Study of a Polynomial I + aE + bE2 in ( λ, μ) Jection of Third Order

Authors

  • Dr. Rajiv Kumar Mishra  Associate Professor, Department of Mathematics, Rajendra College Chapra, J. P. University, Chapra, Bihar, India

Keywords:

(λ, μ)-jection, projection

Abstract

In this paper, I study a polynomial of form I+aE+bE2, where E is a (λ, μ)-jection; a,b being scalars. I investigate when I+aE+bE2 is a (?, ?)-jection.

References

  1. Chandra, P:
  2. “Investigation into the theory of operators and linear spaces” (Ph.D. Thesis, Patna University, 1977)
  3. Dunford, N. and Schwartz, J.: “Linear operators, part I” Interscience publishers, Inc., New York, 1967, P. 37
  4. Rudin, W.: “Functional Analysis”, McGraw- Hill Book Company, Inc., New York, 1973, p. 126.
  5. Mishra, R.K., "On A Special Type of Operator, Called ?-Jection of Third Order", International Journal of Scientific Research in Science and Technology (IJSRST), Online ISSN : 2395-602X, Print ISSN : 2395-6011, Volume 4 Issue 2, pp. 2321-2328, January-February 2018.

International Journal of Scientific Research in Science, Engineering and Technology

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Published

2020-04-20

Issue

Volume 7, Issue 2, March-April-2020

Section

Research Articles

License

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This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

[1]
Dr. Rajiv Kumar Mishra, " Study of a Polynomial I + aE + bE2 in ( λ, μ) Jection of Third Order, International Journal of Scientific Research in Science, Engineering and Technology(IJSRSET), Print ISSN : 2395-1990, Online ISSN : 2394-4099, Volume 7, Issue 2, pp.706-710, March-April-2020.