. (4 lectures)
(5) Differential geometry of curves in R2, R3 and surfaces in R3.
(3 lectures)

G. Santhanam

(6) Introduction to Riemannian Geometry (7 lectures)

(7) Morse Theory (optional topic)

Texts and references:
1) M. P. do Carmo, Differential Geometry of Curves and Surfaces, Prentice Hall, Engelwood, NJ 1976.
2) A. Gray, Modern Differential Geometry of Curves and Surfaces with MATHEMATICA, CRC Press, 1998.
3) J. Hicks, Notes on Differential Geometry.
4) S. Kumaresan, A Course on Differential Geometry and Lie Groups, Texts and Readings in Mathematics 22, Hindustan Book Agency, 2002.
5) S. Kumaresan, A Course in Riemannian Geometry, (Lecture Notes).
6) S. Kumaresan, Classification of Surfaces via Morse theory, Expositions Mathematica, 18 (2000), 37-74.
7) W. Massey, Algebraic Topology, GTM Series, Springer Verlag, 127
8) John Milnor, Morse Theory, Annals of Math. Studies, 51, Princeton.
9) M. Spivak, A Comprehensive Introduction to Differential Geometry, vol. I-V, Publish or Perish.
10) J. A. Thorpe: Elementary Topics in Differential Geometry, Undergraduate Texts in Mathematics, Springer 1979

(4,5,6,7,8,10 will be referred to in the lectures.
Other possible references for Differential Topology: Guillemin and Pollak, Hirsch, Kosinsky)

Special Lecture Series (UM Lectures)

1. Nitin Nitsure

`Evolution of spaces' (6 Lectures)
(This will be a historical introduction to geometry from Euclid to present times.)

2. Dinesh Thakur

Syllabus of the Annual Foundation School-I (May-June, 2004)

Algebra I

(1) Modules over PIDs: The basic theory, structure theorem for f.g. abelian groups and canonical forms of matrices. (6 lectures)
(2) Galois theory: Separable and normal extensions, algebraically closed fields, splitting fields, Fundamental theorem of Galois theory, Galois groups of cubic and quartics, fundamental theorem of algebra, finite fields, Galois's solvability criterion, cyclotomic and abelian extensions, (12 lectures)
(3) Representation theory of finite groups:Permutation representations, character theory and orthogonality relations, Burnside's theorem, representations of SU2. (6 lectures)
1. N. Jacobson, Basic Algebra I.
2. S. Lang, Algebra, 3rd edition.
3. M. Artin, Algebra.
4. Dummit and Foote, Algebra.


Real Analysis Basics: Measures, Integration, Normed spaces, Baire category theorem. Open mapping theorem, Closed graph theorem, Uniform boundedness theorem. (12 lectures)
Introduction to Fourier Analysis:(6 lectures) Basic theory of ordinary differential equations: Existence of local solutions for first order systems, maximal time of existence, finite time blow-up, global solutions. Gronwall inequality, Continuous dependence on initial data and on the vector field on bounded intervals. Examples of linear systems, Fundamental solutions. (6 lectures)
1. Real Analysis by G.B.Folland, John Wiley, 1999.
2. Real And Complex Analysis by W. Rudin, McGraw Hill, 1987.

Differential geometry and topology

(1) Smooth maps, bump functions, smooth partition of unity. Inverse and implicit function theorems.(4 lectures)
(2) Manifolds, tangent space, immersions submersions. Regular and critical values, Sard's theorem. (5 lectures)
(3) Transversality. Embedding manifolds in euclidean spaces. Classification of 1-dim. manifolds. Orientability. (5 lectures)
(4) Intersection theory and applications: Normal bundle and epsilon-nbds; Brouwer's degree of a map, winding number. Brouwer's fixed point theorem, Fundamental Theorem of Algebra, Jordan-Brouwer's separation theorem. (6 lectures)
(5) Vector fields, Poincare-Hopf index theorem, Hopf degree theorem. (4 lectures)3
1. V. Guillemin, and A. Pollack, Differential Topology.
2. A. A. Kosinski, Differential Manifolds. 138, Pure and applied Mathematics, Academic Press.
3. John Milnor, Topology from the differentiable viewpoint, Univ. Press of Virginia, Charlottesville, USA, 1965.


(1) Graph Theory: Connectivity, network flows, matchings, planarity and duality, matrix tree theorem, spectra of graphs, graph colorings, Ramsey theory.
(2) Enumerative Combinatorics: Basic counting coefficients, generating functions, principle of inclusion and exclusion, partitions, exponential formula, Lagrange inversion formula, symmetric functions, Polya theory, posets and mobius inversion.
1. B. Bollobas, Modern Graph Theory, Springer-Verlag, GTM.
2. D. B. West, Graph Theory, Prentice Hall of India.
3. Diestel, Graph Theory, Springer-Verlag, GTM.
4. J. H. van Lint & R. M. Wilson,A course in Combinatorics, Cambridge.
5. R. P. Stanley, Enumerative Combinatorics, Cambridge.

Syllabus for Annual Foundation School-II (December 2004)

Algebra II

(1) Homological algebra: Derived functors, projective modules, injective modules, free and projective resolutions, tensor, exterior and symmetric algebras, injective resolutions, Ext and Tor. ( 12 lectures)
(2) Basic commutative algebra: Prime ideals and maximal ideals, Zariski topology, Nil and Jacobson radicals, Localization of rings and modules, Noetherian rings, Hilbert Basis theorem, modules, primary decomposition, integral dependence, Noether normalization lemma, principal ideal theorem, Hilbert's Nullstellensatz, structure of artinian rings, Dedekind domains. (12 lectures)
1. M. F. Atiyah and I. G. Macdonald, Introduction to commutative algebra.
2. D. Eisenbud, Commutative algebra with a view towards algebraic geometry.

Complex analysis

(1) Analytic functions, Path integrals, Winding number, Cauchy integral formula and consequences. Hadamard gap theorem, Isolated singularities, Residue theorem, Liouville theorem.4
(2) Casorati-Weierstrass theorem, Bloch-Landau theorem, Picard's theorems, Mobius transformations, Schwartz lemma, Extremal metrics, Riemann mapping theorem, Argument principle, Rouche's theorem.
(3) Runge's theorem, Infinite products, Weierstrass p-function, Mittag-Leffler expansion.
Text: Complex analysis by Murali Rao & H. Stetkaer, World Scientific, 1991

Algebraic topology

(1) Basic notion of homotopy; contractibility, deformation etc. Some basic constructions such as cone, suspension, mapping cylinder etc. fundamental group; computation for the circle. Covering spaces and fundamental group. Simplicial Complexes, CW complexes.
(2) Simplicial Complexes, CW complexes. Homology theory and applications: Simplicial homology, Singular homology, Cellular homology of CW-complexes, Jordan-Brouwer separation theorem, invariance of domain, Lefschetz fixed point theorem etc.
(3) Categories and functors; Axiomatic homology theory.
1. E. H. Spanier, Algebraic Topology, Tata-McGraw-Hill
2. A. Hatcher, Algebraic topology, Cambridge University Press.
Number Theory Arithmetic functions, congruences, quadratic residues, quadratic forms, Diophantine approximations, quadratic fields, Diophantine equations.
Text/References :
1. A. Baker, Theory of numbers.
2. K. Ireland and M. Rosen, A classical introduction to modern number theory.


Tentative Schedule of Lectures / Tutorials
  5 th Dec., Mon 6 th Dec.,Tue 7 th Dec.,Wed 8 th Dec.,Thur 9 th Dec.,Fri 10 th Dec.,Sat
     9.00 - 10.00  Registration Alg (RAR)   Alg (RAR) Alg (RAR) Alg (RAR)
     10.30 - 11.30  Inauguration Ana (RRS)   AnaT (ASA) AnaT-ASA DGTOP (RVG)
     11.45 - 12.45  DGTop(RVG)   DGTop(RVG) DGTop(RVG) DGTop(RVG)
    2.15 - 4.15 Alg (RAR) ICM-2002 Ana (RRS) AnaT-RRS AnaT-ASA DgtopT-RVG
Ana (RRS) Film Show Alg (RAR)
     4.30 - 5.30 DGTop(RVG)   DGTopT-RVG AlgT-RAR DGTop (VA) DGTop (VA)
     5.30 - 6.30     AlgT-RAR      
  12 th Dec., Mon 13 th Dec.,Tue 14 th Dec.,Wed 15 th Dec.,Thur 16 th Dec.,Fri 17 th Dec.,Sat
    9.00 - 10.00  Alg (JKV) Alg (JKV) Alg (JKV) Alg (JKV) DGTop(RK) Alg (JKV)
    10.30 - 11.30  Ana (HB) Ana (ASA) Ana (ASA) Ana (ASA) Ana (ASA) Ana (ASA)
    11.45 - 12.45  Alg (JKV) DGTop(RVG) Alg(JKV) DGTop(RVG) DGTop(RVG) Alg (JKV)
    2.15 - 4.15 AlgT-RAR AnaT-ASA DGTopT-RVG AlgT-JKV AnaT-ASA
          Ana (ASA)
    4.30 - 5.30 UM Lectures: Evolution of spaces -Nitin Nitsure DGTopT-RVG DGTop(RK) DGTop(RK)
  19 th Dec.,Mon 20 th Dec.,Tue 21 st Dec.,Wed 22 th Dec.,Thur 23 th Dec.,Fri 24 th Dec.,Sat
9.00 - 10.00  Alg (JKV) Alg (JKV) Alg (SAK) DGTop (RK) Alg (SAK) DGTop(GS)
10.30 - 11.30  Ana (HB) Ana (HB) Ana (HB) Ana (HB) DGTop(RK) Alg (SAK)
11.45 - 12.45  DGTop(RK) DGTop(RK) DGTop(RK) DGTop(RK) DGTopT-RK DGTop(GS)
2.15 - 4.15 AlgT-JKV AlgT-JKV AnaT-HB AnaT-HB AnaT-HB/AlgT-SAK DGTopT-GS/AnaT-ASA
4.30 - 5.30 EOS-NN EOS-NN EOS-NN DGTopT-RK UM - DT AnaT-HB
6.00 - 7.00 DGTopT-RK DGTopT-RK   DGTopT-RK DGTop (RK)  
  26 th Dec., Mon 27 th Dec.,Tue 28 thDec.,Wed 29 th Dec.,Thur 30 th Dec.,Fri 31 st Dec.,Sat
     9.00 - 10.00  Alg (SAK) Alg (SAK) Alg (SAK) Alg (SAK) Alg (SAK) Ana (ASA)
     10.30 - 11.30  Ana (HB) Ana (RRS) Ana (RRS) Ana (RRS) Ana (RRS) Ana (RRS)
     11.45 - 12.45  DGTop(GS) DGTop(GS) DGTop(GS) DGTop(GS) UM - DT* UM - DT*
     2.15 - 4.15 AlgT-SAK AnaT-RRS DGTopT-GS AlgT-SAK AnaT-RRS  
     4.30 - 5.30 UM - DT* DGTopT-GS AlgT-SAK UM - DT* Ana (ASA)  
*:duration of leture is 1 hr. 15 min.s


Algebra RAR- Ravi Rao, JKV- J.K. Verma, SAK- S. A. Katre
Analysis RRS- R.R. Simha, ASA- A. S. Athavale, HB- H. Bhate
Differential Geometry& Topology RVG- R. V. Gurjar, RK- Ravi Kulkarni, GS- G. Santhanam
UM-Lecture Series NN-Nitin Nitsure Evolution of spaces  
  DT-Dinesh Thakur Applications of Galois Theory Ideas  


Algebra   Shripad Garge, Anuradha Garge,      Himanee Apte    
Analysis   Anand Mangasuli Sameer Chavan Pratul Gadagkar  
Differential Geometry   B. Tiwari Vikram Aithal


Selected Applicants

List of confirmed participants for AFS-I, Dec. 2005 at Pune.

  1. The participants are requested to come directly to Bhaskaracharya Pratishthana. Can meet Mr. Susheel Joshi, administrative officer at BP (Mobile of him 9881073468) if required.
  2. Accommodation for all the participants has been arranged at Bhaskaracharya Pratishthana's guest house.
  3. Please note that this is not the final list. We are updating it time to time.
  4. The participants who have got letter or mail for selection, need to confirm their participation via mail/ phone/letter.

1. Ms. Rupali S. Deshpande, VIT, Pune
 2. Mr. Pramod Jagannath Patil, I.I.T. Bombay, Powai, Mumbai
 3. Mr. Deepjyoti Goswani, IIT Bombay, Powai, Mumbai
 4. Mr. Santosha Kumar Pattanayak, CMI, Chennai
 5. Ms. Pooja Singla, Chennai
 6. Mr. S. Suresh Kumar, IIT, Chennai
 7. Mr. Ravindra Sen, Indore (M.P.)
 8. Mr. A. Padmanabha Reddy, A.P. Reddy, Kurnool (Dt.) A.P.
 9. Ms. Kavita Sutar, BP, Pune
10. Ms. Swati Kunwar, U. S. Nagar, Uttaranchal
11. Mrs. Huratulmalika J. Siamwalla, Abida Inamdar College, Pune
12. Ms. Gandhi Supriya, Ahmednagar
13. Mr. Pritam Ghosh, IIT-Bombay, Mumbai
14. Ms. Sarita Bondre, Baroda
15. Mr. Sanjay Kumar Singh, ISI, New Delhi
16. Mr. Jaita Haldar, Baroda
17. Ms. R. Lakshmi Lavanya, Chennai
18. Mr. Bhambale Dipak Pratap, Dept. of Maths, Shivaji Univ., Kolhapur
19. Mr. Gourab Bhattacharya, West Bengal
20. Ms. Rupali R. Khedkar, Dept. of Maths, Univ. of Pune, Pune
21. Mr. V. B. Surya Prasad, IIT, Madras, Chennai
22. Mr. Vikas Sopan Jadhav, Pune
23. Mr. Manish C. Agalave, Dept. of Maths, Univ. Pune, Pune
24. Mr. Moreshwar L. Borse, Dept. of Maths, Univ. Pune, Pune
25. Mr. Sonawane Sandip Maruti, Dept. Maths, Univ. Pune, Pune
26. Ms. Vrushali P. Khaladkar, Dept. Maths, Univ. Pune, Pune
27. Ms. Deepa Krushnamurthi, Dept. Maths, Univ. Pune, Pune
28. Ms. Smita Pawar, Dept. Maths, Univ. Pune, Pune
29. Ms. Dipti Aher, Dept. Maths, Univ. Pune, Pune
30. Ms. Padma S. Pingale, BP, Pune
31. Ms. Manjusha S. Joshi, BP, Pune
32. Mr. Dattatray Patil, Nagar
33. Mr. Rupesh More, Dept. Maths, Univ. Pune, Pune
34. Mr. Shirolkar Devendra, Pune
35. Mr. Prasad Bate, Pune
36. Mr. Dhananjay Randhavan, Univ. Pune, Pune
37. Ms. Maryam Yaghoubi, Pune
38. Ms. Zohreh Vaziry, Pune
39. Ms. Ruby Saptarshi, Chennai
40. Mr. Phatangare N. M., Dept. Maths, Univ. Pune, Pune


How to reach

How to Reach Pratishthana- by Air?

Those who are coming by air. Can come to Lohgaon(Pune) airport. BP is about 15 Kms from Lohgaon airport. From Airport, Taxi Fare Rs. 250, Autorickshaw fare Rs. 150. Night Taxi Fare Rs. 400 It takes about 45 minutes to 1 hour to reach the Pratishthana.

How to Reach Pratishthana- by train?

There are 2 railway stations for Pune. One is `Pune station' which is main railway station and other one is 'Shivaji Nagar railway' station, which is small one but near for trains coming from Mumbai(Bombay). Shivaji Nagar Railway station is 4kms from the Pratishthana. From Shivajinagar autorickshaw will take 10-15 minutes. Rates of autorickshaw (8x+2) Rs. Where x=meter reading. In the night (12 am - 5 am) it is 1.5 times (8x+2). At Pune station prepaid autorickshaws are available.

Where as `Pune Railway station' is approximately 8-9 kms, from the Pratishthana. In day time you will take 45 minutes to reach from Pune station and in the night or early morning 25-30 minutes. You can take autorickshaw from Pune railway station to come to the Pratishthana.
Ask him to go to Law College Road. Near `Krishna dining Hall' and front of the `Cafe Coffee Day' there is the lane called `Damle Path'. This lane directly goes to the institute. Also the start of the lane which comes to our institute there is a Management institute named "INDSEARCH". In this lane Bhaskaracharya Pratishthana is located at last plot.

How to Reach Pratishthana- by Bus?

There are three main Bus stands in Pune.

  • Pune station Bus Stand : This bus stand is close to Pune railway station and therefore same autorickshaw information mentioned above from railway station works.
  • Shivajinagar Bus Stand : This bus stand is close to Shivaji Nagar railway station and therefore same autorickshaw information mentioned above from railway station works.
  • Swargate Bus Stand : Swargate Bust stand is 5.5 Kms away from Bhaskaracharya Pratishthana. By auto rickshaw it will take 20- 30 minutes to reach the Bhaskaracharya Pratishthana charges will be around 45 Rs. in day time. in the night it will be 1.5 times of 8x+2, (x is kilometers).


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