AN UPPER BOUND OF REAL ZEROS OF A RANDOM POLYNOMIAL

Authors

  • P.K.MISHRA Dept. Of mathematics and humanities, college of engineering and technology bhubaneswar bput, odisha, india

Keywords:

Independent, identically distributed random variables, random algebraic polynomial, random algebraic equation, real roots, domain of attraction of the normal law, slowly varying function.

Abstract

A new upper bound for the number of real zeros of a random algebraic polynomial with real coefficients is obtained. It is supposed that the coefficients are in dependent random variables identically distributed with expectation value zero, the variance and the third absolute moment being finite and non-zero.

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Published

2024-08-15

Issue

Vol. 1 No. 7 (2024): INTERNATIONAL CONFERENCE ON ADVANCE SCIENCE AND TECHNOLOGY

Section

Articles

License

Creative Commons License

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

How to Cite

AN UPPER BOUND OF REAL ZEROS OF A RANDOM POLYNOMIAL. (2024). INTERNATIONAL CONFERENCE ON ADVANCE SCIENCE AND TECHNOLOGY, 1(7), 29-32. https://universalconference.us/index.php/icast/article/view/2299