Mr. Bikash Chakraborty

Assistant Professor
Ramakrishna Mission Vivekananda Centenary College, India

Highest Degree
Ph.D. Student in Science from University of Kalyani, India

My URL
https://livedna.org/91.24550

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Area of Interest:

Mathematics
Complex Analysis
Element Method
Mathematical Analysis
Derivations

Selected Publications

  1. Banerjee, A. and B. Chakraborty, 2018. On the uniqueness of power of a meromorphic function sharing a set with its k-th derivative. J. Indian Math. Soc., 85: 1-15.

  2. Chakraborty, B., 2017. A simple proof of the Chuang's inequality. Analele Univ. Vest, Timisoara, Seria Matematica Inf., 55: 85-89.

  3. Banerjee, A., S. Majumder and B. Chakraborty, 2017. Further results on uniqueness of derivatives of meromorphic functions sharing three sets. J. Contemp. Math. Anal., 52: 61-71.

  4. Banerjee, A., B. Chakraborty and S. Mallick, 2017. Further investigations on fujimoto type strong uniqueness polynomials. Filomat, 31: 5203-5216.

  5. Banerjee, A. and B. Chakraborty, 2017. On some sufficient conditions of strong uniqueness polynomials. Adv. Pure Applied Math., 8: 1-13.

  6. A. Banerjee and B. Chakraborty, 2017. A note on uniqueness of meromorphic functions and their derivatives sharing two sets. Applied Math. E-Notes, 17: 164-176.

  7. Chakraborty, B., 2016. Pythagorean theorem from heron’s formula: Another proof. Resonance, 21: 653-655.
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  8. Chakraborty, B., 2016. A simple proof of the fundamental theorem of algebra. Math. Stud., 85: 103-104.

  9. Banerjee, A. and B. Chakraborty, 2016. Uniqueness of the power of meromorphic functions with its differential polynomial sharing a set. Math. Moravica, 20: 1-14.

  10. Banerjee, A. and B. Chakraborty, 2016. Some further study brϋck conjecture. Stiint. Univ. Al. I. Cuza lasi Mat., 62: 501-513.

  11. Banerjee, A. and B. Chakraborty, 2016. On the generalizations of bruck conjecture. Commun. Korean Math. Soc., 32: 311-327.

  12. Banerjee, A. and B. Chakraborty, 2016. Further results on the uniqueness of meromorphic functions and their derivative counterpart sharing one or two sets. Jordan J. Math. Stat., 9: 117-139.

  13. Banerjee, A. and B. Chakraborty, 2015. Further investigations on a question of zhang and lu. Ann. Univ. Paedagogicae Cracoviensis. Stud. Math., 14: 105-119.

  14. Banerjee, A. and B. Chakraborty, 2015. A new type of unique range set with deficient values. Afrika Mat., 26: 1561-1572.
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Member since July, 2018