Abstract

Let be a real-valued polynomial function of the form , where the degree of in is greater than or equal to . For arbitrary polynomial function , , we will find a polynomial solution to satisfy the following equation: (): , where is a constant depending on the solution , namely, a quasi-coincidence (point) solution of (), and is called a quasi-coincidence value. In this paper, we prove that (i) the leading coefficient must be a factor of , and (ii) each solution of () is of the form , where is arbitrary and is also a factor of , for some constant , provided the equation has infinitely many quasi-coincidence (point) solutions.

1. Introduction and Preliminaries

Let (where is an algebraic number) be a polynomial function. Lenstra [1] investigated that . He solved a polynomial function and derived to find a polynomial satisfying an as a fixed point of the polynomial equation. That is, has a polynomial solution .

Further, Tung [2, 3] extended (1) to solve ( is a field) for the following equation: where is a constant depending on the polynomial solution and a given positive integer.

Recently, Lai and Chen [4, 5] extended (2) to solve to satisfy the polynomial equation as the form: where , is an irreducible polynomial in and the polynomial function is written by where denotes the degree of in .

Definition 1 (see [4]). A polynomial function satisfying (3) is called a quasi-fixed solution corresponding to some real number . This number is called a quasi-fixed value corresponding to the polynomial solutions .

In mathematics, a coincidence point (or simply coincidence) of two mappings is a point in their domain having the same image point under both mappings. Coincidence theory (the study of coincidence points) is, in most settings, a generalization of fixed point theory.

In this paper, we define a more general coincidence (point) problem in which the is replaced by the irreducible polynomial power throughout this paper, where is an arbitrary polynomial. Then, we restate (3) as the following equation: It is a new development coincidence point-like problem. We call the polynomial solution for (5) as a quasi-coincidence (point) solution. Precisely, we give the following definition like Definition 1.

Definition 2. A polynomial function satisfying (5) is called a quasi-coincidence (point) solution corresponding to some real number . This number is called a quasi-coincidence value corresponding to the polynomial solutions .

The number of all solutions in (5) may be infinitely many, or finitely many, or not solvable.

Since there may have many solutions corresponding to the number , for convenience, we use the following notations to represent different situations: (1), the set of all quasi-coincidence solutions satisfying (5), (2), the set of all quasi-coincidence values satisfying (5), (3), the set of all quasi-coincidence solutions corresponding to a fixed quasi-coincidence value . Evidently, for any in . Moreover, for each , the cardinal number of , denoted by , satisfies the following condition:

In Section 2, we derive some properties of quasi-coincidence solutions of . If (5) has infinitely many quasi-coincidence solutions, the concerned properties are described in Section 3.

Throughout the paper, we denote the polynomial function by

2. Auxiliary Lemmas

For convenience, we explain some interesting properties of quasi-coincidence point solutions as the following lemmas. Throughout this paper, we consider (5) for polynomial function (9) and arbitrary polynomial in .

Lemma 3. Let , , in . Then, and this is divisible ; that is, .

Proof. Since in correspond to in , respectively, thus Subtracting the above two equations and using binomial formula, it yields where , for . Evidently, the factor is divisible to the term .
Since , for a real number and some factor of .

In Lemma 3, the difference of any two distinct quasi-coincidence solutions corresponding to distinct values is a factor of . Thus, we define a class of this factor as follows.

Notation. (i) Let be a factor of , and we denote .

(ii) Let be an arbitrary polynomial in , and we denote .

It is obvious that for any , , then the cardinal number

For convenience, we explain the relations of and in the following lemma.

Lemma 4. Let for some , then

Proof. For any , then for some . By Lemma 3, we have for some factor of . Then, That is, Moreover, by (6), , then it follows that

We will use the definitions of “the pigeonhole principle;” it could concert to Grimaldi [6], and the relation can be explained as the following lemma.

Lemma 5. Suppose that the cardinal number . For any , there exists a factor of such that the cardinal number

Proof. Let , then for some . Since and , by Lemma 4, we obtain it yields
Moreover, the number of all factor of is at most , by pigeonhole’s principle, it leads to for some factor of .

In order to know if the intersection of two sets still has infinite solutions, we state the following result to give an explanation.

Lemma 6. Suppose that the cardinal number , for any , there exist some factors and of such that

Proof. Let and since , by Lemma 5, there exists a factor of such that Moreover, , by Lemma 4, for some constant and some factor of . Thus, Since and the number of all factor to is at most , by pigeonhole’s principle and (25), we have for some factor of .

Up to now, we have not shown that the factor is uniquely existed. Eventually, if the number of all solutions is infinitely many, then the factor of is unique up to the choice of the solution .

Lemma 7. Assume that the cardinal number , then for any , , one has for some constant and some factor of (this is independent to the choice of and ).

Proof. Let , by Lemma 6, we have for some factors , of .
Let , then By Lemma 6, it yields for some constants , , , and , and consequently This implies that and . Therefore, Consequently, the factor is uniquely existed.

By the above preparations, at first we consider the polynomial function with as the form Then, we consider the theorem of problem as In the following theorem, we integrate the above type as follows.

Theorem 8. Let be a polynomial function with as the form for some (where polynomial function is given). If the cardinal number , then (i) is some factor of , (ii)any solution of (5) is of the form: for some and some factor of ,(iii)the cardinal number .

Proof. Since , we see that there are two distinct quasi-fixed values , corresponding to two distinct solutions , in such that
(i) It follows that By (40)-(41), we get It follows that must be a factor of and
(ii) By (40), we have Thus, (i) and (45) imply , and by (44), can be written as Moreover, we derive For any , we have for some . By (47) and (48), it follows that Hence, Then, Therefore, (Note that this is only dependent on the choice of and .)
(iii) Actually in (ii), for any , is also a quasi-coincidence solution for . The reason is This shows that () has infinitely many solutions (i.e., ).

Remark 9. Notice that in the case of and , the number of all quasi-coincidence values cannot be larger than . Otherwise, it will contract the result of Theorem 8; the case (iii) means that “, and then ”.