James Parks

Profile

Data Scientist with over six years of industry experience in artificial intelligence, machine learning, programming and statistics with an academic background in mathematics and research focused on elliptic curves and analytic number theory. Passionate about discovering patterns in data that deliver insightful results to guide strategic business decisions.

Contact

Email: jwa.parks@pm.me
LinkedIn: Profile
Github: Profile

Patents

Sharma; Shantanu K, Parks; James, Grabowiecka; Zofia. 2024. Artificial intelligence identification of early adopter audiences for marketing campaigns. U.S. Patent 11,961,111, filed July 19, 2023, and issued April 16, 2024.

Sharma; Shantanu K, Huang; Yu-Chien, Parks; James, Cownden; Daniel, Tian; Jia Wen. 2022. Artificial intelligence prediction of high-value social media audience behavior for marketing campaigns. U.S. Patent 11,494,811, filed February 24, 2022, and issued August 30, 2022.

Sharma; Shantanu K, Cownden; Daniel, Parks; James, Tian; Jia Wen, Monfared; Keivan, Huang; Yu-Chien. 2021. Artificial intelligence identification of high-value audiences for marketing campaigns. U.S. Patent 11,113,707, filed January 22, 2021, and issued September 7, 2021.

Sharma; Shantanu K, Cownden; Daniel, Parks; James, Lavender; Michael, Tian; Jia Wen. 2020. Artificial intelligence automation of marketing campaigns. U.S. Patent 10,755,291, filed October 25, 2019, and issued August 25, 2020.

Research Publications

(with A. Akbary) On the Lang-Trotter Conjecture for two elliptic curves. Ramanujan J. 49 (2019) no. 3, 585--623.

An asymptotic for the average number of amicable pairs (with an appendix by S. Giri). Math. Proc. Cambridge Philos. Soc. 166 (2019), no. 1, 33--59.

(with D. Fiorilli and A. Södergren) Low-lying zeros of quadratic Dirichlet L-functions: A transition in the Ratios Conjecture. Q. J. Math. 69 (2018), no. 4, 1129--1149.

(with D. Fiorilli and A. Södergren) Low-lying zeros of quadratic Dirichlet L-functions: Lower order terms for extended support. Compos. Math. 153 (2017), no. 6, 119--1216.

(with D. Fiorilli and A. Södergren) Low-lying zeros of elliptic curve L-functions: Beyond the ratios conjecture. Math. Proc. Cambridge Philos. Soc. 160 (2016), no. 2, 315--351.

A remark on elliptic curves with a given number of points over finite fields. SCHOLAR-a scientific celebration highlighting open lines of arithmetic research, 165--179, Contemp. Math., 655, Amer. Math. Soc., Providence, RI, 2015.

Amicable pairs and aliquot cycles on average. Int. J. Number Theory 11 (2015), no. 6, 1751--1790.

(with C. David and D.K. Huynh) One-level density of families of elliptic curves and the Ratios Conjectures. Res. Number Theory 1 (2015), 1:6.

The average number of amicable pairs and aliquot cycles for a family of elliptic curves. Ph.D. Thesis, Concordia University (2013)

A Dixmier-Moeglin equivalence for skew-Laurent polynomial rings. M.Sc. Thesis, Simon Fraser University (2009)

Press Articles

Universal Music Group NV (UMGNF) Q3 2022 Earnings Call. Transcript, pg.8, October 27, 2022.

Ingrooves wins third patent, for AI tech to predict TikTok trends that can translate into upticks in streams, Music Business Worldwide, October 26, 2022.

Ingrooves just won a patent for new music marketing tech that it says ‘drives streams at a rate nearly double that of traditional methods’, Music Business Worldwide, April 6, 2022.

Ingrooves has built its own AI music marketing technology – and been granted a patent for it, Music Business Worldwide, September 4, 2020.