Abstract:
We investigate solutions to a hierarchy for N = 2 case when V0 = 0 of WittenDijkgraaf-E.Verlinde-H.Verlinde (WDVV) equations. We give a description of nonlinear partial
differential equations of associativity in 2D topological field theories (for some special type solutions
of the Witten-Dijkgraaf-E.Verlinde-H.Verlinde (WDVV) system) as integrable nondiagonalizable
weakly nonlinear homogeneous system of hydrodynamic type.The article discusses nonlinear equations of the third order for a function f = f(x, t)) of two independent variables x,t. The equations
of associativity reduce to the nonlinear equations of the third order for a function f = f(x, t))
when prepotential F dependet of the metric η . In this work we consider the WDVV equation for
n = 3 case with an antidiagonal metric η . The solution of some cases of hierarchy when N = 2
and V0 = 0 equations of associativity illustrated. Lax pairs for the system of three equations, that
contains the equation of associativity are written to find the hierarchy of associativity equation.
Using the compatibility condition are found the relations between the matrices U, V2, V1 . The elements of matrix V2 are found with the expression of zij and independent and dependent variables
for the matrix V2 . Also solving elements of matrix V1 expressed through yij and independent
and dependent variables for the matrix V1 . We accepted that elements of matrix V0 are zero. In
the physical setting the solutions of WDVV describe moduli space of topological conformal field
theories. In the above variables the nonlinear equations of the third order for a function f = f(x,t))
we rewritten as a new system of three equations. It is found the relationship between the elements at, bt, ct and yijx of the matrices Ut, V1x . It is found that only z11, z12, z13 are independent elements of V2 , and the other elements can be written in terms of them. Expressed are variables at, bt, ct of three equations are written with the help of matrix elements z12, z13, y12, y13.