English

A Model of Sunspot Number with Modified Logistic Function

Solar and Stellar Astrophysics 2018-12-19 v3

Abstract

Solar cycles are studied with the Version 2 monthly smoothed international sunspot number, the variations of which are found to be well represented by the modified logistic differential equation with four parameters: maximum cumulative sunspot number or total sunspot number xmx_m, initial cumulative sunspot number x0x_0, maximum emergence rate r0r_0, and asymmetry α\alpha. A two-parameter function is obtained by taking α\alpha and r0r_0 as fixed value. In addition, it is found that xmx_m and x0x_0 can be well determined at the start of a cycle. Therefore, a prediction model of sunspot number is established based on the two-parameter function. The prediction for cycles 4234-23 shows that the solar maximum can be predicted with average relative error being 8.8\% and maximum relative error being 22\% in cycle 15 at the start of solar cycles if solar minima are already known. The quasi-online method for determining solar minimum moment shows that we can obtain the solar minimum 14 months after the start of a cycle. Besides, our model can predict the cycle length with the average relative error being 9.5\% and maximum relative error being 22\% in cycle 4. Furthermore, we predict the sunspot number variations of cycle 24 with the relative errors of the solar maximum and ascent time being 1.4\% and 12\%, respectively, and the predicted cycle length is 11.0 (95\% confidence interval is 8.3-12.9) years. The comparison to the observation of cycle 24 shows that our prediction model has good effectiveness.

Keywords

Cite

@article{arxiv.1804.03617,
  title  = {A Model of Sunspot Number with Modified Logistic Function},
  author = {G. Qin and S. -S. Wu},
  journal= {arXiv preprint arXiv:1804.03617},
  year   = {2018}
}

Comments

Accepted by The Astrophysical Journal, 32 pages, 9 figures, 6 tables

R2 v1 2026-06-23T01:19:34.536Z