DEEPAK KUMAR SINGH | Mathematics | Best Researcher Award

Dr. DEEPAK KUMAR SINGH | Mathematics | Best Researcher Award

Banaras Hindu University- India

Author Profile

Early Academic Pursuits

CURRICULUM VITAE: Dr. Deepak Kumar Singh’s academic journey began with a solid foundation in the sciences. Born on March 24, 1997, Dr. Singh completed his early education in the Uttar Pradesh (U.P.) Board, Allahabad. He excelled in both high school and intermediate exams, scoring 75.16% and 78.20% respectively, with a focus on science subjects. This strong academic background laid the groundwork for his future pursuits in mathematics.After high school, Dr. Singh enrolled at the University of Allahabad, where he earned his Bachelor of Science (B.Sc.) in Mathematics in 2015, graduating with a commendable 73.11%. His passion for mathematics drove him to further his studies, and he subsequently completed his Master of Science (M.Sc.) in Mathematics at the same university in 2017, achieving an impressive 81.4%.

Professional Endeavors

Dr. Deepak Kumar Singh is currently a Research Scholar in the Department of Mathematics at the Institute of Science, Banaras Hindu University (BHU), Varanasi, India. His academic journey at BHU culminated in the submission of his Ph.D. thesis in 2024, marking a significant milestone in his professional career. Throughout his doctoral studies, Dr. Singh’s research was supervised by esteemed faculty members, ensuring a rigorous and comprehensive exploration of his chosen field.

Contributions and Research Focus

Dr. Singh’s research interests are diverse and impactful, encompassing wavelet analysis, approximation theory, differential and integral equations, and numerical analysis. These areas are critical in advancing both theoretical and applied mathematics. His work in wavelet analysis, for instance, contributes to signal processing and data compression, while his studies in approximation theory provide insights into numerical methods for solving complex mathematical problems.Dr. Singh’s expertise in differential and integral equations is particularly noteworthy, as these equations are fundamental to many scientific and engineering applications. His contributions to numerical analysis, meanwhile, involve developing and refining algorithms to solve mathematical problems efficiently and accurately.

Accolades and Recognition

Dr. Deepak Kumar Singh’s academic excellence has been recognized through several prestigious achievements. He qualified for the CSIR NET in Mathematical Science in December 2019, demonstrating his proficiency and deep understanding of the subject. Additionally, in 2023, he was selected as a Government Lecturer in Mathematics through the Bihar Public Service Commission (BPSC), highlighting his capability to contribute to education and mentor the next generation of mathematicians.

Impact and Influence

Dr. Singh’s work has a profound impact on the mathematical community and beyond. His research in wavelet analysis and numerical methods is essential for various practical applications, including signal processing, image compression, and solving differential equations in engineering and physical sciences. By developing new algorithms and theoretical frameworks, Dr. Singh has advanced the field of mathematics and provided tools that other researchers and practitioners can utilize.His role as a Government Lecturer in Mathematics also positions him as an influential educator, where he can inspire and guide students towards academic and professional success in mathematics.

Legacy and Future Contributions

Looking forward, Dr. Deepak Kumar Singh’s contributions to mathematics are expected to leave a lasting legacy. His work in wavelet analysis and numerical methods will continue to influence research and practical applications in various fields. As an educator, he will play a pivotal role in shaping the future of mathematics education, fostering a new generation of thinkers and problem-solvers.Dr. Singh’s ongoing research and potential future projects promise to further enrich the field of mathematics. His commitment to advancing mathematical knowledge and his dedication to teaching ensure that his impact will be felt for years to come.

Abhishek Yadav | Mathematics | Best Researcher Award

Mr. Abhishek Yadav | Mathematics | Best Researcher Award

K K BIRLA BITS Pilani, Goa Campus- India

Author Profile

Early Academic Pursuits

Abhishek Yadav, an Indian national born on September 8, 1992, has demonstrated a profound commitment to the field of mathematics from a young age. His academic journey began at Seth Shiv Lal Public School, Panthroli, where he completed his matriculation with a notable percentage of 74.17% in 2008. He continued his secondary education at Shaheed Colonel J P Janu Govt. Sr. Sec. School, Jhunjhunu, securing a percentage of 70.91% in 2010. Yadav’s dedication to mathematics became more evident as he pursued his Bachelor of Science degree in Science at Shri Radheshyam R. Morarka Govt. College, Jhunjhunu, achieving an impressive 70.95% in 2014. This solid foundation propelled him to further his studies at the prestigious Indian Institute of Technology Delhi (IIT Delhi), where he earned a Master of Science in Mathematics with a CGPA of 6.55 in 2017.

Professional Endeavors

Upon completing his M.Sc., Abhishek Yadav embarked on his Ph.D. journey at BITS Pilani KK Birla Goa Campus under the supervision of Prof. Amit Setia. His research focused on numerical analysis, specifically the “Numerical Method to Solve Singular Integral Equations with Its Application to Crack Problems.” During his Ph.D., Yadav also served as a Teaching Assistant, where he imparted knowledge in courses such as Probability and Statistics, Mathematics I (Calculus), and Mathematics II (Linear Algebra and Complex Analysis) to B.Tech and M.Sc. students. Additionally, he mentored students in the B.Sc. Online Wilp course and evaluated papers in Calculus, Linear Algebra, and Probability & Statistics.

Contributions and Research Focus

Abhishek Yadav’s research interests lie in Singular Integral Equations, Residual-Based Galerkin Scheme, Finite Element Method, and Differential Equations. His contributions to the field are evidenced by his publications in reputable journals. In 2023, he co-authored papers such as “ERROR ANALYSIS OF A RESIDUAL-BASED GALERKIN’S METHOD FOR A SYSTEM OF CAUCHY SINGULAR INTEGRAL EQUATIONS WITH VANISHING ENDPOINT CONDITIONS” and “ERROR ANALYSIS OF CHEBYSHEV POLYNOMIAL-BASED NUMERICAL METHOD FOR SYSTEM OF HYPERSINGULAR INTEGRAL EQUATIONS.” His work continued in 2024 with a significant publication, “A GEGENBAUER POLYNOMIAL-BASED NUMERICAL TECHNIQUE FOR A SINGULAR INTEGRAL EQUATION OF ORDER 4 AND ITS APPLICATION TO A CRACK PROBLEM,” which highlighted innovative numerical techniques and their applications.

Accolades and Recognition

Abhishek Yadav’s academic excellence is reflected in his numerous achievements. He ranked 147th in the CSIR-UGC JRF-June 2018, 600th in GATE 2017, and 203rd in IIT JAM-2014. His proficiency in both applied and pure mathematics is complemented by his skills in teaching, research, and experiments. Yadav is also adept with various technical tools such as LATEX, MS Word, Matlab, C, Mathematica, and Octave.

Impact and Influence

Throughout his academic and professional journey, Abhishek Yadav has participated in several workshops and faculty development programs (FDPs). Notably, he attended the Advanced Training School on Numerical PDEs and Inverse Problems at IIT Tirupati in December 2019 and the FDP on Advances in Non-linear Dynamics: Method and Applications (ANDMA 2024) organized by VIT-AP in June 2024. These experiences have enriched his understanding and expertise, allowing him to make significant contributions to the field of mathematics.

Legacy and Future Contributions

Abhishek Yadav’s legacy in the field of mathematics is marked by his innovative research and dedication to education. His work on numerical algorithms and theoretical ones has provided significant results, enhancing the understanding and application of mathematical concepts. As he continues his research, Yadav aims to explore new frontiers in numerical analysis and differential equations, contributing to the advancement of mathematical knowledge.