Conservation Law s for CKdV and BSSK System s

2015-03-29 08:26:24KANGZhouzheng

Journal of Partial Differential Equations 2015年3期

KANG Zhouzheng

CollegeofM athematics,InnerM ongoliaUniversity forNationalities,

Tongliao028043,China.

Received 26 June 2015;A ccep ted 1 August 2015

Conservation Law s for CKdV and BSSK System s

KANG Zhouzheng?

CollegeofM athematics,InnerM ongoliaUniversity forNationalities,

Tongliao028043,China.

Received 26 June 2015;A ccep ted 1 August 2015

.In cu rrent paper,the coup led KdV(CKdV)system and Bosonized Supersymm etric Saw ada-Kotera(BSSK)system are considered.Som e linearly independent conservation law s for the tw o system s are derived via the fi rst hom otopy app roach and sym bolic com putation.

Coup led KdV system;Bosonized Supersymm etric Saw ada-Kotera system;conservation law s.

1 In troduction

It is w ell know n that one o f the im portant p roblem s in the fi elds o fm athem atics and physics is to construct asm any as possible conservation law s of nonlinear d ifferential system(NLDS).Conservation law s describeessentialphysicalp ropertiesof them odeled process.And in the study of d ifferential system,especially integrable system and soliton theory,conservation law s p lay a key role.Conservation law s have som e app lications in find ing exact solu tions,analyzing various characteristics of solu tions,and d iscussing the qualitative p ropertiessuch as thebi-or tri-Ham iltonian structures,Liouville integrability, recu rsion operators and so forth.A sequence ofm ethods,such as N ¨oether’s theorem [1],m ultip lierm ethod[2],the fi rst hom otopy m ethod[3,4],Lax pair m ethod[5]and others,have been w ell established and used.How ever,am ong thesem ethods,the fi rst hom otopym ethod has itsadvantage in dealing w ith com p licated form sofm ultip liersor equationsby using hom otopy operatorsarising from d ifferen tialgeom etry.

We begin in Section 2 by listing som e definitions and theorem s related w ith the fi rst hom otopy m ethod.In Section 3 and Section 4,w e app ly the fi rst hom otopy m ethodto construct som e linearly independen t conservation law s of CKdV and BSSK system s respectively.Finally,a shortsumm ary isgiven.

2 Prelim inaries

Conservation law s for a NLDSoforder k,

w ith independentvariables x ≡ (x1,x2,···,xn)and dependentvariables u ≡ (u1,u2,···, um),arew ritten by scalar d ivergence exp ressions

w here Φxi(i=1,2, ···,n)rep resen t fl uxes and totalderivative operators

In order to determ ine som e conservation law s for system(2.1),one fi rstly needs to find m ultip liers?Λα= Λα(x,U, ?U, ···, ?lU)?Nα=1,such thata linear com bination ofequations isa d ivergence exp ression,i.e.,

w h ich ho lds identically for arbitrary functions U(x).The fo llow ing defin itions and theorem s(see[3,4])are necessary.

Theorem 2.1.A set ofnon-singularmultipliers?Λα= Λα(x,U,?U,···,?lU)?Nα=1yields a local conservation law ofsystem(2.1)ifand only ifthe identities

hold forarbitrary functionsU(x).

Definition 2.1.Then-dimensional Euleroperatorw ith respect to U(x1,x2, ···,xn)isgiven by

w here U(k1+k2+···+kn)= ?k1+k2+···+knU/?k1x1 ?k2x2 ···?knxn.

Definition 2.2.The n-dimensional homotopy operator corresponding to independent variables xiisdefined by

where U(x)=?U1,U2,···,Um?,f isan exact differential function and for j=1,···,m,

Theorem 2.2.Assume that f is expressed asa divergence form

Ifexpressions(2.2)converge,then Φxi=H(xi)U(f)(i=1,2, ···,n)are the corresponding fluxes ofa conservation law.

3 CKdV system

First,w e study the CKdV system w hich is used to describe tw o-layer fl uids in d ifferent d ispersion relations.The requ irem ent b2=5 yielded that this system is a Painlev′e in tegrablem odelw ith d ifferen t linear d ispersion relations[6].Eqs.(3.1)and(3.2)w ere p roved to be also Lax integrable by a prolongation technique,and M iu ra transform ation and m od ified KdV equation associated w ith this system w ere p resen ted[7].In add ition,the sim ilarity so lu tions and reduction equationsw ere given via Clarkson and Kruskal’s d irectm ethod[8].

Herew e suppose thatm u ltip liers Λ1and Λ2are functionsw ith respect to(t,x,U,V, Ux,Vx).With theaid ofGeM[4],the determ ining equations for{Λ1,Λ2}are

The solu tionsare then obtained by solving theabove equations

w here C1and C2are arbitrary constants.Exp licitly,accord ing to the free constants,tw o cases can begiven as follow s.Herew eonly list the resu lts instead of derivations.

Case 1:By letting C1=1,C2=0,w ehave

For this case,the density and fl ux are

nam ely,a conservation law isgiven by

Case 2:By letting C2=1,C1=0,w ehave

For this case,the correspond ing density and fl ux are

Hence,the second conservation law isgiven by

4 BSSK system

The BSSK system reads

w hich w as derived through app lying bosonization m ethod to a SSK system.Moreover, Eq.(4.1)is the usualSK equation.Eq.(4.2)is linear nonhom ogeneous in v.Eqs.(4.3)and (4.4)are linear hom ogeneous in p and q respectively.In[9],the symm etry analysisw as perform ed to illustrate that thissystem is invariantunder scaling transform ations,spacetim e translations and Galilean boosts.And a seriesof reduction equationsand sim ilarity so lu tionsw ere p roposed.

In investigating the conservation law s for the BSSK system,w e assum e thatm ultip liers Λ1,Λ2,Λ3,and Λ4depend on(t,x,U,V,P,Q,Ux,Vx,Px,Qx).Then,the determ ining equations for the setofm u ltip liers{Λ1,Λ2,Λ3,Λ4}are

Solving the resu lting equations leads to w here C1,C2,C3,C4,and C5are arbitrary constants.Next,a case by case analysis for free constants can resu lt in linearly independent conservation law s.

Case 1:If C1=1,C2=C3=C4=C5=0,then w e can get