Let be a potential and be a solution of the eigenvalue equation

with eigenvalue. Let be a positive (and derivable) function of. Then, the solution of the Schrödinger equation

with time-dependent potential

is given by

We will discuss here an original method to construct time-dependent Hamiltonians which possess algebraic eigenvectors. Let us consider the Schrödinger equation,

with is an eigenfunction with eigenvalue of the Hamiltonian

Note here that this Hamiltonian (or the potential) doesn’t depend on time explicitly, it means that doesn’t enter neither in the eigenvalue, nor in the eigenfunction. Let us pose

As a consequence, the spectral Equation (11) is written as

Let us pose and extend the effective potential of the above equation noted by adding a new term and consider a full Schrödinger equation of the form

The next step is to determine the unknown function so that one can deduce the time-dependent algebraic solutions of the Equation (15) and relate it to (14). Obviously, the above Equation (15) can be developed as follows

which can be rewritten

Manifestly, this equation can be written in terms of (i.e. the first derivative terms of must be omitted (must vanish)) only if the following condition is imposed

with this expression of the function, the Equation (17) takes the following form

Replacing the expression by its equivalent one in this above equation, i.e. as it is given in (14), one can write

which can be rewritten

From this equation, the added term to the initial potential in (15) is easily expressed as

Replacing in this equation by expression (18) and after some algebraic manipulations, one can write

where.

One can easily remark that is real and non-dependent on the eigenvalue only if it is expressed as

This is possible due to the following condition

Solving the above differential equation and after some algebraic manipulations, one can easily obtain the expression of the function

With this expression of the function, the algebraic solutions of the time-dependent Schrödinger equation

with the time-dependent potential

are determined as

where is an arbitrary positive function of and is the eigenvector of the equation

It means that one has constructed a time-dependent potential from the potential which is non time-dependent. This is the generalization of the particular case of potentials considered in Ref. [1] . This is a particular case of ours because one can replace the original potential (i.e. the potential which is non time-de- pendent) in Equation (28) by any one which leads to a time-dependent potential associated to the above solutions as it is given by the Equation (29). These solutions are expressed in terms of the eigenvalues of the Schrödinger equation. The values of depend on a potential considered, i.e. when the potential is quasi-exactly solvable, only a part of the eigenvalues is found algebraically whereas when the potential considered is exactly solvable, all eigenvalues are calculated explicitly. So, we have constructed a generalized formula which helps to find time-dependent potentials, it means that one can deduce for a non time-dependent potential its associated time-dependent one. In the next step, we will use this method established previously, i.e. we will manipulate simply the Equation (28) and Equation (29) respectively to construct the time-dependent Lamé potential and the algebraic solutions of Schrödinger equation. We will also apply the above method to the known QES matrix polynomial operator [5] [6] and interesting remarks will be pointed out.

In this section, along the same lines of the above method, i.e. simply from the Equation (28), we will transform the non time-dependent potential associated to the Lamé equation into the time-dependent one. The Lamé equation is quasi-exactly solvable and the original form is as follows [7] [8]

where the Lamé potential is

is the eigenvalue of the Lamé Hamiltonian and is the Jacobi elliptic function with modulus. This function is periodic (i.e. the Lamé potential is also periodic) with period which denotes the complete elliptic integral of the first type, i.e.

Replacing the potential in the Equation (28) by the above Lamé potential (32), we find the following time-dependent Lamé potential

It is easily observed that this last term in of (34) isn’t periodic so that it spoils the periodicity of the above time-dependent Lamé potential. The above time-dependent Lamé potential (34) can become periodic only if the following condition is satisfied

,

,

,

,

,

,

,

,

where is a real constant.

From the expression of (i.e. (35), the Lamé potential (34) can be now expressed in time as follows

From the above expressions (35) and (36), the time-dependent Schrödinger Equation (1) is of the following form

Referring to the Equation (29) and Equation (35), the algebraic solutions of this Schrödinger equation are obtained

Note that one can deduce from a non time-dependent potential (for which the eigenvalues exist) its corresponding time-dependent one by using the general formula established in Equation (28) while the algebraic solutions of the Schrödinger equation are found from the Equation (29).

The goal of this section is to construct a matrix time-dependent Schrödinger equation by the above method used to find the time-dependent potential of the non coupled Lamé equation. Let us consider the following matrix Hamiltonian [5] [6]

where the potential is 2 × 2 Hermitian matrix of the form

where are the Pauli matrices, is the matrix identity, are free real parameters and is an integer. can be written in the matrix form as follows

where

In this case, the usual non time-dependent eigenvalue Schrödinger equation is of the form

where

with and are respectively the eigenfunction and the eigenvalue of the matrix Hamiltonian. Referring to the original method established in the section 2, one can assume

,

From this change of variable, the Equation (43) takes the following form

,

,

where

After the change of function as

one can write the matrix time-dependent Schrödinger equation such that the initial potential acquires a supplementary term as it was done in the method established previously in the Equation (15)

which leads to

In the next step, we will calculate the function so that the algebraic solutions of the time- dependent Schrödinger equation are deduced. From the above Equation (50), the following system is obtained

Obviously, the two equations of the above system (51) can be linear respectively in and (i.e. the first derivatives of and are omitted) only if the following system is satisfied

One can solve the first equation (or the second equation) in (or in) of this Equation (52) in order to find the expression of

From this expression of, as a consequence, the Equation (50) is written as follows

In the next, the idea is to find the unknown function, for this, one has to consider the derivative with respect to in the second expression of the above equation and after some algebraic manipulations, the Equation (54) is written as fallows

where and.

From the Equation (46), this equality can be considered

in the above Equation (55) and accordingly one can write

As it has shown in the above method, this expression of leads to the Equation (24), Equation (25) and Equation (26).

Finally, from the expression of (26), one can deduce the algebraic solutions of the matrix time-de- pendent Schrödinger equation as follows