Barnes-Godunova-Levin type inequality of the Sugeno integral for an \((\alpha,m)\)-concave function

In this paper, a Barnes-Godunova-Levin type inequality for the Sugeno integral based on an \(( {\alpha,m} )\)-concave function is proved. Some examples are given to illustrate the validity of these inequalities. Finally, several important results, as special cases of an \(( {\alpha,m} )\)-concave function, are also obtained.

As a tool for modeling non-deterministic problems, the theory of fuzzy measures and fuzzy integrals was introduced by Sugeno in [1]. Many authors generalized the Sugeno integral by using some other operators to replace the special operator(s) ∨ and/or ∧ and introduced Choquet-like integral [2], Shilkret integral [3], ⊥-integral [4], and pseudo-integral [5]. Suárez and Gil [6] presented two families of fuzzy integrals, the so-called seminormed fuzzy integral and semiconormed fuzzy integral. Wang and Klir [7] provided a general overview on fuzzy measurement and fuzzy integration.

Recently, Flores-Franulič et al. [8–21] generalized several classical integral inequalities of the Sugeno integral. Agahi et al. [22] proved a general Barnes-Godunova-Levin type inequality of the Sugeno integral for a concave function. In [23], Mihesan introduced the concept of \(( {\alpha,m} )\)-convex function. For recent results and generalizations concerning m-convex and \(( {\alpha,m} )\)-convex functions, we refer to [24–26]. The purpose of this paper is to prove a Barnes-Godunova-Levin type inequality for the Sugeno integral based on an \(( {\alpha,m} )\)-concave function. Some examples are given to illustrate the results.

After some preliminaries and summarization of previous known results in Section 2, Section 3 deals with a Barnes-Godunova-Levin type inequality for the Sugeno integral, and some examples are given to illustrate the results. Finally, as special cases, some remarks are obtained.

In this section, we recall some basic definitions or properties of a fuzzy integral and an \(( {\alpha,m} )\)-concave function. For details, we refer the reader to Refs. [1, 7, 23].

Suppose that ℘ is a σ-algebra of the subsets of X, and let \(\mu:\wp \to[0,\infty)\) be a non-negative, extended real-valued set function. We say that μ is a fuzzy measure if it satisfies:

1. (1)

   \(\mu ( \emptyset ) = 0\);

2. (2)

   \(E,F \in\wp\) and \(E \subset F\) imply \(\mu ( E ) \le\mu ( F)\);

3. (3)

   \(\{ {{E_{n}}} \} \subset\wp\), \({E_{1}} \subset {E_{2}} \subset \cdots\), imply \({\lim_{n \to\infty}}\mu ( {{E_{n}}} ) = \mu ( {\bigcup_{n = 1}^{\infty}{{E_{n}}} } )\);

4. (4)

   \(\{ {{E_{n}}} \} \subset\wp\), \({E_{1}} \supset {E_{2}} \supset \cdots\), \(\mu ( {{E_{1}}} ) < \infty\), imply \({\lim_{n \to\infty}}\mu ( {{E_{n}}} ) = \mu ( {\bigcap_{n = 1}^{\infty}{{E_{n}}} } )\).

Definition 2.1

(Mihesan [23])

The function \(f: [ {0,b} ] \to R\) is said to be \(( {\alpha,m} )\)-concave, where \(( {\alpha,m} ) \in { [ {0,1} ]^{2}}\), if for every \(x,y \in [ {0,b} ]\) and \(t \in [ {0,1} ]\), it satisfies

Note that for \(( {\alpha,m} ) \in \{ { ( {0,0} ), ( {\alpha,0} ), ( {1,0} ), ( {1,m} ), ( {1,1} ), ( {\alpha,1} )} \}\) one obtains the following classes of functions: decreasing, α-starshaped, starshaped, m-concave, concave and α-concave.

If f is a non-negative real-valued function defined on X, we denote the set \(\{ x \in X: f ( x ) \ge\alpha \} = \{ {x \in X:f \ge\alpha} \}\) by \({F_{\alpha }}\) for \(\alpha \ge0\). Note that if \(\alpha \le\beta\) then \({F_{\beta }} \subset {F_{\alpha }}\).

Let \(( {X,\wp,\mu} )\) be a fuzzy measure space, we denote by \({M^{+} }\) the set of all non-negative measurable functions with respect to ℘.

Definition 2.2

(Sugeno [1])

Let \(( {X,\wp,\mu} )\) be a fuzzy measure space, \(f \in{M^{+} }\) and \(A \in\wp\). The Sugeno integral (or the fuzzy integral) of f on A, with respect to the fuzzy measure μ, is defined as

when \(A = X\),

where ∨ and ∧ denote the operations sup and inf on \([ {0,\infty} )\), respectively.

The properties of the Sugeno integral are well known and can be found in [7].

Proposition 2.3

Let \(( {X,\wp,\mu} )\) be a fuzzy measure space, \(A,B \in \wp\) and \(f,g \in{M^{+} }\) then:

1. (1)

   \({ ( S )\int_{A} {f\,d\mu \le\mu ( A )} }\);

2. (2)

   \({ ( S )\int_{A} {k\,d\mu} = k \wedge\mu ( A )}\), k for a non-negative constant;

3. (3)

   \({ ( S )\int_{A} {f\,d\mu \le} ( S )\int_{A} {g\,d\mu} }\) for \(f \le g\);

4. (4)

   \({ ( S )\int_{A \cup B} {f\,d\mu \ge} ( S )\int_{A} {f\,d\mu} \vee ( S )\int_{B} {f\,d\mu} }\);

5. (5)

   \({\mu ( {A \cap \{ {f \ge\alpha} \} } ) \ge\alpha \Rightarrow ( S )\int_{A} {f\,d\mu} \ge \alpha}\);

6. (6)

   \({\mu ( {A \cap \{ {f \ge\alpha} \} } ) \le\alpha \Rightarrow ( S )\int_{A} {f\,d\mu} \le \alpha}\);

7. (7)

   \({ ( S )\int_{A} {f\,d\mu} > \alpha \Leftrightarrow}\) there exists \(\gamma > \alpha\) such that \(\mu ( {A \cap \{ {f \ge\gamma} \}} ) >\alpha\);

8. (8)

   \({ ( S )\int_{A} {f\,d\mu} < \alpha \Leftrightarrow}\) there exists \(\gamma < \alpha\) such that \(\mu ( {A \cap \{ {f \ge\gamma} \}} ) < \alpha\).

Remark 2.4

Consider the distribution function F associated to f on A, that is, \(F ( \alpha ) = \mu ( {A \cap \{ {f \ge \alpha} \}} )\). Then, due to (4) and (5) of Proposition 2.3, we have \(F ( \alpha ) = \alpha \Rightarrow ( S )\int_{A} {f\,d\mu} = \alpha\). Thus, from a numerical point of view, the Sugeno integral can be calculated solving the equation \(F ( \alpha ) = \alpha\).

Definition 2.5

Functions \(f,g:X \to R\) are said to be co-monotone if for all \(x,y \in X\),

and f and g are said to be counter-monotone if for all \(x,y \in X\),

It is clear that if f and g are co-monotone, then for any real numbers s, t either \({F_{s}} \subseteq{G_{t}}\) or \({F_{t}} \subseteq {G_{s}}\).

2.1 Barnes-Godunova-Levin type inequality for the Sugeno integral based on an \(( {\alpha,m} )\)-concave function

The classical Barnes-Godunova-Levin type inequality provides the inequality

where \(p,q > 1\), \(B ( {p,q} ) = \frac{{6{{ ( {b - a} )}^{{\frac{1 }{ p}} + {\frac{1 }{ q}} - 1}}}}{{{{ ( {1 + p} )}^{{\frac{1 }{ p}}}}{{ ( {1 + q} )}^{{\frac{1 }{ q}}}}}}\) and f, g are non-negative concave functions on \([ a,b ]\).

Unfortunately, the following example shows that the Barnes-Godunova-Levin type inequality for the Sugeno integral is not valid.

Example

Consider \(X = [ {0,100} ]\) and \(p = q = 4\). Let m be the Lebesgue measure on X. If we take the functions \(f ( x ) = g ( x ) = \sqrt[4]{x}\), then \(f ( x )\), \(g ( x )\) are two \(( {{\frac{1 }{2}},{\frac{1}{3}}} )\)-concave functions. In fact,

A straightforward calculus shows that

However,

This proves that the Barnes-Godunova-Levin type inequality for the Sugeno integral is not satisfied.

The aim of this work is to show a Barnes-Godunova-Levin type inequality for the Sugeno integral with respect to an \(( {\alpha,m} )\)-concave function.

Theorem 2.6

Let \(X= [ {0,1} ]\), \(\alpha,m \in ( {0,1} )\) and f, g be \((\alpha,m )\)-concave functions for all \(x \in X\). If m is a Lebesgue measure on X, then

Case (i). If \(f ( 0 ) \le f ( 1 )\) and \(g ( 0 ) \le g ( 1 )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (ii). If \(f ( 0 ) > f ( 1 )\) and \(g ( 0 ) > g ( 1 )\), then

Case (a). If \(\frac{{f ( 1 )}}{{f ( 0 )}} < \frac{{g ( 1 )}}{{g ( 0 )}}\), then

Case 1. If \(m \in ( {0,{\frac{{f ( 1 )} }{{f ( 0 )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{f ( 1 )} }{{f ( 0 )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{f ( 1 )} }{{f ( 0 )}}},{\frac{{g ( 1 )} }{{g ( 0 )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 4. If \(m = {\frac{{g ( 1 )} }{{g ( 0 )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 5. If \(m \in ( {{\frac{{g ( 1 )} }{{g ( 0 )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (b). If \(\frac{{f ( 1 )}}{{f ( 0 )}} = \frac{{g ( 1 )}}{{g ( 0 )}}\), then

Case 1. If \(m \in ( {0,{\frac{{f ( 1 )} }{ {f ( 0 )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{f ( 1 )} }{{f ( 0 )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{f ( 1 )} }{{f ( 0 )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (c). If \(\frac{{f ( 1 )}}{{f ( 0 )}} > \frac{{g ( 1 )}}{{g ( 0 )}}\), then

Case 1. If \(m \in ( {0,{\frac{{g ( 1 )} }{ {g ( 0 )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{g ( 1 )} }{{g ( 0 )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{g ( 1 )} }{{g ( 0 )}}},{\frac{{f ( 1 )} }{{f ( 0 )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 4. If \(m = {\frac{{f ( 1 )} }{{f ( 0 )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 5. If \(m \in ( {{\frac{{f ( 1 )} }{{f ( 0 )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Proof

Let \(p,q \in ( {0,\infty} )\), \({ ( { ( S )\int_{0}^{1} {{f^{p}} ( x )\,dx} } )^{{\frac{1 }{ p}}}} = {t_{1}}\) and \({ ( { ( S )\int_{0}^{1} {{g^{q}} ( x )\,dx} } )^{{\frac{1 }{ q}}}} = {t_{2}}\). Since \(f,g: [ {0,1} ] \to [ {0,\infty} )\) are two \(( {\alpha,m} )\)-concave functions for \(x \in [ {0,1} ]\), we have

Case (i). If \(f ( 0 ) \le f ( 1 )\) and \(g ( 0 ) \le g ( 1 )\), then by (3) of Proposition 2.3 and the co-monotonicity of \({h_{1}} ( x )\) and \({h_{2}} ( x )\), we have

Case (ii). If \(f ( 0 ) > f ( 1 )\) and \(g ( 0 ) > g ( 1 )\), then by (3) of Proposition 2.3 and the co-monotonicity of \({h_{1}} ( x )\) and \({h_{2}} ( x )\), we have

Case (a). If \(\frac{{f ( 1 )}}{{f ( 0 )}} < \frac{{g ( 1 )}}{{g ( 0 )}}\), then by (2.24) we obtain

Case 1. If \(m \in ( {0,{\frac{{f ( 1 )} }{ {f ( 0 )}}}} )\), then

Case 2. If \(m = {\frac{{f ( 1 )} }{{f ( 0 )}}}\), then

Case 3. If \(m \in ( {{\frac{{f ( 1 )} }{{f ( 0 )}}},{\frac{{g ( 1 )} }{{g ( 0 )}}}} )\), then

Case 4. If \(m = {\frac{{g ( 1 )} }{{g ( 0 )}}}\), then

Case 5. If \(m \in ( {{\frac{{g ( 1 )} }{{g ( 0 )}}},1} )\), then

Case (b). If \(\frac{{f ( 1 )}}{{f ( 0 )}} = \frac{{g ( 1 )}}{{g ( 0 )}}\), then by (2.24) we obtain

Case 1. If \(m \in ( {0,{\frac{{f ( 1 )} }{ {f ( 0 )}}}} )\), then

Case 2. If \(m = {\frac{{f ( 1 )} }{{f ( 0 )}}}\), then

Case 3. If \(m \in ( {{\frac{{f ( 1 )} }{{f ( 0 )}}},1} )\), then

Case (c). If \(\frac{{f ( 1 )}}{{f ( 0 )}} > \frac{{g ( 1 )}}{{g ( 0 )}}\), then by (2.24) we obtain

Case 1. If \(m \in ( {0,{\frac{{g ( 1 )} }{ {g ( 0 )}}}} )\), then

Case 2. If \(m = {\frac{{g ( 1 )} }{{g ( 0 )}}}\), then

Case 3. If \(m \in ( {{\frac{{g ( 1 )} }{{g ( 0 )}}},{\frac{{f ( 1 )} }{{f ( 0 )}}}} )\), then

Case 4. If \(m = {\frac{{f ( 1 )} }{{f ( 0 )}}}\), then

Case 5. If \(m \in ( {{\frac{{f ( 1 )} }{{f ( 0 )}}},1} )\), then

This completes the proof. □

Example

Consider \(X = [ {0,1} ]\) and \(p = 2\), \(q = 4\). If we take the functions \(f ( x ) =\sqrt[2]{x}\), \(g ( x ) = \sqrt[4]{x}\), then \(f ( x )\), \(g ( x )\) are two \(( {{\frac{2 }{3}},{\frac{1 }{3}}} )\) -concave functions. In fact, \(\sqrt[t]{x} = f ( {x \cdot1 + {\frac{1 }{3}} ( {1 - x} ) \cdot0} ) \ge{x^{{\frac{2 }{3}}}}f ( 1 ) + {\frac{1 }{3}} ( {1 - {x^{{\frac{2 }{ 3}}}}} )f ( 0 ) = {x^{{\frac{2 }{3}}}}\) for \(t \ge{\frac{3 }{2}}\). Let m be the Lebesgue measure on X. A straightforward calculus shows that

By Theorem 2.6, we have

Now, we will prove the general cases of Theorem 2.6.

Theorem 2.7

Let \(X= [ {a,b} ]\), \(\alpha,m \in ( {0,1} )\) and f, g be \(( {\alpha,m} )\)-concave functions for all \(x \in X\). If μ is a Lebesgue measure on X, then

Case (i). If \(f ( a ) \le f ( b )\) and \(g ( a ) \le g ( b )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (ii). If \(f (a ) > f ( b )\) and \(g ( a ) > g ( b )\), then

Case (a). If \(\frac{{f ( b )}}{{f ( a )}} < \frac{{g ( b )}}{{g ( a )}}\), then

Case 1. If \(m \in ( {0,{\frac{{f ( b )} }{ {f ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{f ( b )} }{{f ( a )}}},{\frac{{g ( b )} }{{g ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 4. If \(m = {\frac{{g ( b )} }{{g ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 5. If \(m \in ( {{\frac{{g ( b )} }{{g ( a )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (b). If \(\frac{{f ( b )}}{{f ( a )}} = \frac{{g ( b )}}{{g ( a )}}\), then

Case 1. If \(m \in ( {0,{\frac{{f ( b )} }{ {f ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{f ( b )} }{ {f ( a )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (c). If \(\frac{{f ( b )}}{{f ( a )}} > \frac{{g ( b )}}{{g ( a )}}\), then

Case 1. If \(m \in ( {0,{\frac{{g ( b )} }{ {g ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{g ( b )} }{{g ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{g ( b )} }{{g ( a )}}},{\frac{{f ( b )} }{{f ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 4. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 5. If \(m \in ( {{\frac{{f ( b )} }{{f ( a )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Proof

Let \(p,q \in ( {0,\infty} )\), \({ ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{{\frac{1 }{ p}}}} = {t_{1}}\) and \({ ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{{\frac{1 }{ q}}}} = {t_{2}}\). Since \(f,g: [ {a,b} ] \to [ {0,\infty} )\) are two \(( {\alpha,m} )\)-concave functions for \(x \in [ {a,b} ]\), we have

Case (i). If \(f ( a ) \le f ( b )\) and \(g ( a ) \le g ( b )\), then by (3) of Proposition 2.3 and the co-monotonicity of \({h_{1}} ( x )\) and \({h_{2}} ( x )\), we have

Case (ii). If \(f (a ) > f ( b )\) and \(g ( a ) > g ( b )\), then by (3) of Proposition 2.3 and the co-monotonicity of \({h_{1}} ( x )\) and \({h_{2}} ( x )\), we have

Case (a). If \(\frac{{f ( b )}}{{f ( a )}} < \frac{{g ( b )}}{{g ( a )}}\), then by (2.56) we obtain

Case 1. If \(m \in ( {0,{\frac{{f ( b )} }{ {f ( a )}}}} )\), then

Case 2. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

Case 3. If \(m \in ( {{\frac{{f ( b )} }{{f ( a )}}},{\frac{{g ( b )} }{{g ( a )}}}} )\), then

Case 4. If \(m = {\frac{{g ( b )} }{{g ( a )}}}\), then

Case 5. If \(m \in ( {{\frac{{g ( b )} }{{g ( a )}}},1} )\), then

Case (b). If \(\frac{{f ( b )}}{{f ( a )}} = \frac{{g ( b )}}{{g ( a )}}\), then by (2.56) we obtain

Case 1. If \(m \in ( {0,{\frac{{f ( b )} }{ {f ( a )}}}} )\), then

Case 2. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

Case 3. If \(m \in ( {{\frac{{f ( b )} }{{f ( a )}}},1} )\), then

Case (c). If \(\frac{{f ( b )}}{{f ( a )}} > \frac{{g ( b )}}{{g ( a )}}\), then by (2.56) we obtain

Case 1. If \(m \in ( {0,{\frac{{g ( b )} }{ {g ( a )}}}} )\), then

Case 2. If \(m = {\frac{{g ( b )} }{{g ( a )}}}\), then

Case 3. If \(m \in ( {{\frac{{g ( b )} }{{g ( a )}}},{\frac{{f ( b )} }{{f ( a )}}}} )\), then

Case 4. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

Case 5. If \(m \in ( {{\frac{{f ( b )} }{{f ( a )}}},1} )\), then

This completes the proof. □

Example

Consider \(X = [ {2,5} ]\) and \(p = 2\), \(q = 4\). Let m be the Lebesgue measure on X. If we take the function \(f ( x ) = \sqrt[2]{{6 - x}}\), \(g ( x ) = \sqrt[4]{{6 - x}}\), then \(f ( x )\), \(g ( x )\) are two \(( {{\frac{1 }{2}},{\frac{{\sqrt{5} } }{2}}} )\) -concave functions. In fact,

and

A straightforward calculus shows that

By Theorem 2.7, we have

As some special cases of \((\alpha,m )\)-concave functions in Theorem 2.7, we have the following results.

Remark 2.8

Let \(X= [ {a,b} ]\), \(\alpha= m= 0 \) and f, g be two decreasing functions for all \(x \in X\). If μ is a Lebesgue measure on X, then

Remark 2.9

Let \(X= [ {a,b} ]\), \(\alpha=1\), \(m= 0 \) and f, g be two starshaped functions for all \(x \in X\). If μ is a Lebesgue measure on X, then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Remark 2.10

Let \(X= [ {a,b} ]\), \(\alpha=1\), \(m\in ({0,1} ) \) and f, g be two m-concave functions for all \(x \in X\). If μ is a Lebesgue measure on X, then

Case (i). If \(f ( a ) \le f ( b )\) and \(g ( a ) \le g ( b )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (ii). If \(f (a ) > f ( b )\) and \(g ( a ) > g ( b )\), then

Case (a). If \(\frac{{f ( b )}}{{f ( a )}} < \frac{{g ( b )}}{{g ( a )}}\), then

Case 1. If \(m \in ( {0,{\frac{{f ( b )} }{ {f ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{f ( b )} }{{f ( a )}}},{\frac{{g ( b )} }{{g ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 4. If \(m = {\frac{{g ( b )} }{{g ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 5. If \(m \in ( {{\frac{{g ( b )} }{{g ( a )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (b). If \(\frac{{f ( b )}}{{f ( a )}} = \frac{{g ( b )}}{{g ( a )}}\), then

Case 1. If \(m \in ( {0,{\frac{{f ( b )} }{ {f ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{f ( b )} }{ {f ( a )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (c). If \(\frac{{f ( b )}}{{f ( a )}} > \frac{{g ( b )}}{{g ( a )}}\), then

Case 1. If \(m \in ( {0,{\frac{{g ( b )} }{ {g ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 2. If \(m = {\frac{{g ( b )} }{{g ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 3. If \(m \in ( {{\frac{{g ( b )} }{{g ( a )}}},{\frac{{f ( b )} }{{f ( a )}}}} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 4. If \(m = {\frac{{f ( b )} }{{f ( a )}}}\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case 5. If \(m \in ( {{\frac{{f ( b )} }{{f ( a )}}},1} )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Remark 2.11

[22]

Let \(X= [ {a,b} ]\), \(\alpha=1\), \(m=1 \) and f, g be two concave functions for all \(x \in X\). If μ is a Lebesgue measure on X, then

Case (i). If \(f (a ) < f ( b )\) and \(g ( a ) < g ( b )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (ii). If \(f (a ) = f ( b )\) and \(g ( a ) = g ( b )\), then

Case (iii). If \(f (a ) > f ( b )\) and \(g ( a ) > g ( b )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Remark 2.12

Let \(X= [ {a,b} ]\), \(\alpha\in ({0,1} )\), \(m=0 \) and f, g be two α-starshaped functions for all \(x \in X\). If μ is a Lebesgue measure on X, then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Remark 2.13

Let \(X= [ {a,b} ]\), \(\alpha\in ({0,1} )\), \(m=1 \) and f, g be two α-concave functions for all \(x \in X\). If μ is a Lebesgue measure on X, then

Case (i). If \(f (a ) < f ( b )\) and \(g ( a ) < g ( b )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

Case (ii). If \(f (a ) = f ( b )\) and \(g ( a ) = g ( b )\), then

Case (iii). If \(f (a ) > f ( b )\) and \(g ( a ) > g ( b )\), then

where \({t_{1}} = { ( { ( S )\int_{a}^{b} {{f^{p}} ( x )\,dx} } )^{\frac{1}{p}}}\), \({t_{2}} = { ( { ( S )\int_{a}^{b} {{g^{q}} ( x )\,dx} } )^{\frac{1}{q}}}\).

In this paper, we have investigated the Barnes-Godunova-Levin type inequality of the Sugeno integral with respect to an \(( {\alpha ,m} )\)-concave function. For further investigations, we will continue to explore other integral inequalities for the Sugeno integral related to \(( {\alpha,m} )\)-concavity.

This work is supported by the National Natural Science Foundation of China (61273143, 61472424) and Fundamental Research Funds for the Central Universities (2013RC10, 2013RC12 and 2014YC07).

Authors and Affiliations

1. School of Information and Electrical Engineering, China University of Mining and Technology, Xuzhou, Jiangsu, 221008, China

   Dong-Qing Li, Yu-Hu Cheng, Xue-Song Wang & Shao-Fei Zang

Corresponding author

Correspondence to Yu-Hu Cheng.

Competing interests

The authors declare that they have no competing interests.

Authors’ contributions

All authors contributed equally to this paper and they read and approved the final manuscript.

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