Open Access

On the integrability of the Hamiltonian systems with homogeneous polynomial potentials

Jaume Llibre
Jaume Llibre
 and 
Xiang Zhang
Xiang Zhang
   | Dec 31, 2018
Applied Mathematics and Nonlinear Sciences's Cover Image
About this article
Previous Article
Next Article
Cite
Published Online: Dec 31, 2018
Page range: 527 - 536
Received: Sep 24, 2018
Accepted: Dec 24, 2018
DOI: https://doi.org/10.2478/AMNS.2018.2.00041
Keywords
© 2018 J. Llibre and X. Zhang, published by Sciendo
This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 License.

Non–equivalent integrable homogeneous potentials of degree 4.

CasePotential of degree 4
Viα(q2iq1)i(q2+iq1)4−i   for i = 0,1,2,3,4.
V5αq24$\begin{array}{} \alpha q_2^4 \end{array} $
V6αq14/4+q24$\begin{array}{} \alpha q_1^4/4+q_2^4 \end{array} $
V74q14+3q12q22+q24/4$\begin{array}{} 4q_1^4+3q_1^2q_2^2+q_2^4/4 \end{array} $
V82q14+3q12q22/2+q24/4$\begin{array}{} 2q_1^4 + 3q_1^2 q_2^2/2+q_2^4/4 \end{array} $
V9(q12+q22)2/4$\begin{array}{} (q_1^2+ q_2^2)^2/4 \end{array} $
V10q12(q1+iq2)2+(q12+q22)2/4$\begin{array}{} -q_1^2(q_1+ i q_2)^2+(q_1^2+ q_2^2)^2/4 \end{array} $

Non–equivalent integrable homogeneous potentials of degree 3. Here i=−1.$\begin{array}{} i= \sqrt{-1}. \end{array} $

CasePotentials of degree 3
V1q13$\begin{array}{} q_1^3 \end{array} $
V2q13/3+cq23/3$\begin{array}{} q_1^3/3+cq_2^3/3 \end{array} $
V3aq13/3+q12q2/2+q23/6$\begin{array}{} aq_1^3/3+q_1^2q_2/2+q_2^3/6 \end{array} $
V4q12q2/2+q23$\begin{array}{} q_1^2q_2/2 +q_2^3 \end{array} $
V5±7q13i/15+q12q2/2+q23/15$\begin{array}{} \pm 7q_1^3 i/15+q_1^2q_2/2+q_2^3/15 \end{array} $
V6q12q2/2+8q23/3$\begin{array}{} q_1^2q_2/2 +8q_2^3/3 \end{array} $
V7±1714q13i/90+q12q2/2+q23/45$\begin{array}{} \pm 17 \sqrt{14}q_1^3 i/90+q_1^2q_2/2+q_2^3/45 \end{array} $
V8±3q13i/18+q12q2/2+q23$\begin{array}{} \pm \sqrt{3}q_1^3 i/18+q_1^2q_2/2+q_2^3 \end{array} $
V9±33q13i/10+q12q2/2+q23/45$\begin{array}{} \pm 3 \sqrt{3}q_1^3 i/10+q_1^2q_2/2+q_2^3/45 \end{array} $
V10±113q13i/45+q12q2/2+q23/10$\begin{array}{} \pm 11\sqrt{3}q_1^3 i/45+q_1^2q_2/2+q_2^3/10 \end{array} $

All non–equivalent integrable Hamiltonian systems (1) having homogeneous polynomial potentials of degree 3 with their polynomial first integrals independent of the Hamiltonian.

PotentialFirst integral
V0F0 = p1p2i,
V1F1=9p12i+6p1p2+3p22i16aq13+24aq12q2i+8aq23i,$\begin{array}{} F_1= 9 p_1^2 i + 6 p_1 p_2 + 3 p_2^2 i - 16 a q_1^3 + 24 a q_1^2 q_2 i + 8 a q_2^3 i, \end{array} $
V2F2=9p12i+6p1p23p22i16aq1324aq12q2i8aq23i,$\begin{array}{} F_2=-9 p_1^2 i+ 6 p_1 p_2 - 3p_2^2 i- 16 a q_1^3 - 24 a q_1^2 q_2 i - 8 a q_2^3 i, \end{array} $
V3F3 = p1 + p2i,
V4F4 = p2,
V5F5=3p12+2q13,$\begin{array}{} F_5=3 p_1^2 + 2 q_1^3, \end{array} $
V6F6=8p1p2q1+8p12q2q12(q12+4q22),$\begin{array}{} F_6=-8 p_1 p_2 q_1 + 8 p_1^2 q_2 - q_1^2 (q_1^2 + 4 q_2^2), \end{array} $
V7F7=72p1436p1p2q133q16+2(3p22+16q23)(3p22+6q12q2+16q23)+12p12(3p22+12q12q2+16q23),$\begin{array}{} F_7=72 p_1^4 - 36 p_1 p_2 q_1^3 - 3 q_1^6 + 2 (3 p_2^2 + 16 q_2^3)(3 p_2^2 + 6 q_1^2 q_2 + 16 q_2^3)+ 12 p_1^2 (3 p_2^2 + 12 q_1^2 q_2 + 16 q_2^3), \end{array} $
V8±$\begin{array}{} V_8^{\pm} \end{array} $F8±=q16±63q15q2i+27q14q22±63q13(p12+p22+2q23)i+54q12q2(p12+p22+2q23)+27(p12+p22+2q23)2.$\begin{array}{} F_8^{\pm}= -q_1^6 \pm 6 \sqrt{3}q_1^5 q_2 i+ 27 q_1^4 q_2^2 \pm 6 \sqrt{3}q_1^3 (p_1^2 + p_2^2 + 2 q_2^3) i + 54 q_1^2 q_2 (p_1^2 + p_2^2 + 2 q_2^3) + 27 (p_1^2 + p_2^2 + 2 q_2^3)^2. \end{array} $

All non–equivalent integrable Hamiltonian systems (1) having homogeneous polynomial potentials of degree 4 with their polynomial first integral independent of the Hamiltonian.

PotentialFirst integral
V0F0 = p1p2i,
V1F1=2p1p22p22i+αq14i+6αq12q22i+8αq1q233αq24i,$\begin{array}{} F_1= 2 p_1 p_2-2p_2^2 i+\alpha q_1^4 i+6 \alpha q_1^2 q_2^2 i+8 \alpha q_1 q_2^3-3 \alpha q_2^4 i, \end{array} $
V2F2 = p2q1p1q2,
V3F3=2p1p2+2p22iαq14i6αq12q22i+8αq1q23+3αq24i,$\begin{array}{} F_3= 2 p_1 p_2+2p_2^2 i-\alpha q_1^4 i-6\alpha q_1^2 q_2^2 i+8 \alpha q_1 q_2^3+3 \alpha q_2^4 i, \end{array} $
V4F4 = p1 + p2i,
V5F5=p22+2αq24,$\begin{array}{} F_5= p_2^2+2 \alpha q_2^4, \end{array} $
V6F6=p22+2q24,$\begin{array}{} F_6= p_2^2+2 q_2^4, \end{array} $
V7F7=p1p2q2+p22q12q13q22q1q24,$\begin{array}{} F_7= -p_1 p_2 q_2+p_2^2 q_1-2 q_1^3 q_2^2-q_1 q_2^4, \end{array} $
V8F8=p14+2p12p22+8p12q14+6p12q12q22+4p1p2q1q23+8p22q14+16q18+24q16q22+12q14q24+2q12q26,$\begin{array}{} F_8= p_1^4+2 p_1^2 p_2^2+8 p_1^2 q_1^4+6 p_1^2 q_1^2 q_2^2+4 p_1 p_2 q_1 q_2^3+8 p_2^2 q_1^4 +16 q_1^8+24 q_1^6 q_2^2+12 q_1^4 q_2^4+2 q_1^2 q_2^6, \end{array} $
V9F9 = p1q2p2q1,
V10F10=p12+3p1p2i2p22+(q1q2i)3q2.$\begin{array}{} F_{10}= p_1^2 +3 p_1 p_2 i-2p_2^2 +(q_1 -q_ 2 i)^3 q_2. \end{array} $
eISSN:
2444-8656
Language:
English
Publication timeframe:
2 times per year
Journal Subjects:
Life Sciences, other, Mathematics, Applied Mathematics, General Mathematics, Physics
Journal RSS Feed